# test43242234

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## README

# 月相和二十四节气的计算

 [sunMoon_simp.pdf (ytliu0.github.io)](https://ytliu0.github.io/ChineseCalendar/docs/sunMoon_simp.pdf)

<p align="right"><a href='https://ytliu0.github.io/ChineseCalendar/docs/sunMoon.pdf'>英文PDF</a></p>
&emsp;&emsp;农历月日的编排是根据合朔和中气而定，但是按传统，农历也列出望、上下弦和二十四节气 的日期。 本文详细说明推算月相和二十四节气时刻的方法。有关二十四节气的基本概念可参阅此网页，编算农历的法则可参阅此网页。

&emsp; 月相和二十四节气的时刻计算颇为复杂，但是所有需要的资料和数据现在都可免费获得。 任何人只要熟悉数值计算方法及计算机[^1]程序都可以按照本文的方法自行计算月相和二十四节气 的准确时刻。 

&emsp;叙述计算方法前，先要略为讲解一些重要概念。 本文假设读者已熟悉此网页介绍的天文学 和历法概念。 本文第一节简单介绍现时世界上精确历表采用的质心力学时(barycentric dynamical time)TDB及其与地球时(terrestrial time)TT和国际原子时(international atomic time)TAI的 关系。 不熟悉广义相对论的读者大可不理会其中公式。第二节介绍几种现代天文学常用的天球 座标系统， 第三节列出IAU 2006/2000A岁差和章动模型的计算公式。 

&emsp;要计算准确的月相和节气时刻，准确的太阳和月球历表不可缺少。 我用美国喷射推进实验室(Jet Propulson Laboratory, JPL)制定的历表。 第四节介绍JPL历表，讲述如何下载历表数据 和如何用下载的数据计算太阳和月球位置。 JPL历表其中一个目的是用于航天活动，月球和行星位置和速度用国际天球座标系(ICRS)的直角座标表示， 所以必须把这些数据转换成黄道 座标系统才可用来计算月相和节气。 第五节讲述如何计算光行时及光行差以求得视位置，第 六节列出由JPL历表来计算视黄经的详细步骤， 第七节讲述如何用牛顿━拉弗森方法(Newton-Raphson  method)来计算月相和二十四节气的TDB时刻， 最后一节讲述如何把TDB时刻转化 为UTC时刻。 

&emsp;本文只是简略介绍各种概念，读者如想较深入地了解这些概念，可参考Urban和Seidelmann著的书*Explanatory Supplement to the Astronomical Almanac([Urban & Seidelmann 2013])*

## 1. 历书时和质心力学时

&emsp;&emsp;十七世纪至十九世纪末的天文历表都用以地球自转为基础而定的时间，当时的设想是地球自转是均匀的，因此以其制定的时间也是均匀的。后来天文观测精度渐渐提高， 观测数据显示地球自转其实是不均匀的。于是天文学家订立以地球公转为基础而定的时间， 称为「历书时」(ephemeris time)，简称**ET**，用来作天文历表的均匀时间标准。 高精度的观测数据也显示牛顿力学在计算行星位置上有所不足，于是天文学家用广义相对论修正牛顿力学方程来计算行星位置。

&emsp;&emsp;根据广义相对论，时间流逝的快慢会随着观测者的运动速度及相对其他物体的位置而变[^2]， 所以要计及广义相对论效应时不能用ET来计算，必须用更精密的均匀时间来编算天文历表。 以广义相对论为基础的天体力学用四个座标值 $(t, x^i ) (i = 1, 2, 3)$描述太阳系天体的四维时空位置， 这个座标系统称为「质心天球参考系」(barycentric celestial reference system)， 简称BCRS。其中t描述时间，称为「质心座标时」(barycentric coordinate time)， 简称TCB。TCB是一个均匀时间系统，与观测者的运动无关， 适宜用来计算天体位置。牛顿的万有引力用以下四维度规所取代[即[Urban & Seidelmann 2013]书中公式(2.38)] 

$$
ds^2=-(1-\frac{2w}{c^2}+ \frac{2w^2}{c^4})d(ct)^2-\frac{4w_i}{c^3}d(ct)dx^2+\delta_{ij}[1+\frac{2w}{c^2}+O(c^{-4})]dx^idx^j\tag{1}
$$

此处用了爱因斯坦的求和约定：相同的下标和上标(如$w_idx^i$ )须要求和。式中c是光速，w在弱重力[^3]的极限时退化为−Φ，这里Φ是牛顿力学的重力势(gravitational potential)：


$$
Φ(t, \textbf{x}) =-G\int d^3x{'}\frac{\rho(t,\textbf{x}^{'})}{|x-\textbf{x}^{'}|}\tag{2}
$$


式中ρ是密度(即单位体积内的质量)。$w_i$ 由泊松方程(Poisson equation)来定义，方程式的源项(source term)与动量密度(momentum density)成正比。 

&emsp;&emsp;TCB可视为远离太阳系及相对於太阳系质心静止的观测者量度的固有时(proper time)， 所以与太阳系天体运行无关。质心天球参考系适宜用来计算天文历表，但是大多数的观测在地球表面进行，所以天文学家也建立了以地球为中心的一套座标系统， 称为「地心天球参考 系」(geocentric celestial reference system)，简称GCRS。 在GCRS里，时空座标以$(T, X^i) (i = 1, 2, 3)$描述， 其中T称为「地心座标时」(geocentric coordinate time)， 简称TCG。GCRS的座标原点随地球质心移动，其空间座标轴相对于BCRS的空间座标轴维持不旋转。 TCG的选取是要使地球附近的时空度规可以写成如 (1)的类似公式。 由于GCRS随地球运行，而且处於太阳系重力场中，TCG流逝速率比TCB慢，这是广义相对论的重力时间延缓(gravitational time dilation)和狭义相对论的时间延缓(time dilation)效应结合的结果。 TCG和TCB的变换见 于[Urban & Seidelmann 2013]书中公式(3.25):


$$
TCB-TCG=c^{-2}\left[\int_{t_0}^t\left(\frac{v^2_e}{2}-Φ_{ext}(x_e)\right)dt+v_e\cdot(x-x_e)\right]+O(c^{-4})\tag{3}
$$


式中$x_e$和$v_e$分别是地球质心的BCRS位置向量和速度向量， x是观测者的BCRS位置向量，$Φ_{ext}$是地球以外的太阳系天体的重力势总和。$t_0$是常数， 其作用是使1977年1月1日TAI零时 时TCB、TCG、和ET三者时刻相等。 由于TCG的定义中没有计及地球的重力，其时间流逝速率比TAI快， 这又是广义相对论和狭义相对论时间延缓两效应总和的结果。 于是天文学家又定义「地球时」(terrestrial time)，简称TT， 其时间流逝速率和TAI一致。地球时以前称为「地球力学时」(terrestrial dynamical time, TDT)，后来改称地球时。TT的流逝速率比TCG慢， 其值是在大地水准 面(geoid)上$-Φ_{eff}/c^2$  的值， 这里c是光速，$Φ_{eff} = Φ_E − v^2_{rot}/2$是地球重力势减去离心势， $v_{rot}$是地球自转速率。大地水准面可视为地球表面的平均海水面， $Φ_{eff}$虽然在地球处处不同，但在大地水准面上的值相同， 因为大地水准面就是定义为$Φ_{eff}$的某个等值面。 所以$dTT/dTCG = 1 − L_G$，而$L_G$根据实测定为 $L_G = 6.969290134 × 10^{−10}$。TT和TCG因此有以下线性关系[取 自[Urban & Seidelmann 2013]书中公式(3.27)]: 


$$
TT = TCG − L_G(JD_{TCG} − 2443144.5003725) · 86400秒,\tag{4}
$$


其中$JD_{TCG}$是TCG用儒略日数来表示。 式中常数2443144.500375是为了使TT、TCG、和ET三者的时刻在1977年1月1日TAI零时的时刻相等。 由于TT和TAI的时间流逝速率相等，TT和TAI只 差了个常数:


$$
TT = TAI + 32.184秒\tag{5}
$$
&emsp;&emsp;这个常数是为了使TT和ET在1977年1月1日TAI零时的时刻相等。 

&emsp;&emsp;TCB适宜用来计算天文历表，TT则可用原子钟直接量度。 两者的转换可用公式(3)和(4)和太阳系天体位置用数值积分法计算， 所以TT不适宜用来计算天文历表。为方便起见， 天文学家创立另一个时间来近似TT，这时间称为「质心力学时」(barycentric dynamical time)，简 称TDB。 TDB是TCB的线性函数，尽可能使之接近TT。 问体是TT与TCB的偏差随地球运行而变化，两者的差异并非线性函数所能表示， 我们只能使TDB的时间流逝接近TT时间流逝在某段时间的平均值， 这样TDB和TT在这段时间内的偏差只呈现周期性变化。 这些周期性变化缘于地球公转轨道是椭圆，其运行时快时慢，与太阳的距离也时近时远， 两者的变化周期为一 年，此外，月球和其他行星的重力场也随着它们与地球的相对位置变化而变。 按照国际天文联 会(International Astronomical Union, IAU)2006年通过的B3决议，TDB用以下公式定义: 


$$
TDB = TCB − LB(JDTCB − 2443144.5003725) · 86400秒 − 6.55 × 10−5秒,\tag{6}
$$


 其中LB = 1.550519768×10−8，JDTCB是TCB用懦略日数来表示。 LB的数值可视为1−dTT/dt在 某段时间的平均值。 

&emsp;&emsp;TDB继承了ET成为现代天文历表的时间标准。 TT与TDB的换算可用以下近似公式[取 自[Urban & Seidelmann 2013]书中图3.2]: 


$$
\begin{array}{lcl}
TDB & = & TT + 0.001658秒\ sin(g + 0.0167 sin g)  \\
  & = & + 月球与行星项，大致幅度是10^{−5}秒 \\
 & = & + 每日变化项，大致幅度是10^{−6}秒,
\end{array}\tag{7}
$$


其中g是地球的轨道平近点角(mean anomaly)，所以g+0.0167 sin g是偏近点角(eccentric anomaly)的 近似值，因为0.0167是地球轨道偏心率。 较详细的公式可参考美国海军天文台在2005年发布的 文件([Kaplan 2005])中公式(2.6)及 [Park et al 2021] 文章第(3)式。 其实TT和TDB在几千年之间的偏差不会超过二毫秒(即0.002秒)， 所以在计算月相和节气时不必计较两者的差异，可视两者为等同。

## 2. 天球座标系 

### 2.1. 国际天球参考系(ICRS) 

&emsp;&emsp;上一节说太阳系的时空度规以质心参考系(BCRS)表示，其座标原点是太阳系的质心。但 是BCRS是动力学概念， 说「用BCRS」相当于在牛顿力学里说「用质心惯性参考系」。 BCRS没有定义座标轴的方向[^4]

&emsp;&emsp;国际天球参考系(International Celestial Reference System，简称ICRS)是运动学概念， 其原 点也是太阳系的质心，然后建立一套方向固定的座标轴，为了做到这一点， 座标轴的方向用遍布天球的数百个河外射电源(大多数是类星体)而定。 所定的方向接近J2000.0历元平赤道座标轴(下面会解释)， 两者的偏差不多于0.0173角秒。ICRS的x轴指向J2000.0的平春分点， z轴接近J2000.0的平北天极，y轴在x轴以东90^◦^并与x轴和z轴垂直。 ICRS是右手座标系(right-handed coordinate system)。 如下面所述，ICRS和J2000.0历元平赤道和平春分点的赤道座标变换可用 参考架偏差矩阵(frame bias matrix)表示。 

&emsp;&emsp;用河外射电源来建立ICRS座标系，基本假设是这些遥远天体相对于BCRS的座标轴不旋转。 这假设其实应该用观测检验，看看行星的ICRS位置是否符合用BCRS导出的运动方程，并无需引入额外的科里奥利力(Coriolis force)和离心力(centrifugal force)。 到目前为止的观测数据没有发现与这假设有偏差。 

&emsp;&emsp;由於太阳系质心绕银河系中心转，河外射电源相对於太阳系质心的视位置受到太阳系质心 运动的光行差影响，而这光行差效应会随太阳系质心的速度变化而改变，河外射电源的视位置因而会漂移，从而影响ICRS的定位精度。 这漂移已经从几十年的甚长基线干涉测量(VLBI)的数据测出([Titov, Lambert & Gontier 2011])，漂移幅度约为每年6微角秒，与预期的数值吻合。 由于观测精度不段提高，这漂移效应在将来便不可忽略了。

### 2.2. 地心天球参考系(GCRS

&emsp;&emsp;地心天球参考系(Geocentric Celestial Reference Sysyetm，简称GCRS)的座标原点是地球质心。 GCRS的空间座标$X^i$与BCRS的空间座标x i的关系是


$$
 X^i = x^i − x^i_E + O((v_E/c)^2 ),\tag{8}
$$


式中$x^i_E$是地球质心的BCRS位置，而$(v_E/c)^2$项来自广义相对论的修正，但是$(v_E/c)^2 ∼ 10^{−8} = 0.002^{''}$。 太阳运行的速度大约是每秒$0.04^{''}$，月球运行的速度大约是每秒$0.5^{''}$，所以略去了 $(v_E/c)^2$ 项 只会在计算二十四节气时刻时有约0.05秒的误差，计算月相时刻时则只会有约0.004秒的误差。 这样的误差比《农历的编算和颁行》([GB/T 33661-2017])里的一秒精度要求小得多，所以可以忽略。 

&emsp;&emsp;GCRS和BCRS的情况一样，GCRS并没有明确定义座标轴的方向。这里用国际天文联会2006年B2决议的推荐： BCRS座标轴的方向和ICRS的座标轴方向一致。 GCRS的座标定义包括与BCRS的座标无旋转，由于忽略了$(v_E/c)^2$项， GCRS的座标轴方向也可视为和ICRS的座标轴方向一致。

### 2.3. 赤道与黄道座标系

 &emsp;&emsp;ICRS的座标轴是固定的，用来描述天体的位置十分方面。 但是很多观测在地球表面上进行， 传统上习惯用地球自转轴或地球公转轨道平面而定的参考系表示天体位置。 用地球自转轴来定的参考系称为「赤道座标系」，而用地球公转轨道平面来定的参考系称为「黄道座标系」。 

#### 2.3.1. 赤道、黄道及春分点 

&emsp;&emsp;地球自转轴在空间的运动颇为复杂，可分为「岁差」和「章动」两成分。 岁差和章动稍后会介绍。包括岁差和章动而定的地球自转轴的方向称为「天球中间极」(Celestial Intermediate Pole，简称CIP)，CIP可视为地球自转轴的平均指向。 只考虑岁差但不计章动而定的地球自转轴在空间的指向是平北天极。

&emsp;&emsp;「真赤道」(true equator)定义为垂直于CIP并通过地球质心的平面。 由于岁差和章动，真赤道在天球的位置不断变动。 「平赤道」(mean equator)定义为垂直于平北天极并通过地球质心的平面。 由于岁差，平赤道在天球的位置也不断变动。 

&emsp;&emsp;「黄道」是地球公转轨道投射到天球的大圆。 但是由于行星对地球的重力摄动，地球公转轨道不断变化。 为了精确定义黄道， 国际天文联会建议将黄极定义为通过天球中心与地月质心在BCRS的平均轨道角动量向量平行的直线与天球的交点。 黄道则是垂直于黄极的大圆。 黄道与赤道相交于两点，称为「春分点」和「秋分点」。春分点是太阳从赤道以南运行到赤道以北的那个交点。 黄道与真赤道的交点称为「真春分点」和「真秋分点」，而黄道与平赤道的交点称为「平春分点」和「平秋分点」。 

#### 2.3.2. 岁差、章动及极移运动 	

&emsp;&emsp;受到太阳、月球和行星对地球扁球体的重力影响，地球自转轴的方向不断变动。 地球自转轴除 了在空间的方向不断变化外，相对于地壳的位置也不断移动，称为极移运动(polar motion)。 

&emsp;&emsp;地球自转轴的运动包括非周期性和周期性两成分，周期性运动也有各种不同周期， 非周期性运动以及周期长于约一万年的运动统称为「岁差」，周期短于约一万年但长于两天的周期性运动称为「章动」。 至于短于两天的周期性运动无法与因潮汐而引起的极移分开，所以拨入极移运动。

&emsp;&emsp; 岁差主要的成分是地球自转轴绕公转轴进动，周期是二万六千年，这使北天极绕黄极转， 以及春分点每年沿黄道西退$50.3^{''}$。章动的主要成分是周期为18.6年、幅度约$9^{''}$的运动， 成因是月球绕地球的轨道轴绕黄极进动。极移运动的幅度约$0.3^{''}$，除了提及过的潮汐成分外， 还有其他成分，例如周期为433天的钱德勒摆动(Chandler wobble)。 计算二十四节气和月相时刻不需要理会极移运动，因为二十四节气和月相用太阳和月球的地心位置（即相对于地球质心的位置）来定义，而不是用相对于地面上某观测站的太阳和月球视位置来定义，所以不涉及极移运动。 

&emsp;&emsp;地月系统绕日轨道因为受到其他行星的重力摄动而在空间移动， 所以黄道也在天球移 动，称为「黄道岁差」(precession of the ecliptic)， 以区别「赤道岁差」[^5] (precession of the equator)。

#### 2.3.3. 瞬时赤道座标 

&emsp;&emsp;赤道座标由天赤道和春分点来定。座标的x轴指向春分点，z轴指向北天极，y轴在赤道平面并在春分点以东90^◦。由于天赤道和春分点都在动， 用赤道座标表示天体位置时必须注明所用的历元(epoch)，例如历元J2000.0(即2000年1月1日TDB正午的天赤道和春分点)。 

&emsp;&emsp;其中一个常用的赤道座标系是用历元J2000.0的平赤道和平春分点的赤道座标系。 上面说 过，这个赤道座标系几乎与ICRS一致，两者的座标轴只有微少偏差， 两者的变换可用参考架偏差矩阵(frame bias matrix)$\textbf{B}$来表示。 具体地说，用$\textbf{x}_{\textbf{ICRS}}$纵向量代表ICRS的座标值， 再 用$x_{2000}$纵向量代表J2000.0历元平赤道和平春分点的赤道座标值， 则两者的关系由下面公式给出。 


$$
\textbf{x}_{2000} = \textbf{Bx}_{\textbf{ICRS}}.\tag{9}
$$

参考架偏差矩阵$\textbf{B}$的公式可参考[Urban & Seidelmann 2013]书中公式(4.4):


$$
\textbf{B}=\begin{pmatrix}
  1-\frac{1}{2}(dα^2_0+ξ^2_0) & dα_0 & -ξ_0 \\
  -dα_0-η_0ξ_0 & 1-\frac{1}{2}(dα^2_0+η^2_0) & -η_0 \\
  ξ_0-η_0dα_0 & η_0+ξ_0dα_0 & 1-\frac{1}{2}(η^2_0+^2_0) \\
  \end{pmatrix},\tag{10}
$$
​      

其中$dα_0 = −0.0146^{''}$、$ξ_0 = −0.016617^{''}$、$η_0 = −0.0068192^{''}$， 三个数字都要先转化为弧度然后代入公式，结果如下:

$$
\textbf{B}=\begin{pmatrix}
  0.99999999999999425 & −7.078279744 × 10^{−8} & 8.05614894 × 10^{−8} \\
  7.078279478 × 10^{−8} & 0.99999999999999695 & 3.306041454 × 10^{−8}\\
  -8.056149173 × 10^{−8} & −3.306040884 × 10^{−8} & 0.999999999999996208 \\
  \end{pmatrix},\tag{11}
$$


欲将$\textbf{x}_{2000}$转化成瞬时赤道座标(即相对于历元t的真赤道座标)， 可用岁差矩阵$\textbf{P}(t)$和章动矩阵$\textbf{N}(t)$乘之: 

$$
\textbf{x}_{\textbf{eq}} = \textbf{N}(t)\textbf{P}(t)\textbf{x}_{2000} = \textbf{N}(t)\textbf{P}(t)\textbf{Bx}_{\textbf{ICRS}}. \tag{12}
$$


$P (t)$和$N (t)$的计算方法在第三节叙述。 

#### 2.3.4. 瞬时黄道座标 

&emsp;&emsp;计算月相和二十四节气需要知道太阳和月球在瞬时黄道的座标值。 黄道座标系由黄道和春分点来定。座标的x轴指向春分点， z轴指向黄极，y轴在黄道平面、春分点以东90^◦。 由此可推出某天体的黄道座标值可由其赤道座标值沿x轴旋转ϵ角度而得， 这里ϵ称为「黄赤交角」， 即黄道与真赤道的倾斜角度， 亦等于黄极与天球中间极CIP的角距离。 值得注意的是黄赤交 角$ϵ = ϵ(t)$因岁差和章动会随时间变化。 黄赤交角可用下面的公式$\eqref{eq:thirty}$计算。 如果用$x_{eq}$纵向量 代表某天体在瞬时赤道的座标值， 用$x_{ec}$纵向量代表该天体在瞬时黄道的座标值， 则两者的关 系如下： 

$$
\textbf{x}_{ec} = \textbf{R}_\textbf{1}(ϵ(t))\textbf{x}_{\textbf{eq}} = \textbf{R}_\textbf{1}(ϵ(t))\textbf{N}(t)\textbf{P}(t)\textbf{Bx}_{\textbf{ICRS}}, \tag{13}\label{eq:Thirteen}
$$


其中旋转矩阵如下： 

$$
\textbf{R}_1(ϵ(t))=\begin{pmatrix}
  1 & 0 & 0 \\
  0 & cosϵ(t) & sinϵ(t) \\
  0 & -sinϵ(t) & cosϵ(t) \\
  \end{pmatrix}.\tag{14}\label{eq:fourteen}
$$


「黄经」λ定义为$arg(x_{ec}+iy_{ec})$，这里arg(z)表示复数z的辐角。 黄经也可以写成$λ = tan^{−1} (y_{ec}/x_{ec})$， 只是角度要取适当的象限。 很多计算机程式提供反正切函数并给出适当的象限，例如FORTRAN、C和 python的**atan2**函数。

## 3. 岁差和章动

### 3.1. 岁差矩阵

用$\textbf{X} = \begin{pmatrix} X & Y & Z\end{pmatrix} ^T$代表相对于在TDB时刻t的瞬时平赤道和平春分点的赤道座标值， 再用$\textbf{X}_\textbf{0} = \begin{pmatrix} X_0 & Y_0 & Z_0\end{pmatrix} ^T$代表J2000.0历元平赤道和平春分点的赤道座标值， 其中上标T代表矩阵转置(transpose)，所以$\textbf{X}$和$\textbf{X}_\textbf{0}$都是纵向量，两者的关系以岁差矩阵$P (t)$表示：

$$
X = P (t)X_0.\tag{15}
$$
&emsp&emsp;2006年8月，国际天文联会在第二十六届全体大会通过了一项决议， 建议采用Capitanie等人 在2003年制定的P03岁差模型([Capitaine et al 2003])来计算岁差。 这个岁差模型称为IAU2006岁差理论。根据这个模型，岁差矩阵公式如下：

$$
\textbf{P}(t) = \textbf{R}_\textbf{3}(χ_A)\textbf{R}_\textbf{1}(−ωA)\textbf{R}_\textbf{3}(−ψA)\textbf{R}_\textbf{1}(ϵ_0),\tag{16}\label{eq:sixteen}
$$
式中x轴旋转矩阵$R_1$见于公式$\eqref{eq:fourteen}$，而z轴旋转矩阵R3的公式如下：

$$
\textbf{R}_\textbf{3}(θ)=\begin{pmatrix}
  cosθ & sinθ & 0 \\
  -sinθ & cosθ & 0 \\
  0 & 0 & 1 \\
  \end{pmatrix}.\tag{17}
$$
其中$ϵ_0 = 84381.406^{''}$是J2000.0历元黄道与J2000.0历元平赤道的倾角， 而$ψA、ωA和χA$三个角 度可从美国海军天文台在2005年发布的文件[Kaplan 2005]公式(5.7)获得，也可从国际地球 自转和参考系服务规范(IERS Conventions)在2010年发布的文件[IERS Conventions 2010]中公 式(5.39)和(5.40)找到。 下面把这些公式列出。

$$
\begin{array}{lcl}
ψ_A  & = & 5038.481507^{''}T − 1.0790069^{''}T^2 − 0.00114045^{''}T^3 + 0.000132851^{''}T^4 − 9.51^{''} × 10^{−8}T^5 \\
ω_A  & = & 84381.406^{''} − 0.025754^{''}T + 0.0512623^{''}T^2 − 0.00772503^{''}T^3 − 4.67^{''} × 10^{−7}T^4 + 3.337^{''} × 10^{−7}T^5\\
χ_A  & = & 10.556403^{''}T − 2.3814292^{''}T^2 − 0.00121197^{''}T^3 + 0.000170663^{''}T^4 − 5.60^{''} × 10^{−8}T^5
\end{array},\tag{18}
$$
式中$T = (JD − 2451545)/36525$是时刻t离$J2000.0$的儒略世纪，而$JD$是时刻$t$对应的$TDB$儒略日 数。 公式$\eqref{eq:sixteen}$涉及四个矩阵的相乘，乘积结果在[Kaplan 2005]文件中公式(5.10)列出：

$$
\begin{array}{lcl}
P_11(t) & = &  C_4C_2 − S_2S_4C_3 \\
P_12(t) & = & C_4S_2C_1 + S_4C_3C_2C_1 − S_1S_4S_3 \\
P_13(t) & = &  C_4S_2S_1 + S_4C_3C_2S_1 + C_1S_4S_3 \\
P_21(t) & = & −S_4C_2 − S_2C_4C_3 \\
P_22(t) & = & −S_4S_2C_1 + C_4C_3C_2C_1 − S_1C_4S_3 \\
P_23(t) & = & −S_4S_2S_1 + C_4C_3C_2S_1 + C_1C_4S_3 \\
P_31(t) & = & S_2S_3 \\
P_32(t) & = & −S_3C_2C_1 − S_1C_3 \\
P_33(t) & = & −S_3C_2S_1 + C_3C_1 \\
\end{array}\tag{19}
$$


式中的C和S项如下：


$$
\begin{array}{lcl}
S_1 = sinϵ_0  &   & C_1 = cosϵ_0 \\
S_2 = sin(−ψ_A) &  & C_2 = cos(−ψ_A) \\
S_3 = sin(−ω_A)  &   & C_3 = = cos(−ω_A) \\
S_4 = = sinχ_A  &   & C_4 = cosχ_A \\
\end{array}\tag{20}
$$

### 3.2. 章动矩阵

&emsp;&emsp;章动计算根据国际天文联会推荐的IAU2000A模型并加了IAU2006岁差模型对IAU2000A的微小修正。 计算章动矩阵$\textbf{N}(t)$之前须先计算以下十四个角度。这些公式取自[IERS Conventions 2010]公 式(5.43)和(5.44)。



$$
\begin{array}{lcl}
F_1 ≡ l & = & 月球平近点角 \\
  		& = &  134.96340251^◦ + 1717915923.2178^{''}T + 31.8792^{''}T^2\\
  		&  &  +0.051635^{''}T^3 − 0.00024470^{''}T^4\\
F_2 ≡ l^{'} & = & 太阳平近点角 \\
  			& = &  357.52910918^◦ + 129596581.0481^{''}T − 0.5532^{''}T^2\\
  			&  & +0.000136^{''}T^3 − 0.00001149^{''}T^4\\
F_3 ≡ F & = & L − Ω = 月球平黄经 − Ω \\
  			& = & 93.27209062^◦ + 1739527262.8478^{''}T − 12.7512^{''}T^2\\
  			&  &−0.001037^{''}T^3 + 0.00000417^{''}T^4 \\
F_4 ≡ D & = & 月球与太阳的平距角 \\
  			& = &  297.85019547^◦ + 1602961601.2090^{''}T − 6.3706^{''}T^2\\
  			&  & +0.006593^{''}T^3 − 0.00003169^{''}T^4\\
F_5 ≡ Ω & = & 月球轨道的升交点平黄经 \\
  			& = & 125.04455501^◦ − 6962890.5431^{''}T + 7.4722^{''}T^2\\
  			&  & +0.007702^{''}T^3 − 0.00005939^{''}T^4\\
\end{array}\tag{21}
$$
余下的角度是太阳系八大行星的平黄经和平黄经总岁差，给出的角度单位是弧度。


$$
\begin{array}{rll}
F_6 ≡ & L_{Mercury} = 4.402608842 + 2608.7903141574T \\
F_7 ≡ & L_{Venus} = 3.176146697 + 1021.3285546211T\\
F_8 ≡ & L_{Earth} =1.753470314 + 628.3075849991T\\
F_9 ≡ & L_{Mars} = 6.203480913 + 334.0612426700T\\
F_{10} ≡ & L_{LJupiter} =0.599546497 + 52.9690962641T \\
F_{11} ≡ & L_{LSaturn} =  0.874016757 + 21.3299104960T\\
F_{12} ≡ & L_{LUranus} =  5.481293872 + 7.4781598567T \\
F_{13} ≡ & L_{LNeptune} =   5.311886287 + 3.8133035638T \\
F_{14} ≡ & p_A =   0.02438175T + 0.00000538691T^2\\
\end{array}\tag{22}
$$
下一步是用以下公式计算黄经章动∆ψ和黄赤交角章动∆ϵ：


$$
∆ψ = \sum_{i=1}^{1320}[A_isinθ^A_i+A^{''}_icosθ^A_i]+\sum_{i=1}^{38}[A^{'}_isinθ^{A^{'}}_i+A^{'''}_icosθ^{A^{'}}_i]T \tag{23}
$$


$$
∆ϵ = \sum_{i=1}^{1037}[B_icosθ^B_i+B^{''}_isinθ^B_i]+\sum_{i=1}^{19}[B^{'}_icosθ^{B^{'}}_i+B^{'''}_isinθ^{B^{'}}_i]T ,\tag{24}
$$
式中正弦和余弦函数里的角度如下：


$$
θ^A_i = \sum^{14}_{j=1}C_{ij}^AF_j\ ,\ θ^{A^{'}}_i = \sum^{14}_{j=1}C_{ij}^{A^{'}}F_j\ ,\ θ^B_i=\sum^{14}_{j=1}C_{ij}^BF_j\ ,\ θ^{B^{'}}_i =\sum^{14}_{j=1}C_{ij}^{B^{'}}F_j\ .\tag{25}
$$


$A_i、A^{'}_i、A^{''}_i 、A^{'''}_i 、C^A_{ij}和C^{A^{'}}_{ij}$ 这些系数可从IERS的ftp地址 [ftp://tai.bipm.org/iers/conv2010/chapter5/tab5.3a.txt](ftp://tai.bipm.org/iers/conv2010/chapter5/tab5.3a.txt) 获得。 $A_i和A^{''}_i$ 列在表中头1320行中的第二和第三栏； $A^{'}_i和A^{'''}_i$列在表中最后38行中的第二和第三栏； $C^A_{ij}$列在表中头1320行中的第四到 第十七栏； $C^{A^{'}}_{ij}$列在表中最后38行中的第四到第十七栏。 $B_i , B^{'}_i , B^{''}_i , B^{'''}_i , C^B_{ij}和C^{B^{''}}_{ij}$这些系数可 从IERS的ftp地址[ftp://tai.bipm.org/iers/conv2010/chapter5/tab5.3b.txt](ftp://tai.bipm.org/iers/conv2010/chapter5/tab5.3b.txt) 获得。

&emsp;&emsp;为了确保读取表中的数据无误，下面列出∆ψ和∆的头几项以供参考：

$$
\begin{array}{lcl}
∆ψ & = & −17.20642418^{''}sinΩ + 0.003386^{''} cos Ω \\
 &   & −1.31709122^{''}sin(2F − 2D + 2Ω) − 0.0013696^{''}cos(2F − 2D + 2Ω) + · · · 
\end{array}\tag{26}
$$

$$
\begin{array}{lcl}
∆ϵ & = & 0.0015377^{''}sinΩ + + 9.2052331^{''} cos Ω \\
 &   & −0.0004587^{''}sin(2F − 2D + 2Ω) +0.5730336^{''}cos(2F − 2D + 2Ω) + · · · 
\end{array}\tag{27}
$$

&emsp;&emsp;章动矩阵$\textbf{N}$的计算公式如下：

$$
\textbf{N} = \textbf{R}_\textbf{1}(−ϵ)\textbf{R}_\textbf{3}(−∆ψ)\textbf{R}_\textbf{1}(ϵ_A),\tag{28}\label{eq:Twenty-eight}
$$
式中$ϵ_A$是瞬时黄道相对于瞬时平赤道的倾角，而是瞬时黄道相对于瞬时真赤道的倾角，计算公 式如下：

$$
\begin{array}{lcl}
∆ϵ & = & 84381.406^{''}  + − 46.836769^{''}T − 0.0001831^{''}T^2 + 0.00200340^{''}T^3 \\
 &   & −0.000000576^{''}T^4 − 0.0000000434^{''}T^5\end{array}\tag{29}
$$

$$
ϵ = ϵ_A + ∆ϵ \tag{30}\label{eq:thirty}
$$

其实如果只计算天体相对于瞬时黄道的座标值，章动的计算可以简化。 从公式($\eqref{eq:Thirteen}$可知要计 算$\textbf{R}_\textbf{1}(ϵ)\textbf{N}$的乘积， 又从公式$\eqref{eq:Twenty-eight}$和$\textbf{R}_\textbf{1}(ϵ)\textbf{R}_\textbf{1}(−ϵ) = I$(单位矩阵)可得

$$
\textbf{R}_\textbf{1}(ϵ)\textbf{N} = \textbf{R}_\textbf{3}(−∆ψ)\textbf{R}_\textbf{1}(ϵ_A)=\begin{pmatrix}
  cos ∆ψ & − sin∆ψcosϵ_A & − sin ∆ψ sinϵA\\
  sin ∆ψ & cos ∆ψcosϵ_A & cos ∆ψ sinϵA  \\
  0 & -sinϵA   & cosϵ_A \\
  \end{pmatrix}.\tag{31}
$$


也就是说不须计算黄赤交角章动∆ϵ。

&emsp;&emsp; 黄经章动$∆ψ$含一千多项，前面说过要达到《农历的编算和颁行》([GB/T 33661-2017])规定 的一秒精度要求就要把太阳视位置计算准到$0.04^{''}$。 所以其实不必把$∆ψ$公式中一千多项全部计算，因为其中有很多项是很小的。 其中一个办法是用IAU2000B章动模型，这是一个精度比较低的章动模型，计算公式少于80项， 所得的结果与IAU2000A的偏差在1995年到2050年内不超过$0.001^{''}$。 但是我还是用IAU2000A模型并把所有1358项都计算在内。 这样的确使计算变慢， 但是即使用我家里稍嫌旧的电子计算机，计算从1600年至3500年里所有月相 (包括朔、上弦、 望和下弦)以及所有二十四节气的时刻也只用了约十七六秒。 这样的速度还可以接受，尤其考虑到对于每一个太阳和月球历表，这些TDB时刻只须算一次。 其实章动只影响二十四节气的时 刻，这点会在第七节说明。

## 4. 喷射推进实验室的历表

&emsp;&emsp;美国喷射推进实验室(JPL)编制及不断改良的历表用DE+数字表示，DE后的数字代表某个年代 制定的模型。 DE系列历表都是用数值积分法推算太阳系行星及月球的位置和速度。 历表目的是用于航天活动和天文观测，JPL自1960年代以来不断改良DE历表。 较新的两个历表是2013年发表的DE430和DE431([Folkner et al 2014])。 美国海军天文台和英国皇家航海历书局联合编 的《天文年历》([Astronomical Almanac](https://en.wikipedia.org/wiki/Astronomical_Almanac))自2015年起采用DE430历表的数据， JPL的[Horizons](https://ssd.jpl.nasa.gov/horizons.cgi)网 站现在用DE431的数据计算太阳系天体的位置。 我的农历网站里月相和二十四节气时刻是 用DE431来计算的。

&emsp;&emsp;DE430和DE431历表考虑到343个质量比较大的小行星对大行星的重力摄动。 太阳系各天体的运动计及广义相对论对牛顿力学的修正， 广义相对论的效应以参数化后牛顿$n$体度规推出的动力学方程描述。 此外还计及地球、月球、及太阳因偏离完美球状而引起的额外加速度。

&emsp;&emsp;DE430和DE431历表最主要的差别在于两历表对月球运动的处理方法不同。 DE430加了月球液体核心对固体月幔的阻尼项，使月球位置准确地符合近代的观测数据， 但是由于无法准确测出月球核心的状况，这阻尼项的误差随时间讯速增加， 所以只适宜用来推算近几百年的月球位置。 DE431没有计及这个月核━月幔阻尼项，虽然月球位置在近百年内没有DE430准， 却适宜用来推算超过几百年前后的月球位置。所以DE430历表的年限是1550年至2650年，而DE431历 表的年限则是−13200年至17191年。 

&emsp;&emsp;发布了DE430和DE431历表后，JPL 发布了 DE432、DE433……DE436和DE438历表，这些 新历表只是对DE430历表稍作改良，主要用于特定的航天计划。 JPL 在 2020 年完成了两个新历表 DE440 和 DE441 ([Park et al 2021]) 来取代 DE430 和DE431。 两历表的数值积分方法与 DE430 和 DE431 同，但是增加了七年的新数据及改良了动力学模型和数据校准。

&emsp;&emsp;DE440 和 DE441 增加了众多新数据。 内行星的数据取自信使号水星探测器 (MESSINGER)、 金星快车 (Venus Express)及环绕火星的众多探测器; 月球位置用激光测月 (lunar laser ranging) 测量; 木星位置加了朱诺号探测器 (Juno spacecraft) 的甚长基线阵 (Very Long Baseline Array, 简称 VLBA) 测距数据，大大增加了木星位置的精度; 土星的位置用卡西尼号探测器 (Cassini spacecraft) 改良了的 VLBA 测距数据; 天王星和海王星的位置用传统的光学测量及旅行者号 (Voyager) 探测器经过二行星时的测距数据; 冥王星的位置用掩星观测测量，被掩恒星的位置用 盖亚 (Gaia) 天文卫星的测量数据计算。

&emsp;&emsp; 理论方面，DE440 和 DE441 加了若干新模型。 新模型加了三十颗柯伊伯带天体(Kuiper belt object)，其余的柯伊伯带以一圆环替代，圆环则以三十六个等质量的质点分布在四十四天 文单位的黄道平面表示。 模型也加了因太阳自转而生的伦塞-西凌效应 (Lense-Thirring effect)， 此效应虽然微小，但对拟合信使号探测器的水星测距数据很重要，也对水星近日点进动的速率 有微小修正。 此外，岁差用 Vondrák 等人的模型 ([Vondrák et al 2011] ) 取代 Lieske (1979) 的 岁差模型计算地球定向 (Earth orientation)，月球运动加了测地岁差 (geodetic precession)，地 月系统的运动还加了太阳辐射压力 (radiation pressure) 而生的加速度。 DE440-DE441 的分别与 DE430-DE431 一样: DE440 加了月核-月幔阻尼项，DE441 则没有 此项。 DE440 的年限是 1550年至2650年，DE441 则是−13200年至 17191年。

### 4.1. 下载和读取JPL历表 

&emsp;&emsp;JPL的DE历表以二进制电子文件(binary file)发布。 电子文件存有切比雪夫多项式(Chebyshev polynomials)系数， 作用是以内插方法计算太阳、行星和月球位置和速度的座标值。 切比雪夫多项式系数分时段列出，时段的长度一般是32天。 多项式系数的数目按天体而定， 选择原则是要使切比雪夫内插法所得的位置与DE历表给出的位置偏差不超过0.5毫米([Newhall 1989])， 即$3.3×10^{−15}$天文单位(astronomical unit)。 这内插法的误差小于编制DE历表数值积分法的估计 误差，所以用内插法所得的数据可视为等同于数值积分的数据。 

DE历表的电子文件可从JPL的ftp地址(例如[ftp://ssd.jpl.nasa.gov/pub/eph/planets/Linux/](ftp://ssd.jpl.nasa.gov/pub/eph/planets/Linux/))下 载。 主要文件用二进制格式，需要用软件读取然后用内插法计算天体的位置和速度。 我用Project Pluto编制的C程式读取DE历表并计算天体的位置和速度。 上述JPL的ftp地址对每一 个DE历表都提供一个检验档案， 这档案载有数千或数万个TDB时刻的天体位置或速度的座标值， 目的是供用家检验所用的程式是否正确读取及计算天体的位置和速度。 

&emsp;&emsp;我从上述JPL的ftp地址下载了DE405、DE406、DE430、DE431、DE440和DE441历表的电子文件。 DE405 的文件大小是 53.3MB; DE406 占 190MB; DE430 占 85.5MB; DE431 占 2.6GB; DE440 占 97.5MB; DE441 占 2.6GB。 对于每一个下载的历表，我都用Project Pluto的C程式计算JPL提供的检验档案里的数据， 证实了该C程式算出的数据与检验档案里的数据偏差小于计 算机的浮点舍入误差(floating- point round-off error)，即相对误差小于$2^{−53} ≈ 1.11 × 10^{−16}$。

### 4.2. 计算地心几何位置及速度

&emsp;&emsp;Project Pluto的软件提供了一个C程式函数， 可以用来计算在特定的TDB时刻某天体(太阳、行 星或月球)相对于目标天体(太阳、行星或月球)位置和速度的直角座标值。 该函数先用切比雪夫内插法计算某天体的BCRS位置和速度的座标值$x(t)和v(t)$， 以及目标天体的BCRS位置和速度 的座标值$x_t(t)和v_t(t)$， 然后该天体相对于目标天体的位置座标值用$x(t) − x_t(t)$计算、相对速度的座标值用$v(t) − v_t(t)$计算。 要计算月相和二十四节气的时刻，须计算地心视黄经。所以目标天体是地球， 算出来的$X = x(t) − x_E(t)和V = v(t) − v_E(t)$称为「地心几何位置」和「地心几何速度」，座标轴的方向与ICRS的座标轴方向一致。 要把地心几何位置转化为地心视位置， 须计算光行时和光行差的修正， 然后计算岁差和章动把视位置从ICRS座标值转化成瞬时黄道和真春分点的座标值， 再从瞬时黄道座标值算出地心视黄经。下面两节会详细叙述这些步骤。

## 5. 光行时和光行差

 &emsp;&emsp;由于光速有限，我们在地球上看到天体的位置是较早时该天体的位置， 称为「推迟位 置」(retarded position)，即天体在时刻$t_r$的位置，其发出的光刚刚在时刻t到达地球。 如果用$x(t)$ 表示某太阳系天体在TDB时刻t的BCRS位置、$x_E(t)$表示地球的BCRS位置， 则该天体在GCRS的推迟位置是$X_r(t) = x(t_r) − x_E(t)$， 这个位置修正称为「光行时修正」(light-time correction)。 「推迟时」tr和t有以下关系：

$$
t_r = t − \frac{|x(t_r) − x_E(t)|}{ c}\tag{32}\label{eq:Thirty-two}
$$


其中c = 299792.458公里/秒是光速。这公式忽略了广义相对论里因时空弯曲而引起的时间修正，这修正十分微小：对太阳的时间修正小于$10^{−4}$秒、对月球的时间修正只有$∼10^{−8}$秒。 推迟时$t_r$出现在公式$\eqref{eq:Thirty-two}$的两边，也就是说$t_r$应用迭代方式算出。 但是太阳和月球的运行速度远小于光速，用以下近似公式计算$t_r$就足够了。 

$$
t_r ≈ t − \frac{|x(t) − x_E(t)|}{c} \tag{33}
$$
这个近似公式的相对误差是$∼ (v/c)^2$，这里$v$是天体在BCRS的运行速率。 太阳的质量占太阳系总质量的99.86%，所以太阳在BCRS几乎不动(参看附录A)， 因此太阳的$(v/c)^2$十分微小。 月球绕地球的运行速率约每秒一公里， 而地月质心绕日的速率约每秒三十公里，所以月球的BCRS速率大约是每秒三十公里， 而$(v/c)^2 ∼ 10^{−8}$，也就是说用上面近似公式计算$t_r$造成的误差只会使月球位置误差为$0.002^{''}$，所以可以忽略。 

&emsp;&emsp;光行差也是由于光速有限而引起的。 假设某观测者测量某物体位于方向$n$，另一观测者正 处于第一观测者相同的位置， 但以速度$v$相对于第一个观测者移动，则该物体相对于第二个观测者的方向是$n^{'}， n和n^{'}$都是单位向量， 两者的关系可用狭义相对论中的洛伦兹变换(Lorentz transformation)推出[^6] (见附录C):  

$$
\textbf{n}^{'}=\frac{ γ^{−1}\textbf{n + β + (n · β)β}/(1 + γ^{−1})}{1 + \textbf{β · n}}\tag{34}
$$


其中$\textbf{β = v}/c、γ=1/\sqrt{1-(v/c)^2}$。我们现在要求太阳和月球的地心视位置，地球质心在BCRS动， 所以$\textbf{n = X}_\textbf{r}/|\textbf{X}_r|，而\textbf{v = v}_\textbf{E} = \dot {\textbf{x}}_\textbf{E}$是地球质心在BCRS的速度。 由于$|\textbf{v}_\textbf{E}| ≈ 30公 里/秒$，所以只须把光行差算准到$v/c$就足够了。 把洛伦兹变换公式展开到$v/c$项时，所得的光行差公式与牛顿运动学推出的公式一致: 

$$
\textbf{n}'= \frac{\textbf{n + β}}{\textbf{|n + β|}}\ ,\tag{35}
$$
这称为「周年光行差」(annual aberration)，因为$β$随地球绕日公转呈现一年的周期变化。 另一 种光行差称为「周日光行差」(diurnal aberration)，这是由地球自转而产生的光行差，但是周日光行差只影响天体相对于地面上的视位置。 月相和节气是根据太阳和月球的地心视位置来定， 不涉及周日光行差。 

&emsp;&emsp;光行差把天体的位置移了$∼ v_E/c ≈ 10^{−4} ≈ 20.5''$。 虽然太阳的光行时修正很微小，但是如果忽略光行差，二十四节气的时刻会有约八分钟的偏差， 而八分钟是光从太阳到地球所需的大约时间，这并不是巧合。 [Urban & Seidelmann 2013]书中第7.2.3节讲述了一个简单方法计算光行时和光行差的总效应，这总效应又称「行星光行差」(planetary aberration)。 这里把书中的所述的方法简单推导出来。从$\textbf{n = X}_\textbf{r}/|\textbf{X}_\textbf{r}|$和公式(35)可得:

$$
\begin{array}{lcl}
\textbf{n}' & ∝ & \frac{\textbf{X}_\textbf{r}}{|\textbf{X}_\textbf{r}|} + \frac{\dot x_E}{c} \\
   & = & \frac{X(t_r)-x_E(t)}{|X(t_r)-x_E(t)|} + \frac{\dot x_E}{c} \\
   & ∝ & x(t_r) −[x_E(t) - \frac{|x(t_r) − x_E(t)|}{c}\dot x_E] \\
   & ≈ & x(t_r) −x_E(t-\frac{|x(t_r) − x_E(t)|}{c}) \\
   & = & x(t_r) -x_E(t_r).\tag{36}
\end{array}
$$


也就是说，光行时和光行差的总效应算准到v/c时得出的地心视位置可用以下简单公式算出:

$$
X_{apparent}(t) = x(t_r) − x_E(t_r). \tag{37}
$$
太阳的推迟时$t_r$是光从太阳到地球所需的时间，约为八分钟。 月球的推迟时$t_r$约1.3秒，要达到《农历的编算和颁行》([GB/T 33661-2017])规定的一秒精度要求也不可忽略。 用公式(37)来 计算光行时和光行差的总效应十分方便， 如前述，Project Pluto已提供了C程式函数计算任何TDB时刻太阳系天体的地心几何位置$x − x_E$。 公式(37)说在时刻t的地心视位置等于在时刻tr的地心几何位置。

&emqp;&emsp;除了地心视位置外，计算地心视位置对时间的导数也很有用。 对公式(37)两边取时间导数 得:

$$
\dot X_{apparent}(t) = [\dot x(t_r) − \dot x_E(t_r)]\frac{dt_r}{dt}. \tag{38}
$$
用$D(t_r) = |x(t_r) − x_E(t)|$代表天体的推迟距离，结合公式(32)可得

$$
\frac{dt_r}{dt} = 1-\frac{\dot D(t_r)}{c}\frac{dt_r}{dt}\Rightarrow\frac{dt_r}{dt} = \frac{1}{1+v_r(t_r)/c},\tag{39} 
$$
式中$v_r = dD/dt$是天体相对于地球的径向速度(radial velocity)。 公式(38)可写成:

$$
\dot X_{apparent}(t) = \frac{\dot X(t_r)-\dot X_E(t_r)}{1+v_r(t_r)/c}\tag{40}
$$
公式右边的分母是解开超光速运动之谜的关键。 超光速运动见于活动星系核发出的喷流，其解释相当简单: 如果喷流以接近光速并大致沿观测者的视线方向移动， 则$1 + v_r/c\ll 1$并有可 能使喷流的切向速率(tangential speed)大于光速。 但是$v_r/c$对于月球和太阳则可忽略，原因是 地球绕日公转轨道和月球绕地球轨道都很接近圆形， 所以相对距离D变化很小，径向速度也 相应地小。 太阳的径向速度约$|v_r| ∼ 0.5公里/秒$(参看附录A)，月球的径向速度约$|v_r| ∼ 0.05公 里/秒$(参看附录B)。 忽略了分母$(1 + v_r/c)$只会使太阳的$|\dot X_{apparent}|$有约$10^{−6}$的相对误差， 使月 球的$|\dot X_{apparent}|$有约$10^{−7}$的相对误差。 第七节会说到这误差基本上不会影响月相和二十四节气时刻的准确度， 所以我把分母$(1 + vr/c)$略去，用以下公式计算$|\dot X_{apparent}|$: 

$$
\dot X_{apparent}(t) = \dot x(t_r) − \dot x_E(t_r)=v(t_r)-v_E(t_r). \tag{41}
$$



上面说过Project Pluto有C程式函数计算任何时刻的地心几何速度。

## 6. 地心视黄经

 朔、上弦、望、下弦和二十四节气是用太阳和月球的地心视黄经来定义的。 某TDB时刻t的地 心视黄经可综合第二节、第三节和第五节的公式计算。 这里把步骤列出。

1. 计算天体(太阳或月球)的GCRS几何位置$X_{geometric}(t) = x(t) − x_E(t)$， 这里$x$是该天体的$BCRS$位置，$x_E$是地球的$BCRS$位置。 这可直接用Project Pluto提供的C函数计算。 

2. 用近似公式$t_r ≈ t − |X_{geometric}(t)|/c$计算推迟时$t_r$。 

3. 用公式$X_{apparent}(t) ≈ x(t_r)−x_E(t_r)$计算天体的视位置。 这步也是直接用Project Pluto的C函 数计算，所得的是天体的GCRS座标值。 如前述，GCRS座标原点在地球质心，座标轴方 向与ICRS座标轴方向一致。

4. 用公式(18)、(19)和(20)计算岁差矩阵$P (t)$， 再用公式(21)–(23)、(25)、(29)和(31)计算矩 阵积$R_1(ϵ(t))N(t)$。 

5. 用以下公式把天体的地心视位置从GCRS的座标值$X_{apparent}(t)$转化为瞬时黄道和真春分点 的黄道座标值: 

     $$
   X_{ec}(t) = R_1(ϵ(t))N(t)P(t)BX_{apparent}(t), \tag{42}
   $$
    (42) 其中参考架偏差矩阵$B$由公式(11)给出。 

6. 天体的地心视黄经$λ$用公式$λ = arg(X_ec+iY_{ec})$得出， 即$λ = tan^{−1} (Y_{ec}/X_{ec})$并取适当象限。 计算$λ$的时间导数也很有用。对公式$λ = tan^{−1} (Y_{ec}/X_{ec})$求时间导数得: 

   $$
   \dot λ(t) = \frac{X_{ec}\dot Y_{ec} − Y_{ec}\dot X_{ec}}{ X^2_{ec} + Y^2_{ec}}.\tag{43}
   $$
   

要计算$\dot X_{ec}和\dot Y_{ec}$，可对公式(42)求时间导数:

$$
\dot X_{ec}(t) = R_1(ϵ(t))N(t)P(t)B\dot X_{apparent}(t) + \frac {d} {dt} [R_1(ϵ(t))N(t)P(t)]BX_{apparent}(t).\tag{44}
$$
&emsp;&emsp;第一项缘于天体与地球的相对运动；第二项缘于瞬时黄道和真春分点的黄道座标轴因岁差和章 动而变动。 第二项显然远小于第一项，可以忽略。 也就是说天体地心视位置的瞬时黄道座标 对时间的导数可用以下公式计算:

$$
\dot X_{ec}(t) ≈ R_1(ϵ(t))N(t)P(t)B\dot X_{apparent}(t)=R_1(ϵ(t))N(t)P(t)B[v(t_r)-v_E(t_r)] .\tag{45}
$$
式中$v(t_r) − v_E(t_r)$也是直接用Project Pluto的C函数计算。 

&emsp;&emsp;这里不妨粗略计算因忽略了第二项而引起的误差。地球绕日的恒星周期是365.2564日， 所以 太阳在黄道的GCRS座标值每日的变化大约是$360^◦/365.2564 ≈ 1 ^◦$， 因此太阳的$|\dot X_{apparent}|/|X_{apparent}| ≈ 1^◦/日$。 月球绕地球的恒星周期是27.3217日， 重复以上计算可得月球的$|\dot X_{apparent}|/|X_{apparent}| ≈ 13^◦/日$。现在比较一下岁差和章动的效应。 岁差的主要成分是使春分点沿黄道移动$50.3''/年$， 即$|\dot P| ∼ 0.14''/日$， 这里$|\dot P|$是指矩阵元素绝对值之最大者。 章动的主要成分是周期为18.6年、 因月球绕地球轨道进动而产生的摆动， 其效应见于公式(26)的第一项。 因此$|d(R_1(ϵ)N)/dt| ∼ 17.2''|\dot Ω|$， 而从公式(21)可得$|\dot Ω| ≈ 7000000''/世纪 ≈ 10^{−3} 弧度/日$，由此可算出$|d(R_1(ϵ)N)/dt| ∼ 0.02''/日$。 因此第二项由岁差主宰。 对太阳来说，$|\dot P|/|X_{apparent}| ∼ 4 × 10^{−5}$。 对月球来说， 其值是$∼ 3 × 10^{−6}$。 总括来说，忽略了第二项会使太阳的$\dot X_{ec}$有约$4 × 10^{−5}$相对误差， 使月球 的$\dot X_{ec}$有约$3 × 10^{−6}$的相对误差。 下一节会说明这样的误差基本上不影响计算月相和二十四节气时刻的准确度。

## 7. 计算月相和二十四节气的TDB时刻

&emsp;&emsp;二十四节气的定义是太阳的地心视黄经达到$15^◦$的整数倍的时刻。 用弧度表示，$15^◦$是π/12弧 度。此后所有角度都用弧度表示。 朔的定义是月球的地心视黄经与太阳地心视黄经相等的时刻。 为方便起见，这里引入一个函数P，定义如下: 

$$
P(x) ≡ x − 2π\left[\frac{x + π}{ 2π}\right],\tag{46}
$$
其中[x]表示小于x的最大整数，也就是说算符[ ]与C和python的floor函数一致。 P(x)其实是把x加上2π的整数倍，使其值规范在[−π, π)区间内。 

&emsp;&emsp;朔的定义可用函数P写成$P(λ_M − λ_S) = 0$， 这里$λ_S$是太阳的地心视黄经，$λ_M$是月球的地心视黄经。 上弦的定义是$P(λ_M − λ_S) = π/2$；望的定义是$P(λ_M − λ_S) = −π$； 下弦的定义 是$P(λ_M − λ_S) = −π/2$。 

&emsp;&emsp;计算月相和二十四节气的时刻最终是要求出方程$f(t) = 0$的根，下表列出计算月相和二十四 节气所需的函数$f$。 注意$λ_S$和$λ_M$都是时间t的函数。

$$
\begin{array}{cc}
\hline
月相 &   & 函数f \\
\hline
朔  &  & P(λ_M − λ_S) \\
上弦  &  & P(λ_M − λ_S −π/2)\\
望  &  & P(λ_M − λ_S −π)\\
下弦  &  & P(λ_M − λ_S+ π/2)\\
\hline
\end{array}
$$



$$
\begin{array}{ccccc}
\hline
节气 & 函数f  &|& |&中气 & 函数f \\
\hline
 J1(立春) & P(λ_S+π/4) & |& |&Z1(雨水) & P(λ_S+π/6) \\
 J2(惊蛰) & P(λ_S+π/12) & |& |&Z2(春分) & P(λ_S) \\
 J3(清明) & P(λ_S-π/12) & |& |&Z3(谷雨) & P(λ_S-π/6) \\
 J4(立夏) & P(λ_S-π/4) & |& |&Z4(小满) & P(λ_S-π/3) \\
 J5(芒种) & P(λ_S-5π/12) & |& |&Z5(夏至) & P(λ_S-π/2) \\
 J6(小暑) & P(λ_S-7π/12) & |& |&Z6(大暑) & P(λ_S-2π/3) \\
 J7(立秋) & P(λ_S-3π/4) & |& |&Z7(处暑) & P(λ_S-5π/6) \\
 J8(白露) & P(λ_S-11π/12) & |& |&Z8(秋分) & P(λ_S-π) \\
 J9(寒露) & P(λ_S+π/4) & |& |&Z9(霜降) & P(λ_S+5π/6) \\
 J10(立冬) & P(λ_S+3π/4) & |& |&Z10(小雪) & P(λ_S+2π/3) \\
 J11(大雪) & P(λ_S+7π/12) & |& |&Z12(冬至) & P(λ_S+π/2) \\
 J12(小寒) & P(λ_S+5π/12) & |& |&Z13(大寒) & P(λ_S+π/3) \\
\hline
\end{array}
$$


&emsp;&emsp;表中的二十四节气分节气和中气列出，节气用J+数字标记，中气用Z+数字标记。 这些标记 在以下7.4节所述的时间表用到。

&emsp;&emsp;月相的计算只涉及日月黄经之差$λ_M − λ_S$，即日月的角距离投射到黄道的角度， 这与章动无关，因为章动是由地球自转轴在空间之摆动而生。计算月相时可把黄经章动定为零: ∆ψ = 0。 这也可从数式看出: 章动矩阵中$R_3(−∆ψ)$的作用是把黄经加上修正项∆ψ， 由于$λ_M$和$λ_S$都加上 了相同的修正项，$ λ_M − λ_S$便把加上的∆ψ抵消了，我也从实际的数值计算上证实确是如此。 从物理学上也可看出λM − $λ_S$只涉及黄道岁差，而不涉及赤道岁差(见下面7.3节)。但是我并没有 简化岁差的计算，因为计算岁差并不费时。

### 7.1. 牛顿━拉弗森求根法

&emsp;&emsp;要计算月相和二十四节气的TDB时刻，最好的解$f(t) = 0$方程的方法是用牛顿━拉弗森(Newton-Raphson)求根法。 这是一个用迭代方式来逼近f(t) = 0方程的根。 设若$t_n$为第n次迭代的数值， 则下一轮迭代的数值用以下公式计算: 

$$
t_{n+1} = t_n − \frac{f(t_n)} {\dot f(t_n)}\tag{47}
$$
在计算二十四节气时，函数f的时间导数$\dot f = \dot λ_S$; 在计算月相时，$\dot f = \dot λ_M − \dot λ_S$。 $\dot λ_S$和$\dot λ_M$可用上 一节的方法计算。 要用迭代公式(47)，必须提供初始值$t_1$。 我们知道地球绕日轨道和月球绕地 球轨道都接近圆形，所以太阳和月球在天球上的视运动大致均匀， 故可用类似「平气」或「平 朔」方法计算t1，明确地说是假设 $\dot λ_S$和$\dot λ_M$是常数， 由此估算月相或二十四节气的大约时刻。 要计算f(t) = 0在接近给定TDB时刻$t_0$的根，可用$t_1 = t_0 − f(t_0)/ \dot f(t_0)$作为初始值。 但是这样只 会求得f(t) = 0的一个根，我们知道f(t) = 0有多重根，有时候或会要求某个特定的根。 例如要求某个冬至之前的第一个朔，或是某个朔之后的第一个望。 在这些情况下，要求的根可以表达 成在某时刻$t_0$之前或之后的第一个根，而$t_1$的计算可以修改如下: 

$$
t_1 = t_0 − \frac {f(t_0)} {\dot f(t_0)} + \frac{2kπ}{\dot f(t_0)} ,\tag{48}
$$
式中k是整数，其值视乎情况可以是0、1或−1。 因为$\dot f$接近常数，$2π /\dot f$也接近常数。 在计算二十四节气时，$2π /\dot f$接近回归年365.2422日； 在计算月相时，$2π /\dot f$接近朔望月的平均 值29.5306日。 所以上面公式其实是先把$t_1$定为$t_0 − f(t_0)/\dot f(t_0)$， 然后视乎情况加上或减去 一个周期。这里考虑以下两种情况。

**情况一**: 要求$t_0$之前的第一个根。在这情况下，要使$t_1 < t_0$。 如果$f(t_0) > 0$，则选k = 0；如 果$f(t_0) < 0$，则选k = −1。 (注意$f(t_0) ∈ [−π, π)$而且$\dot f(t0) > 0$) 

**情况二**: 要求$t_0$之后的第一个根。在这情况下，要使$t_1 > t_0$。 如果$f(t_0) > 0$，则选k = 1；如 果$f(t_0) < 0$，则选k = 0。

&emsp;&emsp;定了$t_1$后，即可启动迭代程序，数列${t_n}$讯速收敛。 我定的收敛条件是当$|t_n − t_{n−1}| < ε$时就终止迭代程序， 而我选ε = $10^{−8}$日 = 0.000864秒， 从公式(47)可知这收敛条件等 于$|f(t_{n−1})/ \dot f(t_{n−1})| < ε$。 把ε定为$10{−8}$日其实已接近计算机的浮点舍入误差。 原因是Project Pluto的C函数用儒略日数作TDB时间的输入，然后计算天体的位置和速度。 J2000.0的儒略日数是2451545，这是七个位的整数， 其实从公元前1976年到公元22666年间儒略日数的整数部分都是七位数， 所以时刻算准到$10^{−8}$日就等于说儒略日数算准到15个有效数位。 

&emsp;&emsp;用牛顿━拉弗森方法计算月相和二十四节气时刻十分有效， 定了$t_1$后，只须经三到四次迭代过程就已达到指定的收敛条件。 所以即使用我家里已稍为嫌旧的电子计算机，计算从1600年到3500年所有朔、 上弦、望、下弦和所有二十四节气的时刻只用了大约十七秒。[^7] 编程式的初期，我并没有用公式(31)简化$R_1(ϵ)N$的计算， 把不必要的黄赤交角章动∆ϵ也计算了，计算月相时把不必要的∆ψ也计算了，那时用了大约九十秒的时间才算完。 ∆ϵ的公式有1056项由 三角函数组成的级数， 而黄经章动∆ψ的公式有1358项三角函数组成的级数。 我也试过只计算∆ψ和∆ϵ的头几项， 那时只用了几秒就把1600年到3500年的所有月相和节气时刻算完。 由此可知在那十七秒里，大部分的时间花在计算∆ψ上。 假如我不是用JPL的历表，而用半解析(semi-analytic)的历表例如VSOP87或ELP/MPP02历表， 情况也许不同，因为这些历表含三角函数项达到数千以至数万，比章动的级数项还要多数倍至数十倍。 这就是JPL历表的一个很大的优点，天体的位置和速度用切比雪夫内插法计算， 不但计算速度快而且比那些半解析历表更准确。但是JPL历表也有缺点。 其一是历表的电子文件大，这是为了使切比雪夫内插法的准 确度达到数值积分法本身的准确度。 不过目前最大的JPL文件(用于DE431历表)是2.6GB，相对于现在一般记忆体的容量来说还不算很大。 另一个缺点是JPL历表只能计算历表包含的年限， 年限以外的数据不能用外插法取得。 不过DE431历表的年限是从−13200年到17191年，对很多 应用应该已足够了。 

&emsp;&emsp;上面说过，我设定的收敛条件相当于$|f(t)/ \dot f(t)| < ε$。 因此计算出的时刻准确度基本上由f(t)与0的偏差而定，$\dot f(t)$的作用是提供换算因子使f(t)与0的偏差转化为时间误差。 前面说过我计算$\dot λ_S$和$\dot λ_M$时略去了某些项。 具体地说，略去了公式(38)中的$dt_r/dt$使$\dot λ_S$有$∼ 10^{−6}$的 相对误差， 使$\dot λ_M$有∼ $10^{−7}$的相对误差； 略去了公式(44)的第二项使$\dot λ_S$有∼ 4 × 10−5的相对误 差， 使$\dot λ_M$有$∼ 3 × 10^{−6}$的相对误差。 由于计算出的时刻误差由|$|f(t)/ \dot f(t)| < ε$决定，$\dot  f$的 误差相当于改变了ε的数值。 例如假设$\dot  f$的相对误差是$10^{−4}$，在最坏的程况下等于把ε的数值变 成1.0001ε， 由于$ε = 10^{−8}日 = 0.000864秒$，1.0001ε = 0.0008640864秒。 所以计算出的时刻精 确度几乎不因$\dot  f$的微小误差而受影响。 即使$\dot  f$的相对误差大到10%也无碍， 只要把ε的数值定得远少于真正要达到的精度就可以了。 因为$\dot  f$接近常数，我因好奇试把$\dot  f$在计算节气时定为常 数2π/365.2422日、在计算月相时定为常数2π/29.5306日，然后计算从1600年到3500年的月相和 二十四节气时刻， 发现所算出的节气时刻与用精确$\dot  f$算出的节气时刻偏差不超过0.00016秒、 月相的时刻偏差不超过0.00024秒，这些偏差都小于预设的ε。 但是这并不是说精确的$\dot  f$毫无用 处。 虽然用这些粗糙的$\dot  f$不影响算出时刻的精度，但是收敛过程变得慢了。 用粗糙的 $\dot  f$计算节 气时要用上多至七次迭代过程才达到预设的收敛条件、计算月相时则须要用到多至十二次迭 代过程才能收敛，这使计算过程慢了很多。 其实这也不奇怪，牛顿━拉弗森方法是二阶的方 法(second-order scheme)，收敛速度比一阶方法快得多，但是二阶收敛的先决条件是$\dot  f$必需算得准。 用JPL历表计算准确的  $\dot  f$并不困难：  $\dot  f$涉及地球、月球和太阳的运动速度， 而天体的速度 在JPL发布的历表里取位置对时间的导数而得，位置用切比雪夫多项式展开，所以速度涉及切比雪夫多项式的导数。 切比雪夫多项式及其导数都可用递归公式(recurrence equations)计算。

### 7.2. 不同历表和岁差模型的时间差异 

&emsp;&emsp;我用JPL的DE431、DE430、DE406、DE440和DE441历表计算了月相和二十四节气的TDB时刻， 然后比较这些历表算出来的时刻差异。 前面说过，DE430和DE431的差别只在于DE430加了月核━月幔的阻尼项来计算月球位置。 JPL建议用DE430历表来计算在J2000.0前后几百年的月球位置，而在这段时间之外的月球位置应用DE431历表。 我比较了用DE430和DE431历表从1600年到2500年期间的月相和节气时刻， 发现算出的月相时刻偏差不超过0.85秒、节气时刻偏差不超过0.000419秒(< ε)。 而在1600年到2200年内的月相时刻偏差不超过0.2秒、节气时刻偏 差不超过0.00015秒(< ε)。 注意节气时刻偏差小于预设的计算精度ε = 0.000864秒， 所以由两历表算出的二十四节气时刻基本上没有差别。 

&emsp;&emsp;DE405历表于1998年发行。 美国海军天文台和英国皇家航海历书局联合编的《天文年历》(Astronomical Almanac)从2003年到2014年的数据就是取自DE405历表。 DE406历表在同一年与DE405历表同时发行，DE406和DE405是用同一数值积分法来计算太阳系行星和月球位 置，只是DE406的年限比较长(−3000年到3000年)， 为了使发行的电子文件不至太大(以当年的 标准来说)，DE406发行时把切比雪夫多项式系数的数目减小了， 所以发行的历表精度比较低。 我比较过从DE431和DE406算出的月相和节气时刻， 发现从1600年到2500年，二十四节气时刻 偏差不超过0.14秒、月相时刻偏差不超过0.18秒。 

&emsp;&emsp;DE440和DE441历表于2020年发行。 比较 DE431 和 DE440 在 1600年至 2500 年的气朔时刻，发现节气时刻最大偏差是 0.81秒，月相时刻的最大偏差是 1.06 秒。 如果将比较年份缩到 1800年至 2200年，节气时刻最大偏差是 0.15 秒，月相时刻的最大偏差是 0.08 秒。 比较 DE431 和 DE441 在 1600年至 2500年的气朔时刻，发现节气时刻最大偏差是 0.81 秒，月相时刻的最大 偏差是 1.15 秒。 如果将比较年份缩到 1800年至 2200年，节气时刻最大偏差是 0.15秒，月相时 刻的最大偏差是 0.11秒。

&emsp;&emsp; Vondrák等人在2011年发表的一篇文章([Vondrák et al 2011])指出，IAU2006岁差模型只适用于J2000.0的前后一千年左右，在这时段以外的精度大减。 [Vondrák et al 2011]文章的作者创立 了一套新岁差模型，可以用来计算J2000.0前后二十万年的岁差。 广受欢迎的开放源代码天象软件(open-source planetarium software)Stellarium采用了这个新岁差模型， 我建立的星图网站也用这岁差模型。 如上述，JPL 在 2020年编制 DE440 和 DE441历表时用此岁差模型取代了比较 旧的 Lieske (1979) 岁差模型来计算地球定向。 

&emsp;&emsp;此岁差模型有几个版本，我用最接近 IAU2006 模型的算法，将公式(18)中的角度 $ψ_A、 ω_A 和 χ_A$改用 [Vondrák et al 2011] 文章中的公式(11)、(13)、表4和表6计算。 我用DE431历 表计算太阳和月球的GCRS位置，然后比较用两岁差模型计算的月相和节气时刻。 结果是 在1600年与2500年内，两岁差模型的二十四节气时刻偏差不超过0.19秒、月相时刻偏差不超 过0.00037秒(< ε)； 在1600年与3500年内，两岁差模型的二十四节气时刻偏差会达到3秒、但月相时刻偏差不超过0.0035秒。 月相和节气的时刻偏差相差很大，其实这并不难理解。 二十四节气用太阳的视黄经来定，即真春分点和太阳沿黄道的角距离。 月相由月球和太阳的视黄经之差来定，即月球和太阳的角距离投射到黄道的角度。 所以月相只涉及黄道岁差，二十四节气却涉及赤道岁差和黄道岁差， 黄道岁差远小于赤道岁差，加上月亮运行比较快，使月相时刻的差异 远小于节气时刻的差异。 

&emsp;&emsp;综合以上各项比较，我估计用DE431历表和IAU2006岁差模型计算出的月相和二十四节气 的TDB时刻在1800年至2200年内的误差应该小于0.2秒。 

&emsp;&emsp;DE441 和 DE431 的年限相同，所以可以比较两历表在较长时期的偏差。 发现两者在 −2000年至 2500年节气的 TDB 时刻最大偏差发生在 −2000年，偏差为 45秒，月相 TDB 时刻最大偏差发生在 −1999年，偏差为 416秒。 这显示两历表在远古时期有较大偏差，但是历法和 日月食计算以 UT1 为准， TDB 与 UT1 的偏差以 $∆T = T T − UT_1 ≈ TDB − UT_1 $表示。 可惜的是 1600年以前没有准确的 ∆T 观测数据， −2000年期间 ∆T 的估计误差是 0.3小时 (见英国皇家航海历书局的 Earth Rotation (地球自转) 网页，此误差比 DE431 和 DE441 两历表在这 时期的气朔 TDB 时刻偏差大。

### 7.3. Fukushima-Williams 岁差公式 

&emsp;IAU 2006 岁差模型的矩阵公式(16)采用Capitanie、Wallace和Chapront提出的公式。 其实计算岁差还有若干个等价的表示式(见[Urban & Seidelmann 2013]第6.6.2节)，其中值得一提的 是Fukushima-Williams公式:

$$
P = R_1(−ϵ_A)R_3(−Ψ)R_1(φ)R_3(γ).\tag{49}
$$
如果用$C_0$表示J2000.0的历元北黄极，C表示瞬时北黄极，$P_0$表示J2000.0的历元平北天极，$P$表 示瞬时平北天极。 $γ$是从$P_0$看由$C_0$到$C$的角度，$φ$是从$P_0$到$C$的角距离，$Ψ$是从$C$看由$P_0$ 到$P$的 角度，$ϵ_A$是瞬时黄道相对于瞬时平赤道的倾角。[Urban & Seidelmann 2013]书中图6.4描绘了 这些角度。 也可用另一方式描述这三个角度:$φ$是瞬时黄道相对于J2000.0历元平赤道的倾 角，$γ$是$C$的$J2000.0$历元平赤经和$C_0$的$J2000.0$历元平赤经(其值是−π/2)之差，$Ψ$是$P$的瞬时平黄经(其值是π/2)和$P_0$的瞬时平黄经之差。 从这些描述可知$γ$和$φ$涉及黄道岁差，$Ψ$涉及从瞬时黄道参考系观看的赤道岁差。 结合公式(31)和(49)得出

$$
R_1(ϵ)NP = R_3(−∆Ψ)R_3(−_Ψ)R_1(φ)R_3(γ) = R_3(−∆Ψ − Ψ)R_1(φ)R_3(γ).\tag{50}
$$
其中$R_3(−∆Ψ − Ψ)$矩阵把黄经加上了$Ψ + ∆Ψ$，在计算$λ_M − λ_S$时把加上去的值抵消了，所以计 算月相时不须要计算$R_3(−∆Ψ − Ψ)$矩阵。 这公式明确显示月相的时刻只涉及黄道岁差，而与 赤道岁差和章动无关。 

&emsp;&emsp;计算与IAU 2006模型类同的岁差模型，可用[Urban & Seidelmann 2013]表6.3的公式计算$γ、φ$和$Ψ$:

$$
\begin{array}{lcl}
γ & = & 10.556403''T + 0.4932044''T^2 − 0.00031238''T^3 \\
  &  & −2.788'' × 10^{−6}T^4 + 2.60'' × 10^{−8}T^5\\
φ  & = & 84381.406'' − 46.811015''T + 0.0511269''T^2 + 0.00053289''T^3\\
  &  & −4.40'' × 10^{−7}T^4 − 1.76'' × 10^{−8}T^5\\
Ψ & = &  5038.481507''T + 1.5584176''T^2 − 0.00018522''T^3 \\
  &  & −2.6452'' × 10^{−5}T^4 − 1.48'' × 10^{−8}T^5\\
\end{array}\tag{51}
$$
公式(50)配(51)所算出的矩阵$R_1(ϵ)NP$和用IAU2006/2000A岁差和章动模型算出的矩阵(即用公式(16)、(18)和(31))虽然在数值上不完全相同，但两者的结果相对于IAU2006岁差模型的精度 来说是等同的。 我比较了用公式(50)配(51)和用IAU2006/2000A模型的计算结果(月球和太阳位置都用DE431历表计算)，发现在1600年到3500年间，月相和二十四节气的时刻差异都不大 于0.00016秒(< ϵ)。公式(50)虽然比较简洁优美，但并没有显著提高整体计算效率，这也是意料之中，因为计算岁差并不费时。

### 7.4. 月相和二十四节气之TDB时间表

&emsp;&emsp;虽然计算月相和二十四节气的TDB时刻颇为复杂，但是选定了某一特定历表以及岁差和章动模型后只需要计算一次。 我用DE431历表的数据计算这些时刻，主要是因为这历表的年限比较 长(−13200年至17191年)。 虽然 DE431历表在 2020年已被 DE441历表取代，但两者算出的气朔时刻在近几个世纪偏差甚微，在远古及遥远未来的时刻偏差虽然较大，但小于 ∆T 数据的误 差。 鉴于用 DE441历表算出的 UT1+8/UTC+8 气朔时刻不比 DE431历表的时刻更准，现在暂时没有必要更新农历网站的气朔时刻。 

&emsp;&emsp;我把算出的时刻存在两个ASCII档案里。 第一个档案的名称是TDBtimes.txt，存有从1600年 到3500年月相和二十四节气的TDB时刻。 第二个档案的名称是TDBtimes extended.txt，存有 从−4000年到8000年的TDB时刻。 这两个档案可从我的GitHub贮存室 src 文件夹里下载。 第 二个档案经过了压缩，在贮存室的名称是TDBtimes extended.txt.gz，可用Linux的gzip程式 或其他类似的程式解压。 

&emsp;&emsp;TDBtimes.txt的时刻用DE431历表加上IAU2006/2000A岁差和章动模型计算。 上面说过 IAU2006岁差模型只适用于J2000.0前后约一千年。 TDBtimes extended.txt的时刻改用 [Vondrák et al 2011]的岁差模型计算，这岁差模型的有效年限是J2000.0前后约二十万年。 至 于IAU2000A章动模型的有效年限不大明确，这章动模型用到上面公式(21)中月亮和太阳相关的 角度，这些公式取自[Simon et al 1994]文章，文章作者建议用这些公式时最好把使用年份限制 在公元前4000年到公元8000年间。 我想IAU2000A章动模型的有效年限大概也是这个时期，所 以TDBtimes extended.txt列出从−4000年(即公元前4001年)到8000年的时刻。 

&emsp;&emsp;两个档案的数据结构是为了方便编算农历而设。 下面先讲解TDBtimes.txt的数据结构，然后讲述使用TDBtimes extended.txt时要注意的事项。 

&emsp;&emsp;TDBtimes.txt文件含1901行和87栏。第一栏是公历年。 第二栏以jd0标记，是公历年1月−1日 TDB16时的儒略日数，即1月0日(TDB+8)零时的儒略日数。 例如在公元2000年那行jd0栏的值 是2451543.166666667，是2000年1月−1日TDB16时(即1999年12月30日TDB16时)的儒略日数。 jd0栏 的值总会是某整数+1/6，因为其TDB时刻总是16时。 jd0的值是该行其他栏列出日期的起始时刻，即是说该行其他栏所列日期的儒略日数是jd0+所列的日数。 

&emsp;&emsp;第三栏以Z11a标记，是最接近jd0的那个冬至时刻，对于TDBtimes.txt涵盖的年份，这 个冬至是前一个公历年的冬至。 例如公元2000年那行的Z11a栏是−8.343841734507215， 就 是说1999年冬至的儒略日数是2451543.16666667 − 8.343841734507215，即1999年12月22日TDB 7:44:52。 第四至二十七栏是Z11a以后的二十四节气时刻，由J12(小寒)到Z11b(冬至)。 Z11b栏 的冬至时刻和下一行的Z11a栏的时刻一致，数值不同是因为两行的jd0值不同。 二十四节气各 栏的标记用J+数字表示节气、用Z+数字表示中气。 所用标记的二十四节气名称可从在上面二十四节气表查得。

&emsp;&emsp;第二十八栏以Q0_01标记，是发生在Z11a栏冬至之前的第一个朔的时刻。 余下的栏(第二十九至第八十七栏)所列的时刻是上弦(标以Q1_xx)、望(标以Q2_xx)、下弦(标以Q3_xx)和其他的朔(标以Q0_xx)依时间次序排列。 这里xx的值从01到15，是从Q0_01栏的朔算起的朔望月数。 每 行列出涵盖15个朔望月里的朔、上弦、望和下弦时刻。 

&emsp;&emsp;TDBtimes extended.txt的数据结构和TDBtimes.txt一样，但有一点要注意。 根据目前通用的公历纪日法，1582年10月15日起才开始使用格里高利历，之前是用儒略历。 所以1583年前的jd0是指儒略历1月0日(TDB+8)零时的儒略日数。 1582年10月4日之后的那一天是10月15日(虽然并不是所有国家都在这一天改用格里高利历)，所以1582年和1583年的jd0只相差355天。 由于儒略历一年的平均值(365.25日)比回归年稍长，1583年前二十四节气的平均时刻渐渐在儒略历里后退.，128年后退一天。 当追溯上古年份时，就会发现节气的时刻在儒略历的日期比现在要 迟。 例如现在冬至在公历的12月22日左右，在公元前1129年前却会出现在1月份。

&emsp;&emsp;两档案的数据结构是为了方便计算农历而定。 用每行的数据可以计算由Z11a冬至到Z11b冬至之间一岁内所有农历月。 Q0_01栏的朔通常是对应农历十一月初一，但也有例外。 根据规 定Q0_02栏的朔必定发生在Z11a冬至之后， 但是如果Q0_02栏的朔发生在冬至之后数小时， 这个朔有可能和Z11a冬至落在同一日， 如果出现这情况，Q0_02栏的朔才是对应农历十一月初一， 要知道是否如此就要知道一日的起始和终结时刻。 但农历用UTC+8为时间标准，所以必须 把TDB转化为UTC+8后才能准确判断。 一岁最多可以有十三个农历月(包括第一个十一月但不计第二个十一月)， 所以需要十四个朔日来定十三个农历月的起始和终结日期。 如果第一个十一月初一对应的朔是Q0_02栏的朔， 则冬至日必定是十一月初一，简单计算可推出这个岁只能 有十二个农历月。 所以不论怎样十四个朔日足以决定一岁内所有农历月的起始和终结日期。 每行列出十五个朔望月内的月相时刻对编算一岁内的农历月绰绰有余， 而且会有若干月相与上 一行和下一行重叠。 这当然都不要紧，文件里的数据结构全是为了方便编算农历。

## 8. TDB和UTC的转换

&emsp;&emsp;选定了历表以及岁差和章动模型后， 月相和二十四节气的TDB时刻只须算一次。 TDB和UTC的转换却会随新数据的出现而变， 所以把TDB时刻计算和TDB到UTC+8的转换分开有好处， 当有新的转换时只须更新转换公式而无须重算月相和节气的时刻。 如果TDBtimes.txt和 TDBtimes extended.txt文件里的月相和节气时刻用UTC+8， 新的变换出现后文件里的数据就过时了。 

&emsp;&emsp;UTC在1960年制定，经过多次修改，到1972年才定下来。 为了避免混乱，我的农历网站所列的时刻在1972年以前是UT1+8，从1972年起才用UTC+8。 由于TDB与TT在数千年来相差不超过0.002秒，可视两者为等同。 TT到UT1的转换公式可用 [Stephenson et al 2016] 和 [Morrison et al 2021] 的$∆T = TT − UT1$拟合及外推公式， 1972年到现在的TT-UTC可根据闰秒表计算(例如 [https://zh.wikipedia.org/zh-hant/%E9%97%B0%E7%A7%92](https://zh.wikipedia.org/zh-hant/%E9%97%B0%E7%A7%92)。 具体地说，

$$
TT − UTC = (TT − TAI) + (TAI − UTC) = 42.184秒 + 自1972年来加到UTC的闰秒总数\tag{52}
$$
未来的$TT − UTC$可用 [Stephenson et al 2016] 和 [Morrison et al 2021] 的∆T外推公式计算。此 外推公式可从其长期日长变化(lod)公式积分而得:

$$
\begin{array}{lcl}
t  & = & (y − 1825)/100\ ,\ f(y) = 31.4115t^2 + 284.8436 cos[2π(t + 0.75)/14],\\
∆T & = & c_2 + f(y),\tag{53}
\end{array}
$$
其中y是年份，t是从1825年累积的世纪数，此式给出的$∆T$以秒为单位。 对于某一儒略日数JD，年份y可用公式$y = (JD − 2451544.5)/365.2425 + 2000$计算。 根据规定UTC 和UT1相差不会超过0.9秒，所以用$∆T$作$TT − UTC$的近似值，误差应比$∆T$的预推公式小。 

&emsp;&emsp;这拟合及外推公式用于我的日月食网站， 我也建立了 GitHub 项目 提供 python 代码计算 $∆T$ 及误差估算。

&emsp;&emsp;以下举两个例子展示换算方法。 

&emsp;&emsp;**例一**：从TDBtimes.txt文件得知2018年第一个朔是Q0_02栏(第三十二栏)所列的朔， 其TDB时刻离2018年1月0日零时(TDB+8)有17.42943724648089日，即2018年1月17日10:18:23.378(TDB+8)。 根据闰秒数据，从1972年到2018年加到UTC的闰秒总数是27秒，由此可得$TT − UTC = 69.184$秒。 把上述TDB+8时刻减去69.184秒，得到的合朔时刻是2018年1月17日10:17:14(UTC+8)。 这时刻 与美国海军天文台和英国皇家航海历书局联合编的《2018年天象》(Astronomical Phenomena for the year 2018)数据(1月17日 02:17 UTC)一致。 这毫不奇怪，《2018年天象》用DE430历表数据， 从7.2节得知用DE430和DE431计算的月相时刻在1600年至2200年内相差不超过0.2秒。 

&emsp;&emsp;**例二**：从TDBtimes.txt文件里得知在2165年Q0_13栏列出的合朔时刻离2165年1月0日零时 (TDB+8) 有 338.0018578149057日，即2165年12月4日00:02:40.5 (TDB+8)。 用外推公式(53)算  $∆T ≈ 131.8$秒。 假设$TT − UTC = ∆T = 131.8$秒，可得该合朔时刻是2165年12月4日00:00:29 (UTC+8)，离午夜零时只有29秒。 如果真实的$TT − UTC$比外推值大了超过29秒，则这个合朔日期会在12月3日。 这个合朔日期决定农历十一月初一的日期。 所以只能说2165年、农历乙丑 年十一月初一的日期现在无法准确断定， 预推的日期是12月4日，但有可能是12月3日，确实情 况要视乎在2165年12月时将会有多少闰秒加到UTC上， 现在只能等待2165年的来临。

由于地球自转不均匀，数十年后的闰秒数目难以准确预测。 这使数十年后的TDB到UTC转 换十分困难，所以转换公式会因新数据的出现而变， 使情况更复杂的是闰秒政策或会有变： 有人自2005年起建议取消闰秒。



## 参考文献

 

|                                 |                                                              |
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| [GB/T 33661-2017]               | [《农历的编算和颁行 》， 中华人民共和国国家质量监督检验检疫 总局 及 中国国家标准化管理委员会 联合发布， 中国科学院紫金山 天文台草拟。](http://www.nongli.net/cn/11028.html) |
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| [Morrison et al 2021]           | [L.V. Morrison, F.R. Stephenson, C.Y. Hohenkerk, and M. Zawilski, “Addendum 2020 to ’Measurement of the Earth’s rotation: 720 BC to AD 2015’ ”, Proc. R. Soc. A., 477:20200776 (2021).](https://royalsocietypublishing.org/doi/10.1098/rspa.2020.0776) |
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| [Simon et al 1994]              | [J.L. Simon et al, Numerical expressions for precession formulae and mean elements for the Moon and the planets, Astron. Astrophys., 282, 663 (1994).](https://ui.adsabs.harvard.edu/abs/1994A%26A...282..663S/abstract) |
| [Stephenson et al 2016]         | [F.R. Stephenson, L.V. Morrison, and C.Y. Hohenkerk, “Measurement of the Earth’s rotation: 720 BC to AD 2015”, Proc. R. Soc. A., 472:20160404 (2016).](https://royalsocietypublishing.org/doi/10.1098/rspa.2016.0404) |
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## 附 录

### A 太阳的位置和速度

本附录的内容对月相和节气的计算关系不大，放在这里是因为第五节提及过这些计算结果， 另一方面，这些计算本身也颇有趣。

第五节提到太阳的质量占太阳系总质量的99.86%，因此太阳相对於太阳系质心的移动甚微。 在 展示详细计算前，不妨先简单估算大概数值。 

&emsp;&emsp;除了太阳外，太阳系最大质量的天体是木星，其质量是$M_J = M_\odot/1047$，其中M$M_\odot$是太阳 质量。 木星的轨道有微小的偏心率(≈ 0.05)，轨道半长径是$a_J = 5.2天文单位 = 1120R_\odot$， 这里$R_\odot = 6.957 × 105$公里是太阳半径。 木星的轨道周期是$P_J = 4332.6$日。 受木星的重力 影响，太阳也会以微椭圆轨道运行，轨道半长径是$a_\odot = (M_J/M_\odot)a_J = 1.07R_\odot$，运行速率 是$v_\odot ≈ 2πa_\odot/P_J = 12.5$米/秒。 

&emsp;&emsp;现在来看精确的计算结果。太阳的BCRS位置和速度可直接用JPL的历表得出，下面所示的 数据都是用DE431历表计算的。 图一和图二展示太阳相对於太阳系质心在1950年至2050年的运 动轨迹， 太阳位置用J2000.0的历元黄道及平春分点的黄道座标表示。 具体地说，太阳的座标 位置向量$X_{ec2000} = (X_{ec2000} Y_{ec2000} Z_{ec2000})^ T$用以下公式计算: 

$$
X_{ec2000} = R_1(ϵ_0)Bx, \tag{54}
$$
式中$x$是太阳的BCRS座标向量，**B**是参考架偏差矩阵(11)， $R_1$是沿x轴的旋转矩阵(14)，$ϵ_0 = 84381.40600$是J2000.0历元黄道与平赤道的倾角。 

&emsp;&emsp;从两图可见太阳的运动比椭圆轨迹复杂，显示太阳系其他天体对太阳的重力影响不可忽 视。 图三展示太阳相对於太阳系质心的运动速率随时间的变化。 数据显示太阳的速率小于16.5米/秒，均方根速率(root mean square speed)是12.8米/秒。 由此可推出光行时对太阳的位 置修正是$v/c < 5.5 × 10^{−8}$弧度 = 0.0100。 

&emsp;&emsp;第五节也提到太阳相对于地球的径向速度约为0.5公里/秒，这速度主要来自地球的轨道偏 心率。 径向速度的值是用公式$|v_r| ∼ v_{orb}e$粗略估算， 其中$v_{orb} ≈ 30$公里/秒是地球公转速率， 而e = 0.0167是地球的轨道偏心率。这个粗略公式可推导如下。 当天体以牛顿力学二体问题(two-body problem)描述的椭圆轨道运行时，其径向位置r由以下公式描述: 

$$
r = \frac{a(1 − e^2 )}{ 1 + e\cosθ}\tag{55}
$$
 其中a是轨道半长径，θ是真近点角(true anomaly)。对上面公式取时间导数得:

$$
v_r =\dot r = −\frac{er\sinθ\dot θ}{1 + e\cosθ} = −\frac{eh\sinθ}{r(1 + e\cos θ)} = −\frac{eh sin θ}{a(1 − e^2 )} ,\tag{56}
$$
其中$h = r^2\dot θ$是轨道角动量除以折合质量(reduced mass)。 从牛顿力学的二体问题计算可推出以下方程式: 

$$
p = a(1 − e^2 ) = \frac{h^2}{GM} , P^2 =\frac {4π^2a^3}{GM},\tag{57}
$$
这里$p$称为「半通径」(semi-latis rectum)、G是牛顿重力常数、 M是系统的总质量、P是轨道周 期。右边的公式又称「开普勒第三定理」(牛顿版)。 从左边的公式可得$h = \sqrt{GM a(1 − e^2 )}$。 公式(56)可改写成

$$
v_r = −e\sqrt{\frac {GM} {a(1 − e ^2 )} }sin θ = − \frac{2πa} P \frac{e sinθ} {\sqrt {1 − e^2}} = − \frac{e\bar v_{orb} sin θ} {\sqrt {1 − e^2}} ,\tag{58}
$$
其中$\bar v_{orb} = 2πa/P$是平均轨道速率。 当轨道偏心率e是小数目时，上面公式可写成$|v_r| ∼ e\bar v_{orb}$， 亦即是那个粗略公式。 

&emsp;&emsp;图四展示太阳在2010年至2020年相对于地球的径向速度，径向速度也是用DE431历表计算。 从图中可见径向速度呈现类似正弦波的周期变化，这与预期的一致，类似正弦波的变化来 自sin θ项。 值得注意的是θ与时间的关系近似线性函数，其与线性函数的偏离源自地球的微小轨道偏心率。[^8] 径向速率$|v_r|$的最大值是0.515公里/秒，与用粗略公式算出的值十分接近。 

### B 月球的径向速度 

第五节提到月球相对于地球的径向速率是$|v_r| ∼ 0.05$公里/秒， 这也是用粗略公式$|v_r| ∼ ev_{orb}$估 算的。 对月球轨道而言，$v_{orb} ≈ 2πa/P ≈ 1$公里/秒、$e ≈ 0.05$。 图五展示用DE431来计算月球 的$v_r$在2018年至2020年间的变化。 图中可见月球的径向速度比太阳的复杂，并不是简单的类似 正弦波的变化。 月球$|v_r|$的最大值是0.074公里/秒，是上述估算值的1.5倍。 造成这么大差异的 原因是太阳及其他行星对月球轨道的重力摄动，其中太阳的重力摄动最为重要。 由于地月系统绕太阳公转，太阳对月球绕地球轨道的重力摄动表现在太阳对月球的潮汐力，即太阳对月球 重力与对地月质心的重力之差。 太阳对月球的潮汐力是地球对月球重力的0.6%。 月球绕地球 转，其相对於太阳的位置不断改变，受到太阳的潮汐力呈现周期性变化，使到月球轨道参数也呈现周期性变化。 也就是说，月球的轨道半长径和轨道偏心率因太阳的重力摄动而变化。 

&emsp;&emsp;月球的瞬时轨道参数可用JPL历表计算，展示计算结果前应稍为解释瞬时轨道的概念。 当天体受到重力摄动时，其轨道会偏离以牛顿力学二体问题所描述的开普勒轨道(Keplerian orbit)， 描述这些受摄动的轨道通常做法是计算天体的「吻切轨道根数」(osculating orbital elements)。 「吻切」译自英文osculate，在这里的意思是一条曲线与另一条曲线相接触， 在接 触点处两曲线的切线(tangent)相同。吻切轨道根数的概念很简单。 根据牛顿力学的二体问题计算结果，二体的相对运动可用六个轨道根数描述: $(a, e, i, ω, Ω, T_0)$。 这里$a$是轨道半长径(orbital semi-major axisr)、$e$是轨道偏心率(orbital eccentricity)、$i$是轨道倾角(orbital inclination)、$ω$是 近点幅角(argument of periapsis)、$Ω$是升交点经度(longitude of ascending node)、$T_0$是过近拱点 时刻(time of periapsis passage)。$i、ω$和$Ω$是三个欧拉角(Euler angles)，用以描述轨道相对于某 个给定参考架(reference frame)的方向；$a$和$e$描述轨道的大小和形状;$T_0$给出二体最接近的一个 时刻。 对于某一特定轨道，$T_0$显然可以有多个数值，但彼此之间的差异必定是轨道周期P的整 数倍，而P由开普勒第三定理给出:$P = 2π \sqrt{a^3/(GM)}$。 

&emsp;&emsp;知道了六个轨道根数后，可以计算出任何时刻二体的相对位置和相对速度。 反之，如果知 道了二体沿二体问题描述的开普勒轨道运行，也知道了系统的总质量， 只要测定某个时刻二体 的相对位置和相对速度，便何用二体问题的公式推出六个轨道根数。 位置和速度都是三维向 量，有六个值，正好与轨道根数的数目相同。 可以证明如果$i\ne 0$及$e \ne 0$，二体在某一时刻的 相对位置和相对速度与五个轨道根数$a、e、i、ω、Ω$有一一对应的关系，而$T_0$可以计算到某一 特定数值加上P的整数倍。 所以只要二体的运行遵从二体问题所描述的轨道，所用参考架的座 标轴相对于系统的质心固定， 用任何时刻二体的相对位置和相对速度都可求得相同的六个轨道 根数($T_0$的值可以相差P的整数倍)。 当二体的轨道受到重力摄动时，仍可以用相同的公式来计 算轨道根数， 但是算出的轨道根数会随时间而变，这称为「吻切轨道根数」， 其意义是假如重力摄动突然在这时消失，二体便会沿以吻切轨道根数所描述的开普勒轨道运行。 

&emsp;&emsp;月球轨道的吻切半长径$a$和偏心率$e$可从月球的地心位置$X$和速度$V $轻易计算。 从牛顿力学二体问题的动力学方程可得以下公式: 

$$
ϵ= − \frac{GM}{2a} = \frac{1}2V^2 − \frac{GM}R ⇒ a =  \left(\frac{2}{R} −\frac {V^2} {GM} \right)^{−1} ,\tag{59}
$$
其中ϵ是轨道总能量除以折合质量、$R = |X|、V = |V |$。 这公式也可以从天体力学的活力 公式(vis-viva equation)直接推出。 对于地月系统，用[Folkner et al 2014]表八数据可得$GM = GM_{地球} + GM_{月球} = 8.997011390199871 × 10^{−10}天文单位^3/日^2$。吻切轨道偏心率可用以下公 式计算:

$$
e = \sqrt{1 + \frac{ϵh^2}{(GM)^2}}\tag{60}
$$
式中ϵ和h 2可用以下公式计算: 

$$
ϵ = \frac1 2 V^2 − \frac{GM} R , h^2 = |X × V |^2 = R^2V^2 − (X · V )^2 .\tag{61} 
$$
&emsp;&emsp;图六和图七展示用DE431历表计算出的月球轨道吻切半长径和偏心率在2018年至2020年的 变化。 数据显示在1600年至3500年间半长径的变化只有2%，但是偏心率可在0.0256和0.0775之 间变动，平均值是0.056。 偏心率的最大值是最小值的三倍，难怪径向速率的最大值是估算值 的1.5倍。 不过这偏差并不影响第五节的结论:在计算$\dot X_{apparent}$时略去了$1/(1 + v_r/c)$项对$ \dot λ_M$的计 算误差仍是微不足道。

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### C 狭意相对论的光行差

这里推导狭意相对论的光行差公式(34)。 

&emsp;&emsp;设$p$为光子相对于某观测者的三维动量向量， $p'$为此光子相对于第二观测者的三维动量 向量。 设$v$为第二观测者相对于第一观测者的移动速度， 又设$p = \sqrt {p · p} = E/c$为光子相对于第一观者的能量/光速， $p' = \sqrt {\textbf{p}' · \textbf{p}'} = E'/c$为此光子相对于第二观者的能量/光速。 则$\textbf{n = −p}/p$为第一观测者观测到光子射入方向的单位向量，$\textbf{n}' = −\textbf{p}'/p'$为第二观测者观测到 此光子射入方向的单位向量， 设$\textbf{β = v}/c = β\hat {\textbf{β}}$。 建立座标系使x轴方向与$\hat {\textbf{β}}$平行，根据洛伦兹变换，


$$
\begin{pmatrix}
p'\\
p'_x \\

\end{pmatrix}=γ
\begin{pmatrix}
1 & -β\\
-β& 1\\

\end{pmatrix}
\begin{pmatrix}
p\\
p_x \\

\end{pmatrix},\tag{62}
$$
其中$γ = 1/ \sqrt {1 − β^2}、p_x = \hat {\textbf{β}} · \textbf{p}、p'_x = \hat {\textbf{β}} · \textbf{p}'$。 从$p'$公式推出 

$$
p' = γ(p − βp_x) ⇒ \frac {p'}p = γ(1 − βp_x/p) = γ(1 + \textbf{β · n}).\tag{63}
$$
从$p'_x$公式推出

$$
p'_x = γ(p_x − βp) = −γp(\textbf{n} · \hat {\textbf{β}} + β). \tag{64}
$$
$\textbf{p}'$垂直于$textbf{β}$的分量不变，因此有 

$$
\textbf{p}'_⊥ = \textbf{p}_⊥ = \textbf{p} − (\textbf{p} ·\hat {\textbf{β}})\hat β = −p[\textbf{n − (n} · \hat {\textbf{β}})\hat {\textbf{β}}]. \tag{65}
$$
由此得 

$$
\textbf{p}'   =  p'_x\hat{\textbf{β}} + \textbf{p}'⊥\tag{66}
$$

$$
 −p'\textbf{n}' = −γp[(\textbf{n} · \hat{\textbf{β}})\hat{\textbf{β}} + \textbf{β}] − p[n − (\textbf{n} · \hat{\textbf{β}})\hat{\textbf{β}}]\tag{67} 
$$

$$
\textbf{n}' = \frac p {p'} [\textbf{n} + γ\textbf{β} + (γ − 1)(、textbf{n} · \hat{\textbf{β}})\hat{\textbf{β}}].\tag{68}
$$

将(63)代入上式得 

$$
\textbf{n}' = \frac{γ^{-1}\textbf{n + β} + (1 − γ^{−1} )(\textbf{n} · \hat{\textbf{β}})\hat{\textbf{β}}} {1 + \textbf{β · n}} . \tag{69}
$$
由于1 − γ −1 = 1 − √ 1 − β 2 = β 2/(1 + √ 1 − β 2 )，上式可写成 

$$
\textbf{n}'' = \frac {γ^{−1}\textbf{n + β + (n · β)β}/(1 + γ^{−1} )}{1 + \textbf{β · n}} . \tag{70}
$$




这就是(34)式，也是[Urban & Seidelmann 2013]的(7.40)，只是[Urban & Seidelmann 2013]所用 的符号和此处不同， 那里的$\textbf{p}_1$相当于这里的$\textbf{n}'$，那里的$\textbf{p}$相当于这里的$\textbf{n}$， 那里的$β$相当于这里 的$γ$，那里的$V$ 相当于这里的$v$。















































[^1]:「电子计算机」或「计算机」又称「电脑」，同样是翻译英文的computer。本文用「电子计算机」或简称 「计算机」来译computer，因为觉得这译法比较贴切和符合computer的实际功能。
[^2]: 全球定位系统 (Global Positioning System，简称GPS) 也许是展示此相对论效应的最佳例子。 GPS 定位以 比较数个 GPS 卫星发射射电波的时间及用者接收到射电波的时间为基础，要达到十五米的定位精度， GPS卫星和用家的钟必需维持五十纳秒(1纳秒 ＝  10^-3^ 微秒 = 10^−9^秒)的计时精度，此乃光行十五米所需的时间。 然而 GPS 卫星在二万公里上空以时速一万四千公里绕地球转，用相对论算得 GPS 卫星的时间流速比地面快，积一分 钟有26.6纳秒的偏差，积一日有38.3微秒的偏差。 如果忽略此效应，GPS 定位在两分钟内便失效。 详情可参阅 Clifford Will 的文章 “Einstein’s Relativity and Everyday Life” (“爱因斯坦的相对论和日常生活”)。
[^3]: 本文把 gravity 或 gravitation 译为「重力」，很多文献和书藉却译作「引力」，我认为这译法不大贴切，故不取。
[^4]: 国际天文联会在2006年B2决议建议补足BCRS的定义： 「除非特别说明，在所有实际应用上，可假设BCRS的 座标轴方向与ICRS的座标轴方向一致， GCRS的座标轴方向则由BCRS和GCRS的转换公式决定。」
[^5]: 「赤道岁差」以前称为「日月岁差」(luni-solar precession)，而「黄道岁差」以前称为「行星岁差」(planetary precession)。 但这些术语有欠准确，因为行星的重力摄动也使地球自转轴移动， 只是其幅度比太阳和月球的幅度 小得多而已。
[^6]: 广义相对论效应(例如光线的重力偏折)可略去，因为其修正对太阳和月球都非常小。
[^7]: 2021年6月: 旧计算机已被弃置，用新机计算1600年到3500年所有朔、上弦、望、下弦和所有二十四节气的时 刻只需约六秒，但是换了新的 C++ 编译器，而且在不同的 Linux 发行版运算。运算速度之激增很可能是由于硬件及软件的改良。
[^8]:真近点角θ(t)可用天体力学的标准公式计算。 首先是用公式$M(t) = 2π(t − T_0)/P$来计算平近点角(mean anomaly)M。 这里$T_0$是地球过近日点的时刻、P是轨道周期。 下一步是解开普勒方程$E − e sin E = M$而求出偏近 点角(eccentric anomaly)E。 最后用公式$tan(θ/2) = \sqrt{(1 + e)/(1 − e)} tan(E/2)$计算真近点角θ。 从这些公式可见 平近点角M(t)是时间的线性函数，但E(t)和θ(t)却不是。 较为简单的解释是地球绕日运行速率因其椭圆轨道缘故 而不断变化。 当地球离太阳较近时，运行速率较快，因此θ增加得较快； 当地球离太阳较远时，运行速率较慢， 因此θ增加得较慢。 所以θ不是时间的线性函数。



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YXDDUmcurK4rJjsKXqg1RiDm4FUJ18YiCAIJgWQvZODjq18KQe5Xnd7C8pBLVjWMnR6RHYA16m2xRSX2V4I2qHSFsNIJ3fMCYJIQuJ2p9aRZIpHXGjFdueODeP554sxMkVQcn4dBZG/OchnDtoEQZKsFyu2Sy778uYJs2oUTwzPV88nBL3vz0GSY4akFT5YBzkcx8dSvhqqHHAQVnihfksLdRDwBM8jGdPxyMt0sxVjIJkHLdFoQx9stZWsDhkfuzZIfquiDpIzROcI3rzooAMIeu0tlfSeBEF7+GOfEFOOSrojnopq13CzSaJn0QOMWYX3p0ChyWjy7ejfCDolNfWvcNAfEB8MQYAhc0kR5FJgooTp4AIdQMrD7KK7SXhQEfRHgj/UQefTyRCb9soGYibYdxhFDGBcYOOh1GIt4ZvMQZBx3n/H0/ZCs4qg8eKgjb6YIOhIlDWaGYRlx6L3Yid5hiZyUHj2GPXauGpegCA88ig/2ort8EzvsVzBGFDS+K/gdAGM6YTIjCUcoCO1fq5fjjpIMjdpYdZBUhPHVjxd295MZXGEJaLIJbOzwxlrN/AYXeeJ1j39lDy1rUiHtUk/RFCrCOpKi/1lLKcWBJVF1WTH1q3Fk3rkCCW2WAZEUuyK0XHoIkrUiomS/nIUX7pDjYR0GX4x5CBnMoJMbwuYNIoktaREkPhijaSYz011kEnvFMdSlh600VQcIAMS5wYZPsObJwe54T7uattymrURJV0E1oyIFXOdPf0vDpI0SpsCltSJZIZ3WQ/wauMaIAQ3hrJGB+ZO7sFM8edyEFT0ZO/lwogzI0CwOSd+4VzWvadfDv80QQzbwZClYkaQXRRB9Pc3D+E61ffQqBLClsCMe+OgDZ6BESZFUI4HHQMa/SKC8NOJkqaRfGILutHWasUwoF0OvwFMSmgsc8zM5VezLSJMRoemHZGjHCQIai8EiTdPBIEHB0FQ+0ZQhJI2A7trHABUz9WFILw4dxoPqlp683uTK3owjq62xHE3ywBhBUfvMOiezj+9+QITxgyfJMVc5AnvwzIM8T8IOpLooF0QngRBkUlgUG0o6hIWOnYwAcMTi+vHxbX05s/YfDQH0QDdd0UQOLOb6/POmPQjcG9GW97vRQlp0WTHoREEsTJI7PdU5zD1wHJVuL+cNFwLtsHYXOMVQQ2t2Oss0JotGWnr7Vg1pi9s8egAQAaxi2IuGe8BgqqrcNnkxuD2Do4W0rK/goRxDIUgiFZPcpfbpaR3TXlqViOKbYIOYs2X6CCKDgbS0d29y1bsAJ3aAi9acdaiIOjNQRzgfR6LkgN0Q1EOcJVockE/ZzSeaygzXv1VCpSOwv6NKBJBaNDRF3t4SehCJyfPzKoURxoTbb36antOmB6j8I91IQd1d4z4QxG03BlpTj2TFDeaZEwmwfuWTNgWRLMsE731MQbuwiX7OnFsJMKWNI2GJ1wuHqP0DWuZU1mGOughufLv8tz4MI96zovBj4VXVK6aXbNzP3DDW/hilUaX+F1JD/UcWcTjcpbsuTTZiokOKmRLoKSXjCCGDxh0QYN9o1bMs4wsFiOj148T3U3DUMBdAIImupi+vzNsMEl0oRdpdbuK35KuwxxptPD3xBmEAupNYtJGpD5csRiuOhEszRNq640g0WrgIBHG6ovBVfc4lNRBjB76sS6XKg5D3z/n2PcDEIQPrCXjR5+JIJa27MaF2C+c0BArFi4z+R37zmtJgqn6KPlk7KU8zxfxCZeLP0DEXcTzknGWAIqshkMbcWBm27il71iMDXXah2qIa6+Vilgrri9662HaQo9GKscuDBwRtC+OtBEWYmMYnKbdNDdPzztVPbOg6Qgs8GECAMNmBQELL7V+FM1LNh7wEIhjOhgVND7nGAwz97Bi54sIal0ng6aedmzSvK9ztFyH/hog2qSR5Yp1PtcH+S5eeffraoJZSp4RXTb3HXscSXTTxZxsS5iBk0WXWcJdiTEEwMa0w9PgJD6AoAQ/OTafiiApmMfeagg9OTn1WsjM2hkJJDN1oS++7xzkzdEiwSR55FyrxV3Pt4WcVohJTTo1shE44g/eP+BjRqqh5faGUdmbK/12bVGDS3jfOKNNs8Gb0aJmRqvzfQ+5I6BmIWmxKrvR+qNbbrjRyzNSmWzeRT2ctTFqxbRvufukYWF596pVlFOhkzGqYSSDnCiU9b6UTEIWVMvsBXas7tCqol0GYq7C+j3XOsoamWzFpHe3DrBq3YaRhTEwdnafl09F0E0XRVGhxQQuX8eRgjFFi+5zkwu+mlwzbt4VYYm7cDO5cKzJKJQ7N0avZegqccfNbvQ1LT2/5bp7qUnPCDLvez65AB0IyvU076svjUKqzdckjH6K9fwao2rMZUquOw9vBLENva2mUOQZ+VahxitawNOVjM8VOu/bI3qKSBV7vlORWU6LWoxMWA8NsUER3rLCLN8kkwoz6iA5Y7qULWcqDqd8c9VuzbBCHXabgxMKGGlxB47rh144zNWayjpyjt5Fen+vIbIQz2jJXHvt6y8EqWw07zLCJpcqGokH3vIC8l6YQilfImzetyF0MZX7rluEzXWtTI9nLtpLWrTd/Je9a+FOm0eiMkZoZPzAGIwh2e33/3/lamb0GIFLd0nTdVI7zTklbcCWrufluXfY5qU+e829hBM3u2rPk5lScyJEJgWxRZhro+kH0+U0Fj+uZHEm5LRxEZH5Qr7xUHkEKU89YAKPIQRxHxzw3WcTEYM5d9jlyncWUQjJ/KZlN97KUlOZZgBBezpd2nLv3KhLZ/Ep9LmEpdogFemB3A8X2ocjO9eEHtNA/8GWHSVoFUr23mdEeN+MGnmL2noaK6SPCHwHlTGpjSDqQGyKtiqcV2xq9fQIJUgUghaW2luzxmj5U4LphH1kx4t/zCDP44F27fnbsWPfM1gsU1Ji56wB6zth7dT27q2ZdjdNiqyOAdmxq8QCKoXBDxxONxdGN1c8KY2d9rBoBGWMYjCh/pFdYIagjEnlIWSEbkMAEP00/qOF2Noe/lnFLVeCFGIkgtL/QJaxIjKOipwHO0UCoUAJM58ZQSrwLZQRlGqmRUZi1+lcDfs3z0tT3Akd+nUhyTyoQGePjC5BQzLyEukHimK5WnfHTqc7MRS5BWdf3INYoiNj1rl8/nw6YPZBbB9YKleDRRb8SkYqurcVifEiESQ217MzSCJA5UoG/Gt+/3jhU0gRrFOyGuqOZ5Z9iCe/mKjfwO9MbeqCAyRlFTxI+J2tytUb0nsyMxHrepoeqNM+JWY1MzUeQscE+aiakN9WkdeCBQzyrypaY5+mJdISIyjqOzjIcUxFlHEXACoK49D1LdQGRY6lZyozJzPwdJjvZROJNW0FgBBAsBE5RNOLvkZ5iYK0ZZLb7ImnIdbIUQpGctyBlSyYUBrv2GmKhHlBUQ2AEXosGYASghS34EwTRPIO2SA+OY7JhFJLyF9zLse98IkgQVImyJw3JWI+LxAgzXokRgJnoL6shuF27bO1hdogXrZAiYiUXEE3BRW4LvlyZQhKNkglNxHUSxImrEdRiFM4KI4AlEsaQl/wmxm8k99DOndFgUVU/7C5BEuivweCUMY49PkD9lVQcuVfM4JCPD9FBCUTJIi10tunxUlRGLRAbR5JPITIZyIwy5Y0JDeYotaaSC4YzaNVWq7yAiT+XLS+GqLihbdEIXiNLL1HGySklLxNskGZwEZulBUyL6HqZnIEhbsTIDLjg/YDxVyKucgskUUELE7QPJDuox0pEeTfM9ogz9ymc+PkOiLIn8H0iCDlAyhWZ8nFImJMY/l00EfWXESIpwIylld3CMKPqgHh4/dkoqJYzZnoIhEEuQ1i369BaCbEsNeqPEgJYjt0wyrPWVUiq5IIClvm3zPIVgTGnoyQEoIwzgiWIoljkUex7IBpdwzr90gyu5U5nI+iGUEqsKMDgjTn0DUWiaheGWyQhTc1b4MgclIFfdbGFA4LZCZZxsnWOiFo1gYFW49XxujFGirp0mgmHmqsWC7dBqUIUNtgg2LkouIdlm4mCIJCPloG5RXs8izapuyKEAS5DTIwa4OSdzIxNIvhSMiOFCPIK8pIGwS5DfLJ4YMNUvwExtc0+foVO1f66Mk+IshkXswkJxYuVwUb5EWtJg3JCCmIq5hsUCZboVH+yJerYAo6F1hsXGguJkjnd4xyGZr6JMjkaZLN7a/iQNrIVIPUL5SMnVMtyMiQdFZsb07jTp67wCjM/nIM762IruW7hkQOPFUdov6MSBvzB0HCcZkMQiaI25ECkbwtMmGKdEUZgqJmpUnCMyA1kpRaMITiTR2uVQpl5v8/ISUpc95HCvNVgyDpqYRaohIfYZLkp0oKlanG9NNyhLwUFWUK8xOXcqLid5XUWRTKnEkIb3bJhEpprv+Za4HGqzVCNzSs3v2a3QmlKaWkhsiCdTjXYz3WYz3WYz3WYz3WYz3WYz3W448l8UFzcM0Sv8yWGdY5XsiOYZep0dkT7fVY+MEPCZbS5YFPfE3tT+q3fEEQ81+/PuWLGzyoRXghXkzrsiwvl3I9vspxoQ1bzBNW0OV2sx5f7ti2sJSwzLS7GqkUag0wvlAodNjWC7FBzp2WO2CCznp8jQNbhurFIMidULkzK4K+0oH3/YIQBOqwM3rN5b+SC3Pf9bY1f9rU/LTHxSGIWxAVttTH+IxJyN+vgkp3i/7CBVTqkP3TNsi3jM6Mm2UEoWEEU9dGECKJ7+5Q9a1AxEIS+muX4A3ZoD/sxawf2/xgjgSCWH4gnadmHQT4ZiaIy3Ergv7Hz2TCVmBxqjkEcZe5lgjCW/ZbAcgbIbPaoJc+lCfPKhsdWoYg4g5ICJEJQg7H94qDUJ7vi1/S/80GJaaXSoOvE4IMdHv0WvJuJYWfb4YgP8R6RdDLNigMkH/0YsNNIkh5Pahvlop5na0VQXO5+h2hKrNBib7uxZhmcrHhhrmuWOzLxXyzfN7AYU8ifiuC8reMBC/LahBkUpLOgPHcYpIW+YkNMnDpR1kAMqbsB5P9QP2EOLWgpc29rjvZwwXkOcOpx4pQGhQYRRj+bgRZRV8kDoL0bwUs6MeZB2o/YEzD8xiZiWsevdh5e4OMhjdsB7kfQSBvwYkWpwJG2tFTr4Vhda9x0IMAjK8P/eUIsvyNRHewRHevnZlmFQqedooZCBV3tA4Chvc2iBAksndjjncIApp9uWQbxNeb7KYx7XiWijsOQdtKXL77lfZgYNGW9Y9E0pZNEHqnuj0cDi3qhEDt/lazqqYhJV0c58bVED1TUSQEPbNB3ootd7HdGZL1FcnAddsbASlCkJauGZrKGA1/OYJs+NI1zYfA6RZat6QruacqLM1cHjfb3fnCjZIPCDLKIah+ZoO88qhebmztFZ4EHPTNISgDDEFKrL5DUG0AjPnLbZCPg2zd8ew0ByEz0ti1qiUtXjsdjvz6ALWtHxGk4XwdB2FhHmyQ8pHVcteaVPNN5sVO2/7ei/X4YNLEa+p69vSrDSIIlf1u0G1ZFBe9r6quLo842dXUNFT0fMHXjUOQnrVBiCD9cxukzDiiA2wXvLQIIWFPtCaTI1wzxUFSC4htkP7bEUT2x33XTXFs3V/bVptrhdNL9tW5RT9vJ/faWaJuM7q/p0Z/EQcdHYL001wMEaSXXKTmKQny6fB1h15MZvMOQQIwxjQVq/ytkTSCqL0VnSWpdlMfq84BpzwXNQqT6qmrhhJnF19hmt5mczHyYs9yMffvZsk1RoeDxoG8ziLpc5ZgNsO1z1xWs+vBOTVY4yA62rHYn/ri3NW2PdMkaweZlnQIp/drVRQFThciAX8Nt4KOqtix0CYhSD21QYPOtiNM4ngS2mJxxuis5peVX1gpVhRofFD7Unbk3v16lB1NYJwXy8Lk27GrsrK9s0nmIZ3/YHKG+uNGFj5wGV18MOxNFlW610ZGcfz9uIj52RlzKfr2d9ek2Y8hXnqcuPXjdHg/4xzj93+PP0pdow16pzFfuwFnH6FYOpTdfu/+7E87ZkAigow80QcbNIyQJTaYPD/rtWG8yLCDa+RZPcb42T3Z77xWd8IC4rE20o5iHCR35TqLIPHajyX62PYATcVIQSW3JemqiVdJE4D6TiwMVspl8VNGdzqL5dR+u0EE/Vaz5o0QDrm8Nc1tt7kczueAIBRot1NT9dfmdK4aZ5nA7xKJXVOXK8wgaHjwYqOWYZDWPFvk+Z4C0arTu9LPSheZHQAAIABJREFUanF75lUmE2bbvbJAzmsdcas+gCAmhuqPPTnj8UbjxYjXmBw3CVJYXesbkDCB22XGoDMSs7vwMxDkR6cdxs3JZe/tsOk8gsrjjxaH1NjpWOFY2676R7tkzD/1oNzlQFwNUL+2Qc6LyXYP//De6KcIUnI7WBoW6SrJlqPM9lALBOFzieGlRnLQtyOIM3xAkPm1DbpcuYfoAxvk3XvRxWCTerOLbZOX1yrxGt1A381EBHSzm/rTEUT1aNteqz3KQDebBgfBOARd+v4NRWWntj9fsKzoEIWz0PxDM/w+7MgG/NoGdcWQt72i8XjaAMKPGSCzMPjJ9VjLIiDoxDxgKQjYHV4yQfp6lHnVK16s6WnomfnYfqDjiQhiHwXVtsssnfNqIIwSQNXN9VV4kygu6jMQ5CXUp6YYHUAOx81eX4vhX/X7tbiRLrF+Pxendqq7vmq9wnHYXUTQrBe7t0HH7UiDC9Mdf5c8zwWBNF0k81E4aHvbZjes3gVIkTl077srzUsIcsmoCCVesEGq6dHpfGx/cOqidoAAedmqijbIsBerks1BG4W/8Gj6aA3z2+JzvBi7sctxM1xPw64/wKUvhuuItUXbnko9XTfVeB37zfgGk5fYoIdIgHyx/yoOcojKJCPIhtlnfbBA02zgDkHOie1aEQchgralwOWrCHLvddv22sDHbJD+aBg0jyCotjLuwf8gXztHhfWXGQRB20D9uQgKg2SsrXFK+3ZbdTVMJ5xWXIxvVu93pxpjJJpeXGIkDcQO47yDGIfw6zhIuddZ/d+UJQ8lfLalxIyIK+XHkJ4SgshnwTYiiBBVN694Mdyna/Yc7JU4qDlr+KjAEz277jb7PKFwCEpr5yC6LwSC/sPduTCnjiNR2AbL6mBhwAZ8Yfb//87VOS3ZLSAhTJJbldmarbrkAQR/Pn36IQmvyAPoHnyG00Z6/6M+SPdqpxVy6/FwGNY8TGg3HE5HxKz9aRdwKHN8jCPQefKsEoTwBSct7rkGVYhiNvfy49mLe2j+lsOcsDYr/rmc40/HYPrQNL392ZIg6HvT7EuF7ZwtAKR91+Rms3BPguRVH1QUXDyjWJk++qJipP+QMn/Le6DPb8T7VdMVf6S3ThrGpl58kQ7HbcbezKnz+AZepq6ubLb6IxqEFWH5mNM5rNmzASucNfrm58OWqtu+2HMfBIKKdawxu3/sg8xGVLzEoeERzS4dvFQVBOELhiC+93uC2r33VrWyR/dl6uW1D/Z5DWLrtSjZocvhRMoZtJtxBmQR1ploZrsOxVu2BPF/kaDij4oEWeMcCWqOpqcnPp1E67va/TBBeuKWTiqa8yeKg5ze5hMY0zEWzwm60SAZQZBdUXYew8O5CJ9HvfRIv0hQ59jx5EllXyUIT5gOyXEK5ecJutMguasHbeu1tycJerT7i1WuKLOzqr/8uUGC29e79wiq7gkSEmQLiDcExdd0e36+MsXsx1ZEfkaDcoferEudT5axZ+WKnlrzGYJu54Pgg4oe5Hh2wT9IfOEK8w2kBBEArj/7BoJATZ80LpQjTS9rEKJYMTYnWw1rzrZZpOh7IDWytw5P/rrXnI8J0sfygQY56TdHRo2u9qZz99MELa0BngWbBEfyUWo8tUYX/ryqQczmvWlcuvEsD0fO0BXCilc/E9T0vCryPQSF4Nu1ViYvJ/dKFKseRLGNL8a/t03tvC0Bs6LnbE2Lt0Zk16SP8U0ZW/OUILqJzYcaVDF5wwcZdnW5UP2nNWh2mbMGlQT5d9aLfcYHxYsWrAZ5/2hHyNDs84T2TNDy6MsEYWIOj3GTXE4vRbE7DZI0QLTEiB3CmrPzH6wPFp27dMp30f/zLxEEjf5Yg6IRio95g0YN+uGuxo0G2YMJ01m7Mlsh+YIGna9j4ZzP8Qfi0/f3BGlrenHSREp89T0aFG1su9eNTSNBUn1Rg4SnTy5RrC422N6ddL8YZ14fHkWC2MzrtSjmn/ugKsgBiMWX3jV18D9cD5ob9H4mKB1sthx0uTjph3t3PK9Jj9fr4OyIMREL963VSBB7tosPavb5wNbvIChCu9rTTIfL6Fz1JR902B6CGTDwW9Ykl1t+e4AO2L6U4PBcHw6mAIHFMatXNCjE36i3w/YDDeJjfIwgxv8FJ+1zDDME6emVkmLan3SI32cJutOga9m3jAQNSFLcPUH9LEAzQZKl8Ou5WEQxapBkDfqKD5LjsKttpV2dtKkobtuB7WNjtrlzqdRdEcTcq1HM193p+D5B6JuBoBhCQZD8BSe9nJ03E2SPQ52PO7XJ/Gs+KBJUtJAiQTKbgjxWQ0JCLv4YglIy/ypBnokRopbTNgxDQFsTIX8cUtco3SeoKLqX6kGn6DJsYhWjmNj231YHqzURyJ0g+p5uGbzADywEIch5FzVJ3o9ieFwQJKo5kjpBXtsgfGoSxFNmVch/jCAb0arycFp7bKO/oe6zGvSQIN1c9BS0585mvaQolg7XnaNYVqSXCXIxYjAM6iA9P9+2WRMb5mLeJX3TyXr30nwQCLJIkSBDYSQoFZ1F60TqskGQy/1F2qYlinECSuJj/5Qg2x6kBuG119o98kqQ1yjm1VrirfwFgl7SrS9pEB8HJOtpao1FmhjF9Db+BoJQ1scT6K2PcbSZIElRzLs8lgaCqtfmg24I6s5jLbZOOROUXyQ1y1WDxGe6LEHce+ljJ31LkGfjTDVoqlXAE0HVTNBl4n35awh6qkHnpEGhZbIOgPDZcQxc9x76Fg2Kz9WeRyLELY0WgrAUhS/q5ao1xidR7LkGHU+7TTHmOhOk7JBT5mL1aVqO/77VoKiML2kQS4hKECqI6MUvGjQpQSKHLX3of06DEkF5ZBGScQ76728hKD5h268myc2wJYrJuckErda87iTI/XsNir5oxy6U3BOk8HgtrTuUc/TPdXcEsYAUNci/pEHqe95Yg3b3UUxIkP9NBH3WB1UYMcT1mybH60linCud9BcIQnN/Nek8ZFrXDILid65czMN5kTVeeTpvDk7clzSoq53do2ohSD1Qvk1YQdT5mFuC1P2/ShBzL75St9JXvCHI+8PWy2+KYp/XoEZDyHiYOB7GCqJ8lwaheNdAg3Dp1tOiQVixFAmiMiVfdB5R3fFf8EF4XPTmC4KAzH7HVjxyr7lC8TCKHS77F5w0plyXKEYsCx+Ecb3DsJb/pA/q0bQAQTG7l2x80z753+CkMS8UCeKtfxk4iK9RDMb5pG3y+BgggaBi5fa/1CCTjM0Edb2GsR23anCo/7iczN8ShCHFVXfYvkRQN7RHOmqq4J0Piq9+aC7y+3IxX6UjE2aC4p+geRaJide7a3SELiLHJF41SOZN/C1B6pPSL6TSFYhZ2/JcqUGcxF8xasXcS8+IzJpDZlEvahjFSJD4pZpxaeNtmzY3w1d1xaE806BcUMQq2EyQ1n+cxCdgCQoalBtHt1HMs2C42domhjwkiHcQIZe6O5AgP638kotBk5qVVkeUoF/jg9C0SNmHSvhMkEuag+vn4FKaQMzGhotaXUq+nc6TWQ3SVFh9kmSAGPbWNq0FQb7QpOiD8BliQylfEHSi8cJjLsmKBOk05FqDKDUniQKu1GXgfkEfE5TmKfXPLgmKb+G6yQNjGJQXyWdKFD4o/n81zRpEIB4SxBDMeZHKkyAsRDiu9LQlJcihJk0Tth/ai/hfo0FVGNtz73LFVxYNkgm+J34nEoQGYyao0j6Zc1ONGnTyvdlZ5xOBZdGotA4h/sqiOQAs/kC7ljuChM7Zzz4ofqjxHfR0ztQgnwjCk6xSxVEJ0qojKiqDziA+J4gL2eLvGIIol3kkTUcMkUfcO+nqlqB3NYjlyRTuswbtMF+y+CAXdi2Rks3udHH+1/ggkeF8HbhsgTErSCYoEtMHrvpiDAl7o0H4/n7V57aVrl82BJFFRjFus6aJlI1iWtdu2umOIMx9MvdacrFAYtg3swSh3VtTs7IGYevNwLLRsDsEa4zeI6jiIj/HTc8yQRTebUGQc977T2hQWnH4QIOcS13TpEEkyNuK4m6zbvFmQh0Jwsf1WzRIe/EqIsw5EkEVCEIyMlwvYwhLFKMGcbBedHwnJ759O/sgKn78hX3QEqRmqTc+KLD+84AgFwkKldGgK3IvvD8lykSxKGK4vDmK5bQQPoh5znMNilELUx9bS1B8SksQtMyFpxqkU7LBrNWYCUor6sKiQS6kNliOYmF3WK/Y04AG/SIn7dx4vdCn9q2jq5k1qNWuhfbqJVgfBBfTtwEEudSCJGJzFAOSeWZRqlSn61dmrUZQ53xPUIpilakHkRj0yuGDIjCJoPhxr9YsJySCECox1oOoxvVgn/BBMWqB8SKKYd/FxvogXz100ncaFDQX8480qNvYKBY1J5d/Fg2Ck8Z6suHifg9BMl56TnP4fePuNAjjyXwMYowGwdbsoUEsy0eNUlFaNIiLnmFzuEZN5yisBtFVPiQIbwVRbM7m41OfB0YxCe20mRYNiiy17WSjGIpKLmuQ/4wGVXXHvSUMQbQ8RRTTXQCe+qD4hajamAd6pEG7Wts/JAjlAsy4FVFsWonu9YEo9mtq0hIVExrkhMu9bjRIEkEMUkaDSBA0iGRgphHbBswEUXlC33abtZs3f0bUWnwQB8ceEQSPzQqiIeiq9R+ss49BZ/FBSO9RgkwEVXNbNO0f9NxJV2GjvXerQahEWCfNVv1ufK5BnFmot3P9x2iQuEiQMz7IRQ1Sd5WyeWoQXoNRzP/UmlUddJ396jIcZA5NKP75NJuPvF9ASNQcet7KOmk3E1X6IFylfYsx5oolYt6kvSGIuVcEYp2aBLwqdddaH+Q/imJSmekOEMNV/yBojmIVS4xMvpdc7LTGy12H/jiI/1wUk+Scl2zey00Ug/HdPM/FmApGI3x8pEGd1SDNxcRokANBtKOIYvIjuZjPqwp1kFWXaLxhrt79w3vaYTXrW5p35Tc1fvMjiQSFvIcZT4GtdGAr3iCXFLWw05QvCFInzcelBoEgOml84cySZM7m5wZ3JKhd++QhUGJpXLtOmw2nqBYJooAf/UKQZy6mJLL+4+mk+STUoDmKAakGTyCpBi24oBUJ8pkYJ/hvJih13i9Zgxx8j0Yxptau3kyJIP1DmIsJggzNnctdjnTWKAlKH7JjMp6ImQeN9bFUBUHxB5CLmc6qKEFcFT1cuPqnWYXvJ+hN12L82R9Pp3P3j7g//9uNp+HYyz/x7cdv/And+TRcUHgTbLWo+wc5ahC3vD8dzyMvYjjhdMxMEKIUc6pSgzJBFQnq+dmBoAqalQm6jkxjtf6zDP4rQblIXXkSpJWigCdYCJpLmCCoUoJIGaNYRYJoyG8IQoGIszSs/+ACj80EE3bJBMlZ15PMBI1s5fk5io1tx9iXCArjpd7hN0AQl26kehC6HBgoW/pk/6fubJgTxZYwDGhzWuRDRUFwdmZv1f3/v/F2v32AA4Jxb22SSqp2N+xMiOLD29+NbSv1BGHTBPu2WBAzpLFHKzYnSBvrE8vGBp40rAQIktdmBJH7FIJ2t2S/TzNdPlVk+/0+7kWFDqQIFWe/eUHoutNhWCBF2EAlVuli24DJmdWaEYRLM7diM4JOcIzXCJL/lPUVGUTfTLNBkLP+vzcIQp+01sGWBI1+EBJESlDVHCs8BUE1Cf1DI0HqWMnXSJClLEcN0jZnwOr7pilpdb2PPVYBPW0jQWmH6G6wamxbujxB5HNi2kDmCfJpbJ9R9GPxLswHJeb2rxMUsVmxf3F56DTgfC/7NOv7Oq1P+e//xJemjv/8Vx/GcqB7e05ufXP706s+HWhs7BOCUAdyfp80neo9mlYHgko5RvYvJMgtNAjFiSeCGm/VtM2ZrensJUG2kuYDgtTCrBM0aZDzGiSq6gkSIKzKMRAUt9Zo7QmiuEXtPSQIjhomEOUKgSAcZ5oEDwhStwWd9ZXv0pw0yHbbGDVKUGdPzSEO/CB9QTQRRFQlff9Cg4SgtK//7eeLGUF01zXkEjx1XZkXcb3Lf3cx5kxFnRqRH6K2rx5EB+vjscDntO91+ABWTE34bq98TwTpsXbOz6zYGN17gnCyZw3CTiVB1OeoXxHEftuZe8OKUde8p0FNTVoIlZ9JBqsWEARJCQlaaBDUzvweYiVIATEr5vjapCNBECvEZtaCFmoQ2b4yHvwguUULnkfz2BofEJTtUuc2CVKzd1LH4d8nKDrk16SxIV061FmBLXiZOtPiFd2ELdGix+NBfo2if3talJAXLoJvfpAe6600eNJyrFnTGUEI1ieC6q7kNSvWoAEMBOEubNttgtAhuzuye8OKWTD3lgZRkcFdVysGz9qNVgtlucCKTVbNE4TRDO8HqRVDh+DVTwMlu2wkCJdzsGLEkxXDmyors10ai/n2nzlBYrXGaF4udZW1KW9bMT51/ScR5LBP+lQV1Uk8nRv2KP6+xQ8xW3z/ndVtW1Vt+WDxgvQttUVRVPJPp5qjHZQ0EaQ3W6BBGBwfCMqvZ2jQZMVSSAi7FYK0eD8SlNf1S4KItYzyLkHuYw0is2Ls/aCZBiUWrI8a5P2gkCAoBwgSLqBBXpPUEM0IgkhZnYzyspppkBBjg/dGEJa5oOFk8KyPyP8E0bwQ5LYJ0ndkduIT/CAhqLvs07Ruc90nzawbpv966E77Nrv0sXjW3emhO8w0XXuWr0y+VHNYV9PiySz+1bnRk96lGN4Zc9KnNA+ieRCUp1CEJUHagkYUmRUjlLFeESSn0BO+RVD5lgapI2bRPMGKjbGYlb2wTm0i6NmKRWP+h+UFnCs1w96zlncQEsSYWYWTfOrjeSyGX5Dz8dLeOvItiIEnLQTFoScNK/ZKg4Qg2An+BA3a3VLdUp/sL6df53MrcnNqhCB3cPkxTnSDfSKe9OF+8C0/GJ0xK8YDQd5qjQTZsd5EI0GlSqgLrBhy0G7NitkPyAeM/G5zO435IFxFfTzc4EkrlEhRTgSVl0u05gfl1nH2oQY5aBCoTVSDtEfRCOJWrZacIozF9AevCz/I2cShHCsxjFgM721uxYjhSY+l9cGT1iLNGPwxonc55mjqMEN6x83yQUoQ8j/ISa9pED6zz7Biu0taS5jUxvujECQh/f13HasGqfeVdOW9vKZ/C0HhCG1kr0a7uBtrzgBBURQShJztSBCW94Z+ECMHvaZBmgAUDUJPohFlRghmT8I8bR8BgjvW7otQgyK0sK3EYpF71w8aCXLmB0VTLGZ/PhGkH7BbWDGiwWoxjX7PkJMOCYLvg1o9fiDQIAcrhnKAIDv4QRT0KA4jqYMVi0AQYls/P/ZMkPs0gso+lk/mwEVa5Jfb8ZHDD8KDR35nfU754VT/+Yvu86dDvUeQ++cEORDklgSRuTFybeEnoZE+a3UNWN4EGoQT/iOCtjVoICjaJMglR0y4zfJBvjaP7MwrgrTbqczkouvfDDUIcwfXiSAta0VDEhwZRSVilSDC+mCN7T6foMEPiu5lp3figYqkyLu4E4Kq+GyDer+0z/9wF0/pVB5c8Gyf6PMIWtMgLADbl7rt19pkURahXN0QwiB+QNAXatCQQZx50j56R+llRhAvrJjTnVh0Q7BWzTTIWcvhqEH5YNUGTzriKrRiI0HmBxG7L9Wg+zGTC0nHVK5vEWdHas+JRZR875PLTlzt9CwcudnTob5Wg/R2NU+aqDeCtMiTQEL236ZBmnLUlXqBBqlbk/e349nRkqC5BmU5jsWVHPNDAUFq1SaCHEYxQoLcBkE5bcZin0YQiQil8rVP+/L+64Jvs8cjb5NrTuJl69efgt0h3KP4xRpkHWalNYCZFVNNIqRj5Dj6Tg1yT1UNnWHNUJN4ZcU0Yy/3xA2x14wgskLpRBARjicrZqMYtCRIq922Be9rNeheFhKyJ9eSDuJEp/pk3seDqrTLHe3keH8+qq2eb8H7Ug0yK2aN83KM/MFJNahl84u+SYN0xJTmVgwtiJiCVuxfetKI5egMiVloUFTprs/JDxqK+16DiN1xVYO0LfZ6KRx/oR+E2nzeypcmnoWmXbs7PcSR/tWWuumtbOUY4YK2enybBvEpa62KQdAYRPOE6F2Po2/RoIihOUtPmkgJQjnmlR+Epsgdqx+0IEhjszTmUINs1eekQdXlGvOzJ+2sH4i+zorh3/e7Ov/MWpC/37VR6KE77A/OlzD86Dcfvs0PskfBsA0QmuYIEMSxt2IcfY8G3QpNUi/yQdAkLazx61jM8kV8frZizAtPGtH+lA/ShNO5XfWD2Aj6GisWWTei7zCzR/XgWx6/G4ZShuaUlXwQrxKEqkY4L7ZBkK9qoBZPyDDCKskV0Iwi2n8smtcqh/yPCKs3LjZ3T27wg6YeRQXg3HfBxKFN+7yjQaik4viFBvGQUSTf5Iiy180yjlbVIPhBNGYUjSCsKJ8RNHrS1iCGXgdPkGnO5ElHMyumJ1SCVqJ5JiGmpy/JB80MWtjQGrTAzppb3axPGq+GoUEGwDNByM5vE0TQHAoJQsvRoDna3UE8ELJF0KBRTANBdXO9TX3SDp32+tY+0iBN34CYLQ1iq5MpMRctWzFOoOxh6hl+UVO32gWgBGndMCCIlnUxI0huwgh/IcYj7qyyilhssmL250FOOvIERU8EEWXF5cpfTND/02A9EoRnOfOqFVPL+JogvVaY9iFPlBBTNeeLDuum3NUlDxoTLQnikCA8AnbUoBlB08zqRxok4R2KEtGWBnmCfG1eP62AIHuwBvqBtF9oaDAaCEr6blmbDwlCm3NuJxisGC+s2NRhpqsd1jUooq7fXbofQJALrdhUFws0KG2afOqsXyMoV4LIa5C3alona9CqX6Z6B9NIzGsNkhPl8gtXNOhDgoJZjdzcmJd+kL7WtinUioUEYbMCse/m6Hw0P1mxcwvReqVB2gwjJyh6rdbOo/kngrY0iLVR+0cQFPhBVaMPYXomiGxO/rUVizxBbui0F7+o6bSl8OQJ2tKgJUF6QvesQZibj5vqDQ3SMtYejtUrDcIKqwvKVORCgmBJTULEih0zVIUXBG1q0BDdawsbavELT1pErC7e0CD6MQQFfhDmw56tGAiiV1aM7TEXsGLO+oHQed/4EzpObb3PxxrkzSA/a5CeEbMZb/hBjK5W3ozFdGWVidpFmyW0KDGzYlFeXE7oSVQNyucEoTN+0w8yv0fbgVoSQlZisTMGCD/SIB15ZJ3u+SkapP1BSpBbIygtg077VQ3S9E7bxJYgVII0b6AEEUl0r9eX6D0N4jA/tPCk5QMvztEbfhAIolexWJJdS7S0oXRuI4uDJ60bbeQeOKvcwQ9SjynUIM2MWOf9ugbpjnuKA6s186QzRO8faRAWVut0z8/xg660ShAbMa+smM2o5peur4m8VdOrDg2KMNKYoHvjPT9oIqh+smJGyId+EB/PrzVIRDHWxvhhfmxOEGGJfqaFseulvbV5kP9RDcK66Bd+EFbknHeMDrInT/o8I2gzFmNYscj9JD9IO/h4g6DJiu1WPGl9zIVTgtRAmCdNZsVICVrzg9wY3Y8EsVkxXbzpVjXIqQY9W7H5xCGas/alJ2rDDxIjFGsXq2kQu9APQg8jCEI+yB3juSeNVavWeb8Ri2GlvdxEN20pXGpQlR0TtqHYMB/ksMOMg5x0fKTbTyAoyElHQWf9wg/Su8rv6jCCZvNitu1FjicrhiE+8aTld5RpFGkOeupZBEGOQoJ0+CaocriNfFC9ZsXIIZRiHN9KMoJaeQ8rGuQb3UGM8zOskZvlg0yT7PHv8gLa2M00qI31yukxDd0cCw3S66rv0IhZtWLkc9KOYRbheuM49IOiH6ZBHxD0P+7OtjtVYIfCozROkBEQFNHetfr//+WdnQyCvIlae72nn6RnHau4fZLJZHZMcTkXDufLXOfc/I2CKhmC2KzmGwXltwpqGORuFNR2d3QUVC1TUCsI7Ys2kwryaQ0pUvQ/mHsK4ikFybUci9kN86BZBcGKQ/aXVtlx1zBIo1o/k/7/UNBiBoUoFhjkyA4UhDzIWdtX0CIGrU9OygHuCQaFTQk0HHkFrdyfMci5pnvjdi22gEGWnZ5hJVEQSf0Hueg/zCDxLPPfOi8An/dgHsuAQem5tLyIQWswyN4o6JonPcwgagTB4WzGNINC3mPMbzBoh1M+mjhNM8jsRhgEhy8O5+Z3Pi+SKYur7F9nUCl+QbK0ktM7Qwb5IOFBsIhBcv5vZGeVnmGQdboWC6ec3aSCzpULje6/wiBp/9gnz+VBFM6L7fakJ8pWSVoc/nEGwbOMtDljLJM++/vthpn0eB7E1FuLhZ7FJxgkDlRbPIEPo3C5m1QQ9m0SmZzzK3kQfEN3PQXxojyoyZxFUSynnFnrP/8wgypxxSOGsSga5UcYRLIPli9gEKolPFqTfoJBSCkorOalxDyjIEvZ7zEIUnyOQRwyZ2GQjTYs5+rtpyjI2rGr266gxxl0PNOl8P+CtyvdG0MFyejlRXkQr059BkFR+8vlGQblX45XupOKPIjmFBSOjP7OWkwEkDyeB8m+8yHF6t0/IYvLnX8H5G/h/1xBOgizccPTBsbGFe/6yMZ2kkEsCvJvYKgg1N+kxKw7p62HWScPGlGQMOjENwxS8xW9Tosdi4I8QvwHNskgVvdfbhqt2zwIJchVW4MeRDHmsBePHrpOBXGUQWr2McogaUFrGbRD69kginUZpH3R47sa12thkNrsjTFo4KP4bgXJ2PC4oyDtVbTdVsU4tpMM4uaM6kBBBzlSGjJpK5N7Sy0hdzPp4WpeJAd3HmoZZFchahmpWdvAnJ6CbhkkZ1pl9LLO+ml3NbyijAzOrUqTie1hj0GykyoKMkaPkE4zCArCTmufQeq80GcQzTNI9uIB1mEedKMgrQdhF8OYWwXJOfq1GM5s1ZH87QxSAQXSYEJvY9zXSii+wyAUZewCBVWioPyOgtIN9gBCz2JpU4u3AAAgAElEQVRg0DIFDfuDykZB5yp/QEFWFUR9BY0xKK8OrYJsX0Hc5kG7CrncfB4kTp2n9V0GdRTUY5A+gRhSq580vT8PijuermLwyoZvBz/PMUhfXeujOMsgsUXN7zJIohhTUm2vDFo/zCCYhKqC5Ihis4uxREFwBz5ecqIlDKJkrePIh3kQbLZaBrF0sc6uxc6QXE9BDzLIqoIoOHFK3/TbFCThVsbOa6e06ZkDq4RYsDSfB3W9XGcUlFVJ25M4zyB4cxTV+RcYJNaeKT2qIAk6SxjEyVrKA2N5EE5BXxlkjzt/PcsgyYNeZJC6AYsTAyazyHiqNykoQCcg6PqL3rx5fTzJICbNpBcpiA7HBQqCWaw4LZSioGcZ1CrIqoIeiGJeMWLesoRBVj7wkTxoD5e7/HLpMAjtH3N50Hkkij2RB+VHWBepnzTzW86LXc3GYxVQM4gkiMY0DDJNSmTn6kFbOb25QEH4xtJiBnH5GoPCat4+EcVQwlxl+AMLGHRayTbJeB50LrhhkJFTzXfWYkS7Lf7C0wwSw2q5RfTeTDpIRAHEjXRkHcbXIBa3dtgza7ENwydxCYMwcpCXrMWsOE69xiD4Cl8uQTGpfYhBNKGgCQbReD0IZi6HghoGoaWK7q3FSHdOX8qD9uiHwCzorLqkb8uDgkJiSvM8dXAAZpf7hyhZmOY0YuxkpMq1WmTtgEEmKGYRgxgMsksYpAq6tAzqnDBcwqDm9A839aCHFOTvgChoaR6Etds4g4x/Rw2D9IzqYR8KTFCQDT2KRsdTtYp5nkFaQdzodCh/C+178iBrAmRccvz6Wl9S/zCt1l+bUnoDcZCV4hrGQhXrjFSd0k6aOcOSvsOgVObHL4ti8oH3FSRnN3o1af+gwyCD+o6eSIQxo6WhglAg7CqI8YQ25EFQkHmgHiSZNGrSixjE1o6uxfxfaBRkJYpJm7OOh99E0mqOtdg2FUURhwKg1qDVBe9hBuFabqEx/gWUlzedm7eBQXW2/sLPOa0drDq+vlY5f+OeU+zqOtlu5FBhiGTB0/42k3YhipkXFBQm1N3si10VFJiT6JBLx+60UYv5cQWJofyLCpIPdExB9p6C7JSCzI2CcOAMDCIyjIFyKahrWwXJEcWgoEcZ9KcKqk/FpkpdtP6J6my7zVxUrDK4MGA2Sx3nhYdSM/xUx1yY4P7LnUx648CgFxVEPMsgMQCnqsBWbL4h4skoJsapoQb9gQxCjXqb4pCsj2oHkk0J6d6QKNYySL4Tn8sgowqqPYL2aezX12ldn7eHb6qz1fH7W/nkw9r2qFGsmWUjh/MGazE9YfhqFPNxcoZBYV+sPOwldadhHiQbpRLFrgr6WAah3qfOC+RIFIIGGGoVhGz0wxkkaVDtzqss9q8WruMFCmB1JI7kmA1V14ftZbequIEQTos7zaRxFKPJpNnfQGTSrygIFkF62meKQaEvukQqjiccyaQR5fwTENkPZxA2+0kzaViUFblXjJ5GaaOYtduE7KczyIepcpXs9qsjRvsU4kgewQ1YGETJscpVQUZMYC5wI1+ttiv/ajyGO2sx1yjmaQbJUotm8yDJpKvDHp73NKYgdlSV6cEnbqnX42czSMeTi/uLf0fYSmeciOvmQZuI7EfnQZIGReV6j+lQP4c0Vz/pvIKC/ELMJ0F+XYa1mGG1FYqyLEuSLDnAH901DILVBr3MIBs+8Lm1mJEodmSNaiMKgsLIr95dKg5VH8wgaSgSBsGyylMcxgtyXoyvZzNQz/h8BkXFZnvYHarNzyndH0+iIHjaE8eu2u/qOBMG6bRBDuOh5NVco5jNi+zlPAi+BdzrURzkQT5gqoLkfo1k0lAQ6j+sZ1g/lkGekyLRK4MQxaQRuBPF+Nqz+IkMkg15hCqvl51zlBabzBWiIL8YkwkGFG3X+6LYbraVYy0JNfMae5k00kCZejCqIB7samAA3UBBLC2Howxi0+Q9LFGMpWVtTEF4AnQRX50Y+gxq9skGCrJeQVkZdRhUnt1MTdo2fdPcKIjnGSTXDYNMpFFKFGQlipmgmE4ehMbgPoOSKnmAQXhB/g68b2/eJ9M+k0YjVgxP+xKzferTfu9gH03J6kt/fiJ1JJvYFzPYB57Ig1hmO0c9BUXas2htJw+SDzyrTkMGkSqGQlPqYW/MRCbtH3gB7LZyEN8eqnzAIPafgEzm7SnIv62vFN/YVkHYBhnfFwsjBlsXPE7WUz2KoiB/TWw7FUUoCFu3WpM+oGnVyHV3Ne//gDFXBhkdT2X8LVzOoLcrCP0z2arMfSZTrJPvs39I+eWnFEdOG51L/7P3UU7nidqJfbF7ChLFdBVkxhXkGe7f/pBBMk1cFeS/glmjIDOuoEoUlH/JGeEBg3yqjj51el5BJvgHBQVpGjPdH9QoSF3xbIdBrYJ29xSU3VHQFIN0V6N6b38QR8W6PBzKzTHn03ZVnsvVTxLX6SHCat7/aB50oyD7ooLGGKRtz9J5f8sgD42w9oJ3q78dixkk495HFcT0EoNsx4kTO6c+SklQmmSQMIoaBf0dg6Ag3DJ+Z48iuwTjeDfbzNn6gLi1vnzbOvk6u1gkFPbFOH6KQYhLixh0q6AOg2xYvbM4LZQVLWAQ8iDHIwzCE0BB5iUGWUQxFASFQV5BJIdxphnEUkE0f84gm5QnLi9vVhDRqdxvy8hjtv7P7rg/nuEnfdpnDv7SNSUwYIOC4qcYhPu5JA9iA7eXEQbh/jpsNNt14hl0oQUMEjsZ8YTrMYgCg+yrDNI8aOsVRNGlcqeVnWVQVCQurN7/lEF6y96qIDRywApFtrNhTu5kSiPFYW++jmPU3+FWHptn8iBkCbyEQajpU3mmAYOwOIefkOzNF20Uu8Mg/1a2I3mQ1IuGq/nH8qDTMWIKftKuKjC8zs6txcg1FcO/ZZAR6l7em0lrqUcHu+vcc7ht6a8JM8JJd+RpukfxroIGq/mxTFrmhx1DJt1hkNnJ6j3UoP0XakkeZPMQxXoMshrF7GsMYukoQyYNO6Bz6Qh2PjRTD0LFsOko+0MGhTvw3igGDTmDICWogYrq2JF1kjurgKCx+rZPWhzoFyjI4Bs5lwdxpx5ETX2oryBhUFCQvaMgYZBNsfU6zIMo5EF8rTA+lQc1zIEkZa3gBTLWJy0lyaCgpicRR1LvMIgfZZDH6ngUAyTfvJrvNrzK1jsCViwujzL0PI5N0zHdcbWXsRe8SEEGCpphELeZdGRUQVr/sR0FXaOWuVWQ1ofGGITEyowwiCQVp+u1fYZBxoQPWCqK8PETc5axHsWdOHP679AaWQmiWCgpzzCI+VEGQZJSgh5GMfkO/Y2CrMxiiRsFSUsrt42tXQWZFxXUy4PI3SpILKvcEgVhauZoPei/3J2NktrIDoUbjGjZbhuw+Z/c3X3/p7x9pDbYxkCbGCaTqUrVMslsCufjtKSWji4E9TRINB3ZfJh6Jn5Fgx4T1NcgmetuE4RxlfsaJE6cG/kfRGvQPYLs5whSFQI82shhLxRZq0NkqW15L0ysQbhoawhi1/xABEFiIH4aoUFGC0r62s11C8L7NEh9E/FIAkG0Kwj3YA80aCvr4/OfqEGya0wJQliU2vbsWGtWY3IN0tmNRoP885XNLFEE+ch4nAbJvRm8PErx7nizBol/tBgmB4L0JrWQbo4HcVAxMg76EzToQlDaaFB6wabPz8QahMv9LLGNBkmyHa1B5/N6jAaFiqKT1xJnvleD0LXQjoOQixFU9qEGrar1j9MgPcUAkG1PinV8Pcy7NIj987O2pUHYL9bJxYYJQt+0jA+Ni4M8otQQ9G4NYhhGdQjyr4s6cXc1qNoS6xDsD9QgFR5dntmMq0obkUm7FlUTahAmEH0yvLRtDeI4gtD/c0vQYw0KBMHLw9m8Orw5FwMx/VxMTLkeaBC6PfjH5WKmk3SF7Yfh78NMa+9PT6hBEkknLYJQ8DOxBI3WIJxi69NZpqCxEdC+NxeDBpkWQbrMZkcP6kEowvYJWv2ESDpNm6QrDQZC4RAThkznFHumQet6e0MQBQ8zG245OpF0iyAj/+AjCMJHHvdgsvtZI+XHuRgKduKKJwSpC148QaggRmjQXDezyD75bhyE12weadDtKXZPg87nkocI8u+ItJ3hg3FQsxiTr9Yd3d+Mj4OM9iz6H+kQlBB8FFEMIfzAlSBj8fZbBJlYgqztEaSR8n0NMp4o3AEIQei/Mvl+BV+COIKyGIKk7Rmd9Od9KXPx8g6vp1h4ZHc1qDEDeaZB10fWJwhOC99A0CUasjd/jwZC8Ro0QBAxRnqxz267o54G/S5BGzFiJBdq1Ejm7mpQnyC0ixC8XJ8SZG0kQerlIR1nJo6g7TOCipEEcfDuMB8nqLEPGmyqjo+DBghy4sS5wzopRAFTEyRXs/W25ObmNFaDWDv4IglSYmI0SHsW7fdoEOKgb9KguwSl3T/1ggahewYle76NgyY4xaSz3v/7kYUGZfEaZPdnOHyxiSFIOsooToNoBEFTa5CRu/gl86cJksiZ72jQmFxsKA6ymIvHpY/EQdMSxFirgBWBMK17mIvdxkH62j7XIM436CijGA0y4mL4fRqEioiMs3w+DpJ2jwam+3/sBYLEkXyztf61se84xRyjxrzeb2k7Ig4ympvBMOkZQWJh5SiyHiQrDfl7NAjE6GD45zWoxc1wUP2qBskGQGiQbRE1aS4me0pQHxoVB1mNpOn5KQZHLFmCGaFBJO4u0ZH01BpkXbH7oAa1rTdN6x7Vpo1P5w1LIzTI2ksclFj2GsStmjTfISj+br6Vizmtr50tD8RB/CgXww/cEMTDGkQDGlQN1YMIp1ibIGnNtyM1qDWzep+gS33ocoqFpryP5GLwyVV/qWDxgkoYvpOS3M/LN0l/RWmQdux1COIQSVvW18ag/UcrjDcE4V5M3F3iCdrpVXtDkGkRhLiIpB/owSlm2vUg3dQCu7ZBgmTfWIsgiYsGatIygnohyOLmj+geQYMaJHs8LckWzOvU8xBBUF0sAewQpI/sAwRJPzS2a2FlnppMQZL8JyhFbzSnwbkMCD3VIFKCXF+DGM+jsRFQgrDei4YJ0rt59zJBrUja52baqi9uMFEESUEpY2cjCErcZnVPgzoEIXfgpss1VoNY1l+7+kTS7UEPNUge8bcQBHUh7K9wgEQdgqQ32qUkF/SQKFKVeqpBiHNONVGboBA5AwiyDUFhY52jW4LkA+VGnWIPNMg6ac23epMaqUHkVhuflEZokOx2HrwX62sQfmB+uNidRGiQFpTQfUDbqmyuagfjoLCpxdlv0SCZiAdDbBsJAkWWhSAvQ+BJfyciDtJ1YS2CpP6DXgbSetDlFOMkS4biIHme6+wwiQZhPgw1av/+rt0dTzWIbT5zMadYwpsV37kX6xKEfiBMA43QIDEDsXoRVFE+exAH4UNX5hnb79EgDiGQ+LR6JYLoYKkHpcKQjmsAqecaRJVE0pS3NIhb9R++apBoOtMwQSTOFlNoELG4wZBE0hRDkNWdhsTPCfJvICuwPChGgyQbpREapCOMTffBw1MMl/lSg/6mOAiLjXCS6RHmMTJybokPXopv4nes4+caxF6D1udzO5I22v8zl5o0teIgYp1yviGIxE3HjMnm78dBrJ31eoqF2ZcogqJOMcRBFBMHSS5G4zQIQ7oeOZJsk0STHkTSJK3m36JBGNvdVrv9CtOqblXv6mItepQ6StdFvau2DpE2sYmIg06kdkrXUww3qUlVaFjYioOcuL0M52L+ebrXCermYmE+rNwV5CI1CBvpmGPiIILjeIQGybwYL17QIMvazvBYg/AOk+WnCQq1ntT/+8IFL8sd9jksF4vZWYBJ6Vju4cQwO691GDFGg7hPkHqjELHeajQaxHCyMDx8ivlPLE2iQTkX+0N4vsRTn2KIpIuoOMhIfaf7yJ7GQVKEpUiCbFP/+RhBzfI5MTHL9ud6Xq0p2c2qfZ3BI8Mn8nxczWb1uZ7NsepBnaS1PqSrmQcj6WAKeCGIL5LcJijEQUME4e1LBXeaXEwqjOH58hiCWqeYnGrcIsheAt0bgmR1z/Aphr+gqUnbMEcPT/vwmRnOxZoeunZFUYc9eh86/44/m803u8PomGeoi7nTqUyLWf0/9+v071kdyY/17OTS8jSrv1zKYbRe3BR1ubfpEwSnlx5BtyX6EAdptj5MkEkmioOkB1SuSfCaY7J51KRNNw7SbeF0JQiBXfAs6xCEyJp4SIPkHS27BHEgSObHDgM1aXnG5pYgUoI6bZ3+XHhMUNhDOWX8k2IwI03dVvyB6ItBTPHlfuWb/74EFnfarul4zDfVlyT9KDqqR4OcYrdz83gdWjQHCerUg54RNJEGTUWQdT2CENnRDUErorsE9TSoqVGT9kWPI8iOJYgS7CF4gwalPtbJYfK7JnI7+Cj+Sqp/4cuq1i/kXJGdWPax+AdXrPBVnIZPMTUm/es0iPqnmCSXiOywLqx3ihFzrAZ5gkSDjDpxxhKk4yzJNRCIIkhOMZqQIFaCUjiSb6vlYlkfXLmDn/Svf2qx0XUsDLl8lx30/GI+ZdlmA1PyJS0PNEAQPyToh2qQB6Q6uMspdvJIof+HwmX9NRdLpEaN6ZNnGmQS9WqFiIX0dYQGkZTMaDxB06ZiIZJOquXMf80X1VoJOv6zl6EHsZs+uryan7Azwb+SsiOSfs3F2qlpQxD9lXGQFWJaGiTn9CE7UK8mDeNLS+coDbJoHbf1tsQM66hTjLnZNz8mDvKn2JrfkYut6+WuZJfPFysXCKrna72mJx8lzeY+uWfzJXuhKNSvdRPLjQbtto7pL9QgPbV6udgaHuxZgTWc7WyeqTztn2oQaxPjQXf5FNUoDWIpII2Mg0SDJiboKAT5OOjgg+Y0XxZlLds1DhtxJPf5uytPczwTp2G0hEIUIunloAZZVBDt36VBe//+uwRp/4pcUmDg7FpRxABaQ9RDDfKvHZezNVOFouuoXEzsTcbFQTo/9qZ6kDv5ZN6ltJ2v3H629QTlWSUtQ0jnF7sklQQMF2X+3yDVlB77xCSSFmuTzilmrxpkJ9Egqx72PDA3n/NbNAg3q9zJxZp3FAhC9wGLCvvI2bRq0npXv+eYOMi6pZbQmgLSXYIuE4iBIKu2cKMI2mh3gnkDQcdVNs9xGTo/UDHb5HTYaQXRJ2PFrF4fU8iOS5tWRqllX2rSWGTciaRtiyCeRINkuEOuDfsEUZa/RYMke++cYnYoDsI79qdYhyDaFbEadCnCoib9jCAxauwRZEcRRO8iiI7laYmvxb5My1r+c1Mi2dj63GyxnOMb2Vd65KG7eRhTiI3A5RRDPxAIcrKAbEIN0j0aHYJCzXlaDdqfvQD3czFxHO/GQYEgj1ybIP9IPEEmSoMuBJntUE36oQYNtZY/iYPs2zToWBbZYuGjIHLHpPZ5/Q6XGofFtrzu1fiSoGngXgzTU5JYXAhSDSK5SJ0qDpLBeool6Pc0CM+7r0ESOf8+QcvXCSKXZ79B0KoqVYMm3Q6lBkGeIHLrwwGG5LhLTQ4H7Dtld/BE+RfylRDMzW40SG0FKjYDGiRRgplCgzB+ZRsv1/drEHZr08saZN6lQcEg50WCGs+tySNpVIU8QSyW0egH4uMxNEuDGHfE5Ri+TYMahCljqxZvfQ2SZhjmKTQobEXQ3OsDGnRm4m53x3drkA1WA79DkA9l3bQ1aSXIf9JAEKMrmqWbLEXULBfxDHrwi8XRnm69XKWVwRM0EAfxIEEvx0HrauU+pUF75wnKiP8UDarlFGs+Q68SpPYmPD1BQWPEvV4TddJdCHqFSmhTVHf7NL3xcvUEEQ1rkFRP7GQahHtI/lQcRDjF2P5ZcZCdhKCpNchqHCQW0oTzK3TZH9OjFoFY+ZGvNkFXDSLuExQ0iE/70k6lQUqQ+VAcxK2b1D9Fg/5P3rV2J47sQPMQEtAYg8GAM3vn7P//k7dLapu23eYxgZNk9tt6s5uTOEV1SS1VCc++H4LYnDZVUOs9awiVx36GOeGJWbraDYckOYhHdFBmW823OAgbnDKOIB1k15VTfb9MN3QQW56YJDlI14eeQpDwDR3EIwjSodS36SC+p4NYEYQmq/96CkFqLfDSaj5syHd2ntUHT30TIyNpy4XOEn7SDYIStVjg9HEO0qhmuYUgqS65xaYqghK3Gi2CPGvg9UhiTvoPEMTM/Wo+cJAEF7w+gqxnfSjz13BQ46MYIUhunmIS2vbqPTGKoBf3gz4HvxsI4hsIijhINJmXbyFIbFC+RRDfQJA77NW7YzAnDQSdyvUnERQ4iKpLMYYgXUh7DQfR5ThE0C0OwjYDsmj0lR3qGX97BL2Ag7jJVR1X0hSCaR7gIOV4keSctMCb40UclOlM4vAUMwSFtOtPctCluVrsICi7c4o5yW0SPLyyv5+DdF+MbiLIaSpmfZ+DrF8kyV0NcBBtJ6/hINykWhd+qIMCgj7NQfUlt/2wxzlIz2nKzbPsZyDoFTrIn2JrKcrNuJKOAubucJCtYsA/KKGDCO2d13BQpl34IYIytv7FKzgo+Nk8w0FUXEr4AEqUyff3cxDpzqr/xI7roBCDkd3XQR5Buk6V4qAacV0v4qCMdttkLUZYtLfQvs9ykFbvu6d0UBOw5bXQ6iT0H+Eg/wt5DtofaBRBuqRMZZ09qoMS/aAt9vUo+zSCmn4Qp3UQOZ1GcPwCDsr2iNB7joM8gpqQP/rP6CAJuSXjHORlodr/PMJBOv0haQ4inW14CQfpPNBILeZPsZfUYtqDfpaD/E8QEMT8s3SQ6CdS7nOQLiZw1t1ZRW5JZrka0eJBq6RZOUiNExRB5EnLfAjaCbOt7QSTmqS5ZD/IAHEfQRi6zOCreIODnOwwg2g5q67XUaQrB7H5BT3HQbrByCGLWIKHmTRBEj0O6gRJNGHH/HMQxFcEefw7foSDKPgoxvdiHLKTOmPjUTV/chQpaS+c/HOUN896Sgl6QUCQULIWg5HlIwjC+x1DUMtBNhHloJzTCNoZgkI28TMcpM+eevdVWHdRgyKWAQfF0x72yiwee87D0fLvz0GIOpJHOEikuzffIEi9PcY7ivEp5nUQOOiaFu6POXxiYVqn80OcrMUe5aBbCDIOKrAhJ4eqaOemRzkoSyFo/giC0L+wq0WnDktDDoqnPX4qgrh7ij3AQTCimMUeZjEHIStpcIq1ZsixDsokPsVktQaigCA0mIjfzEEF+kHY3dBJenoPB4ndpMLEi4J3R18HyQHKIZq0/8kcpHPS9IgOkvWxSHAQh4xDGZ5iaBhR3FEMcfH9U0wUQSIib+Ygq8Wq0ld31kF8BweFHqnbHB0crIWTHMQCy+i/gIO8vJnVF3mAg3TMOaGDwjcY6iAcUieWWEnrqRadYr5a96oBPgTq/ZrJu3WQ0G5D4CAZRdALdJDOA5FZcKd1UC/c+CdzEOaJdHznAR2EDuKQgwRL4B1ZGCOI4lrMcxJJB0GrhoMIbsrv5yCPoK1HkG5Bv1EHqfUklF26FrOvfwME2bRGO8CRRVMczVd68yBJHYQPzCMcxDGCYg4aQZBW87St1lcddKhmFPeDJPScYW2CftDbOYhFTzFF0Nt0kPWDeKaRbC2Cehz0DRBkE2aNB4z+czthpkGHHEbLmjwESs0HAUH+PE7samj/J4p8hKy5nmKRDtJ08NkIgnBTfUWQKOfgfWdR9Q4O4vhmdYSDSPoIEkMQ8sWGCALHWFhQKdIiyNdiug7U6yiOcpDlqipiGg6SThM2QpANBnOLICs+op40RacYh2RZ+UIE2Zw0MuZ1RJHDJKvat+poq06/BrNg4njSPu5JgxISuxqKIDEEiSIIHcQEB6VjRoCgbHLKjo0rHtuplZVAkO2wxj1ofV03ajH8DzGCWCIEyancDhEE0/0GQY13B5wWsFff70nzOuw39TiILS1cEaMcxJd61hkMjhCkl/sSddn78diuGWc4XBGEZ/k6BHGEIDUD9v8Q7Ml1RNqgBLHjwEnJezHe7FL7YjjFMjIfxSGCikcQxIagay3GDYIoP6CPH2411JgiQlCKg7RhRFc3YHYYqbFsH90PkwQHzWQCh/JI94BSqmqAIF1RjO7mWw7StV6yfoVykNDxQnEb/4ogUiuHwDmpeGzRgRiKECS4Byu/EkHGQco1S4UNGIjE2bbPUmMSQlqLLOUZDhKz076OS72Qg/zfHn9AeoaD/PsVJ6srgnTOlkJKJpw3U6cYWpao3ts9+TEOktPEuYQOwlqvOmy3OojU9p8THOScCudxDhJ32pmJe0CQo4kXSpe6+AYcBASpt4viyc4xZzP4YmkJgNITHCTwiHPgIGp00As5CP02vp5iD3CQfmKjVAQ91fAN4VjuOWiV4qACd7uovag9xUY4iNsp1y4HAVFSl67loMz5VxKv2F0RJPDyEBnnIIUkuQ4HnRxaZF/KQdhnprwoCrUMIlcUs5wMQkunz0VOIXDjCQ7KODiQKwetX6uDQnuAn9FB+YI48rRHdrBrEKQQS+igHByltRiufmWcgxi5qqlaTHUQDKlbDvK/Ead1kLYLRk8xcBBqs4yvCBLnX9nXIig4L2yP8/n0kGPjoVrMp/t1syG2nFXT+WJ/kl461AM6CDepku83QJCuob9UB+EP+hQHYYKPIiUdhhrtFIPbS7qaX60pr2rhMIM4xkFifkJuoIPYoQXpIddwkP8P6nCPk7ibh2HOOAc1HcYrgmAGi8/EF3OQ20zVoKPO2XkAzeeLnVd0H7ALtuf5qkhn+9zgICKaFnh94i6JU+yTHKTClp/moDjbx79vaZQ0uQQHGYK2gqa3c2GaY5yDOnPSsQ7Cs2s5iCAN0zpIl0FucpCSGnVqMZso+2IOOh0XpXPF1Kuy9Wq1dbP9dKuGd/5L4XljdgxPcBDpeJT5c+vY+B8gaIyDZLPDgt9ztZjuk5EipkGQNpg0ZzWlpI0GoQsAACAASURBVD2C1FAKV7foSRuCxnSQ/5VdioPwG3Y4iMJIYR9BuNmb39FBYV7oykE6D0RfzEHL83a6y335leeyrCeXD/q1Xe0/IJ3pjGfITHUk9z+Pig9RL1fXhEiEsfDW08z6PxIQ1PaHGgRJPB7VQRDZ9o+McpCAEjDNsQ2ZkUMO2krEQczdnrR+gwhB/kcyDkrroPCZQKxCdqcWU85J9qTRg+7oIFYddOUgxB35j4TLgsk7t7XYVDuKcU+6jaZtECRhoiyBIIMgEET+lb2Vg/J6stH2oSfzUh3JT7vVBwqw87mEDSfN/HMQ05qAyJojs8jdJHAQG4IQ4Nf6STcIyrhXi8UTZRGCWJot6FEOahDEDYKGHGRz0Zsdev467RHfizH3EWROCxmSV7IxBOlzdqcfZO62iZ60R1DWImhuSjq77LOmBy1eF6mnfRMTEJ1iok3ZiIPaeOxHEUS2rFBrfvrbdFBRrdab42S3dedf5kg+K3//g6TeJZ4RolH+zp32i7herVa7yWQ18Rx0oknLQROvNVeFxoxItPSdQBBRfihTCNIWPd/SQUAQZhSzcQ7SqVZMe0hh1XuHg/4cQZ/hoKxfiwFBIS1K0GGUTTkjHnDQgh3yxbjLQQ8jSAdedFBYr0neyEFe5hwhpX8f8l+74wme9hUQdPYI+tc/i2ep3zMyMw/EJ2zX6/UGqQgUcZCIQ2akcdAtBIndcyU56CRZfIoNdJCGe9dE4xykN60ZbCfxfmn1DTlobxwUxmQzU9YkPOCgqaNouuNZDtJvSLror5fRb9RBs/1iddlsqsXk1EHQUs4BQUXlEUSWJ253ZuT/YNpva2sxjTpSBPHtU0zUmiSBoCY1c1wHMa6pSr2Lv8VBOm8CLw+9xfi+HES0yEm3nNFhpCEHDeaDHkYQW948bgJPqNXorTqoqCYbJ5SXi+2v47E9xcgQBI97f4r9Q+qVp9nimGD2P12rpJWDyHJr1Q34urKb5CBJI0icJ3M53tBBpBxUXU+xEQ6iWV274AbzjTlIiw9c/KDDSGkdVBD9CQcFNxhwkA7p0VtrMXdRT3vZLDau2m3gSL7bffh/IfSrxPP55J+deuWxpT53EXQwBHnKPdSYDL+jpHkMQaBcihHU5yDiHoLStZjuybv8e+sgzuuKtP8TOCihg3TCjP6EgxD1Iq6unNmfvFkHnbeTqhBX7KdruiCh7n/1pPpAVO/y7J9npAl1RCHdBzf3IRWBOxzkETTZeqKiO6eYP6VWjyEo1Q/aVmvJbtdiLObVQfTdOChGkGg0CYl/FoyHJDiI6jLvzCg+hyC0wBRB/p0d3jph5qV0eTmUi91M1rtJeakmv72AzzczOofn6RaGimaHp+HQvZ40EITSEz8u39NBcbxatx/kf911tR5wEA51tQjD30sheEMHYT4LV+3uUoohqB5wEI8iiHsIgt/x/iUcFPo/MEhuEaSICfdk12o+0kHaYezWYg2i7irpjLWJqpZZVfkOBDUmZrJ0690CVxkbtzzDm3w+LdFGXFzccnmYLPDs6P/MnYty4roSRWWgUWOEibEx4DlV9///8mp3y0bGTwgkyVSdEyaTVBI2S7tb/XCdazHby0nLykeZEWenYzEb1qv1FQQBSFL7kUH7Yi85aBYFWTORD9KctBdAU/Uqs1E4YhDPKIjjWw1U1p/ewSDb7HruKMhjPNy0Ni/KLoMkVovqg/i+f97MKsjgJ8KLEHsePllpj23y6ypP/XHlj63/Dqf8XCJNsc6Psj38lOc3JzvFJu/FCD/NEgWxKEgUMKegwKAm9moVNMOgVkHUKujOoANrVeuwgrDk8hQziN7kg7SfCX3Vswqywwpqq17D7mfzZxQk9dE+FuN/stLwerX0D+9fMUsab9gNhSslO34vJglW74PSJQpyqA485ssZZJro/QkGpVAQPo50WjN5oWEQjSqIIgbZsIPvLT6IZSXhNjrF7PMM0tJzkjppb1O//gqD9KoLzHciIWZZ03uV2a5ERvkj+aAxBsG5QhBLGOS/0DHfr3g5g4yHFpw02ycYJCl9FgU1zloZRLptyz4qyIZTrMMg9y4fJFWt/rHjbzDIamxW1A4r7uivKMgrBJyx5P7JVkxyWEfn3786UZDE71gvZsYZ5H//Vp30klNMr9af8EEeGetnfZAUIGXp0YFBJnLSaEAbUxBzxCD+Wklxxnt8kF0nmaSYv8MgnXGl3T5s/tQppusLpV4RRdO4V5VB0jLi3n/ISUaYxxiE3/dSBjFiq8szDLJ6ipF9wgel0tngn+DbuRvNH9BwZpcwSE41fpMP8i/QbEurh1jsWQahjx6XFK7pOPwjpxg5q0keZZBISHZohrWYYqK9kCIF9RnkRbbQB+HW4ikG4R4MLsI8GYv5b9rlR2xnj6N576yt/4LUU1AmvTZBMVAQXvDufCzeE4t522K3Gr2/yiCyqy9/QriqQhJbmlr/xCmGoiarTYa0U/Jws0dDT7GgoXEfhFNsMYOwZvaS2OcYtH+SQcnXSjTvFdP1QUFRIwxqYy9l0F1R3/dBThT0LQaRFD2iLroUJ/1XFGSsWpzQv7rDN63v35di6n87ffPUYRBLh+GQgqjXqzHDIA7BHUKp+BTjoVisrSjr+yDWT0BOmmMF+cdmJBYzbQ46nGJjOWnURYeq16POv3lkUDh0ZJlxVbAoxgrlonuwMQbxSD5IahZxUwpF2aVO+mMZxb4fMrqsJVqHMEYtQfA69kFjCuJ+v5jtKMjAWaNQ3TYK4qw8IUXZKkidtDE9BmkXNNFwLKbHXl9BxowqCMgYVFCXQW0Pq1hvrKB5YBCi962T0Ck/cF14A2BVQVJ9gGqOUQWFyQtuwAdJ2awVBdllCqLkQuyK4odmd9gwbEFnL9je211BFFe5TjJIblqnGKR39fiLoCA5ZGQi1ZiCWgbppAXi44yC7LcV1GFQwdj1bFVB2kf/wCCWKk7tm0e/GL63wCArCuJxH8TtjPWBfBAUZIKCljhp6W/6IQaZ+7iOIJZds6nl/qd1TvrjLWIQP/aLdRlkQ7UH3RnkFSH1dfMMSo5oQ+dfYVDTuyFd0WM+iNCS7xVFjYKIT+WhukycYl5BR/8P8Cv5PoOKMiOi+mcUdN/fY9s9ULv4j4105n8dUY3itIK+6tuUD4KC3Do6xUINIi1hEG5a7ayC3s0gjH+6FS7MNJOWxS6DJINIboVlxadb9xQ73/AFeIpBYNSjgl5j0GqNKPuHfNCuPbh2Vjawjjoh8UGuLL6SBQyCxNLLDIPWRRkxiIJznmUQ6V397Cn2dgZZjJ9xMuNeZpr1GYR7MNLynhs+oT3FREHMdopBodrjDQzarr14ufoZH7Rr/U4ThtldF0IdBRH56H0Rg6wE42MMEie9T6hVEMHXhLmJcwySxz/PILTwioLorqCHWEzapNGzSqKgO4NEUUiSTDjpIQW9xiBpF/oZBoVqoYZBoqARAakPYlpdFjBIBJFPMQiM2ieujeZxcZZK0nqBD9ovUtCbGYRonlVBdyfdY9DW+YMOo1g7pxgpg2iGQXYwJ/0Kg+zHFNSa5vB/c191uBMjZK0KZ6fz73b3ezHbZLN6sRh6XaMtCBydYp7fI7GYPKYoHyT5nwkn3TDIBAU91Elb1ANNMMiG+iAOzR9VlEGcyQdxyCg2iGA7HItJTlq/gCpIjj2ZWa8+yI4zyA4raIRBl1kGWfuhUywK2Jv3m1mJzfpML5qAnt2j+KQld92LxY7I4qmCpExcUsyiIEyTCXMU7YOCJEfNbTTP7T3YLINsUFBUJy3zpWmSQWKcjEzFo1wmL+ATyG1xxkwzCAlCf2ppcB5y0naAQVKTKJLEqA1xzkFBqIuWpDY/qaBBBhFa7HiaQRaTID/ig0Ls1SR/jB0410wYXHYf1hk+M1ZQzCDbVNqzjJFMWwWRzHIdzEmzf1ZxNRsryPvQx7t5M3gv1mXQqczk1mKSQWLVwSB/lPhot1HQPo1uUkcY5H3P0RWDCurGYj0FBQZRq6Cpe7GlDNImTftLCrIPEOoHXjutpZY4bRenFKcZpGtFTOj+aRlE7Sn2wCBkEDeeWSbOB10S4hcY5A+VsE9sikGSgszQjyeK8QrSa5DweJRBW6kXyqrbcgaZVkEeGSRt729kkIO1ZPotBRnFCttuurAbnKEjCO/ecTTNIGQfSr2kaCYvBAbJKFseZBB7BXEbi8lFKOZSzueDegyy+a0o+6fYow/ifZ7hFex/qXkpo1n9J4gNmmaQDLWTosfnGSR389Ep9g4GcZb84inWOmjDJhoi/cCg0FOm/20gNMsg/wxmMjbgriDZ/rV2+YAPMsIg28lJS/D2AoPyTYmekikG1ehbusg/cNi0UtWO1HqzYzvtg1ggZ19gEGEdPLIz72SQ1AvR7/mgUB8UN270rsmUQaGzbGdnGaQKOiRG14pgp6RpMoo04oMMdxSElYTpWgalPM+gdIMUpZnJB4E5/vftLGoQQzQvZbFzPsiMK2iOQbTeyKJW804G6fDXX/VBwUJ3S1gfTjH/wau+P++DUFHkH6eOJBaLGOTgg3wk088HKYMiJ02HlxmUgkE8GYvVKKm7rNCW7r/JfHMjCgzyjzlUtQ4zCGMRj68zCD7KvjUWk5rFX2NQuxJB4qyRD+r5Za4LGbRHUWx5xnDlBx+EZ8srCAmjh5y05a6C8IRv0oxeYZDxCuK+k+7lg6AgTAf2itnUFBJIqAaf8UHIKBa1eYFBKIyXi9W3xmIy48z85immNxiMlKn0wwuLcJGs46T9i/OKB2AQxtvP+qDQs6o1i+FWgxQp4qQbyWkL6soHa1AQd2Mx/4RvErskJz3IICsCuCuobhhEkYLkFMM36xmEnzuU5kc+yD4yyCUX0mCvqyBeFot5J40iyI6CkOSm873aY5hBWbUqMjvKII3mGS2qsmfj3rP6A066qUrUDRosQ6NZC6elwhVd8CibluFB90GKEwyyUtWK0a2tgtBh2FFQYBBCUTofGArpOGlV0JJ7sUEGdRV08IpBnTTJFDwOCjKiILx5Bd0/QRUTpgNnkYJQ1epEgnlXQdSME571Qf7r4QlsfJAWCnuoscy496/aUQbZanOKBjN2fVCjIHLoH2sUhF0n5P/i0z7IqIBoR460EFpBhFF3wiKACILSivu2UHqCQQMKGmYQoCfRPfDXVZBpFPQOBh2w65kx/Vee3/YUEwXxsIIALUhuSEFdBqH8Z18tYZBRBdmYQS7kh2TZMY8yyBabk51hECrv48kLmB+E3oGPM8iIhLLydPZvB+8Lvo7VuUC7syz3ue6yY3U6lSit43vj/NMMSgcYhOe1WOdAyucYZEL0fkxl4VvLIDvNIPgiWsIgHEpltYhB5qvDoDBAR2e5wgfx9xjUPcX2FRzpT5xiO/T3XC+pzJP2h21WJ9vNNr0RnmDaXbMy3W42Se0kXzufkx5UEKo3+j4Iixa8Yj7PoJt39c1uH17EoCkFPfogr5iiX6O4gEFBMcynkjC7w3yLQWcdgtYoSJj0Uwra0XWfnGv/tndcJsmprvLkKJs0dtd9mhZ1kXiHLJM4X2AQ3NUh3fcYBH8uV+uf9UF5Xl3knoxkMqddwqBactS8yAdh/9XSe7EOg1RBOmCcOhOoXmOQ7SlINqh9WEFipK87V+KZByzcOcFg+2OaoznLn2JlUmW77Lbyr+MrTrYXGbSq634sFhRkP8og5KgJ84OyGgtYFjGoxtNZlcsYRK8zaHMrnM5yhQ+y32SQD72KmloFWfFBH1eQuKDrV7XaH8qjP9Sz8/mCbpsqQaEDX69lWmdeYauad1emV2IxXJQdNin3fBCLAD7sgzTDKF9gy7GCJhnEsonXLfFB91PseQZtNuI3D/Wlo6AXYzFpg3aNgnCq/ZyC1qctNrPUX//cOfV22l3OmC6PNvrL6Xw73PJ0T9frP7yAZBqwfytHGeSfjaJ6YFCsIK0HahAy5YNYt2Ra7f6Jpr/cGVTdkhkfhAyjlosQLYzFcIp1FMQy0z6LGWS1RjFy0sIgDtugljFIFcZFPZ2TfmQQ66n14KTFSkcK0gVkH7+bFwld0m2Spsmmyv5V27zcH07b/62R4cdAqgSbWiqME5IxQ7dU3vIEo0gGGYS66E3kg8CcgJSgIMzuSKhRkBllkAxkP2tB2PDsDrlJlal4EwzCVz7+n7prbU9c54FOiGOFmHArBOh53v3///L1jOzEgQC9bbvdD3tOtuU+jEayNNI5+jfrIKcAGKPagKDoBoNUqhuU9KCDYM36srmc3XMOchFB2H+OPayP60Gc3dClf4lzrnSQImSMYnr91zkIPYhNf9j14e+ybF/bA/zwyj/wjwYH/S+o6KIoD5tX+ApZXYmgWxHcnT5peK1MEeRyBOEdWAcE+QxB93SQEEFOEQQXrBsOIsc4s37EQbMIesJBUwS5uHglcRDj4aLWF5EQxOEcNBghqslb6kF3EDTHQThYo4UV3IHdMSDG/zyC2LraaDbmg55ujuXqFZApD6v9nwUmvJvTvjxuTvByBf84rUvjjAeO5HN90i1jzSMOAoJWy7WGtccc5HyInrsXthS2S+vucpD7eg6SCQdZMRMdJKIAcAOC4Dbkq014l/bnQ4agr+MgE92BEcX253300/1RDmLXBuKY9yf8vSpfAtMgeC0OhT15Z+1/223bnE6L7Z9XpPMeEOIfez8Xe8JB2lC2tG/gIIzsomKLnyPq+RkO2n4HB4F1+2Ix1UF9VduEIEOh2+nJ6a46WveVHGQDBwnWSVk2Wls5VnvvzTQX+ykOAgn5c7GyIdU61n1AkH/1/7V/DjwaO3XbQx8U0Gb/ZyOjLYwwKHv3IQ5CC2K4Nu4NHJR0kA3XMuej6KJS/tscBGCED3zQQehAmHAQPuAaPYzYH1Yd3Xs4SJ5xkDAXsy0RBDceVdby8wjiUHMIY21RrBv7Um8XAUzHzrfLktQRsrJdvVucNpdy+4rtUWp2JjpvF6LYR3QQxsFCbjZB0D0d5MsWFVsrRJC4n+IgFssigqIOCkpQrzWbFx1zh1WgAEFfykGMYjD7qDYxioXrEC+7fwBBbKK3m3Nd12VVrV5lXdT4c9g0vi9X/tQucVmhRn1y6tlp6HfG1UUf00HM7v1bOCgq6dTtYX+Og1i/yzhIYCg1IogcVJUdv18BQSgIf50OUs6BcrD1wquy9nHw/scRBLspi7UHVbWkfXS7hQF5F6JaX73402kdkrN623o5NXjShgTEagiy+eJDOgjX8hYOspttu2Mupv1CP8dBbuCcMRfLopjhz2vqRPvlOggIQuMlO8oQBaCLnP0HcjETB3mCRF70/QbFjMZv+j7kYVjS23fh79Nm0S824fmfGhmszMjZqqSFe1RnOIi7fmY4CJXldP2kJi2ci+dwDhAUniucFs6ccu7VHXjgoMV2QavQ+xXF3NPsHgfB9a684LTL9VcIIgcFZCzJSeG+8iiGb0G6JgeF12LbZc+hjvfooM2IIC1ZsgsOUUxSTyJ2O7M+dI0gESIo5IFTBEFI1ftNRNBfaFKMraxNMl1Qc1cXd7Bqj71oh2J6eN2zagEIfDfmOMhy35i95SC82bgWXfa9fXQupohJPYt43IggnauXjIO4Gljma9Js9wkIslYechDALXot5pqDjH7g2mlvxqiWI4ibaJ3qIBObIt/MQeF6i2GpcE9HVE/SXg2sxaByHrpaI4LM9FQjIqgNd3FUElMEDVL8yxHkBn8pzscTJ02cLJT0v03mrNgMCNJzYCm3Z7CTrA63HISkpFzY7fqWgyKihDrnkQ4CB6E5Y0SQUwQlZ4aMg4gomeUgx+4O3bPx8FxsgqB+DkGcJ9Ns/r0IeqqDeE33UGH9Zzj8Fz0Xc2aCIDNB0AvOwbCuvOyFnfffgSCTxuQbegc1yfbF6TLnAU04vedaumbotDdaDyqrlgsPpwhSDkLugJnV9QMOsvKEg/QgFF4eiiBDBAGz0ZBIMg5ydzmInfc0ZnTyhIPMQw5C229EkHw5BxFhlpluhiC8S2aOg8wVB7G1IiAIhwn9sfgWDsrGmMlBkrqmnXklB+m3vDmdmtFVKIUxTFcFBNFx+mWGgyynfWZ1UOKgQA3F4bJ4cDZvVQfJwEF22cZzMlg5UNeQgzaXg56bzXNQAPxlVz7VQc85yA4zq1/IQVEHUZqDSYwiiD2MHVr7nnGQ2RdHDOrZ6FlmM8T8fQS5sbQoLjGPiGQU1EQwNVfzYoog+CTO6aAgpS+X7oEO4hBrtZb7Z/OavedRzEYOUgShtKkc5NpKAXIPQbavkiH1JzgIzgyr4/JDCHrKQRFBuO/wgQdg+eMRjdgyr4MmHFTR4ooI6p35TgQZlx2RYQ+CSOQgRVIuhExzM+2DKHYnF0PFSwJi7nNQMyLo7tm8ZRQbEGTkfCnOaHsuz7BLsBLP5okguvLf9ElrFEsI+pwOCkrDyqE6a3fHF+ugRHKOABA2iNGxKgHCPEaQcLqHOsh9JweZzFWKkSuO/QA7kiujiXcHT/UUQaIdZTc6SLg//hEHIZuv1s48zMX2x9ZlHGQx3sX6ECGac5Cy2pwOQmNQX9Xk1s9xEB7xUP0dDnIDgkIUAyIk3IDlH/cGDnLcrROV9DdxkI77JASlxEtSLqapVxMRdOX+khDUuzRheFMP4qqWfu5cTBGl2Xy1Fnc9szpOHAIAK9GTVQ4hiSIo/HzJjVWRg5xGMXyARFDuYYafB3ZqqzqGRc6PST5x+HYOwpNSBEUlLePZ/ARBeDFcNk3/aLjgOemW5CB3vhzoYYZrUd9Eerdu8HMe3uADZ4sho1jqMIsc5NxVPUgrjBIrij1A+U0ImnNzbXJrMx0oc9cRL0YxY4ggN6+DWADMOQgvOZ5q4GRVmJyDg27cXyLHWE3W4xR0PNVQxEhM9gLNkYOIIH3aMWpdZ/PgICKJc/P8BThQcer5HbkYOacas3kOMaNHEQODRWXZiasIEtthOMQKXfC44Y/rpyJlONFFupLGveDxpg+gnKOkhSUIWS7GZTFG9omjuC1KhHdIhLRbWDH8GILew16KoJYaY7YmnSEocpAXzM2H//q2KLxLCGLBrypl3MyiZ/FGBgRRWHmljHoVglJbFsJSiSgHSVuNpxw4tptWFMPniF4MNIjsVttLkBYG7i+csHwfByUEaX8QatSSTjWkq/2AoMB3XbdEoA0PeTzidN/FdVMRQSEkw24aNwQHcQXXDYJ0EYtJOqhWW0THKOc9EQSUnmsiyPiKQ7D2NyBo5CC43r2JgwS5OKd/xK+WziYEWXqYLUcdBETVGgYTgtoaEOysi4ix60LXDllabygHUThtr50XqhUrDi2VdJDC+AVwUgmPKzgtfIaD8PJjFLO+y3UQWKgLaVHsFwJAuq7ukDa4SBlAFOMgo5id4aAatnvhjRw4CDvzhJwDBu7KDoiC1E4cVNHL4xdxEIW/Wx3WzzkofGescg5ViMuiWPj8thijH6OYa6dRjDdIZi0o+xCyPka1CJB0yjFxf9kym5cQxbSiCISgUy5FMfcxDkq5GHIzRDE2/ionDQhyiiN7wEmrcP2Wbk2KCDIcJ7I0kILH+QwH8VTDDfWgusKWTQKEpUcght3Ix5GDGJp/Ewex7TU2gD3iIGxJNELEoN+nkCGKOexxtS53oKLxgbMJQYoo3M57zcUCB4mPqVRS0votVN0zRDGD/iKOXmhHIe6AqZT6B723Jn3NQV6V9J7wICBGBHnnub1WdRGee7JbVgSh38f72Kwhd3QQ+kW8HTiI++ktuz3w+gNiFtRil5GDyLi/SAcRQHaCoLs6KHxHipBa6QCgDFEMbyLeYJM5ccI9xI5RzHpFFHTPC98yrOX0CoBVHsWQi+FsaYhiunYB9aA6PD6uz9wcG7L52tJ582MclE41vPW7+qI9MujFSAgi55A1Dc7qY1+eeqIkBPFLYBmUJNNBMiKoc9NzMZiFhCeNbo8xatEvOnJQ3cNu5bfpIPsWDjLwLNQKIpdUukxJY/7DT5w4dTf5qIMCImwsEJFyrIZNmNYd8aaOOqjbsv4zcBAGAHH/rAfhsQDBlIuhHP65XAwykB1l7MawmZIOr8ZrJIvX4Ul0Mipp3KcliSkHzemgSncljzVpDvsIexQda9CKoJyD6Nlz+U06KCXfzziIFWNFTJApS1jYy6CLhKQ8cJAWBzMlDbvncI8ehuFsTwInITnD/jdyUtJBbuNdrqSFu38QxXCYDynO3My21XLBR/moDoocJLGzHtn7REmrCHKxZ1FsXLieZfNa8Qr/yIaxWx1ktKAUfiHnINyo2zP7VwRJzkEaxdzv4CAnZdXrtyxHkGTNGUXMvVI9CIjhu+8XMiJIvRzDVzCok139ImbcjSdAEO7RL/QjCR8o25Ogi7y2FIa3WGvS/D7H4pVfYSQSX/lFR/URa9KQLUSQKutBmkuHG0B6AUEMe4XOzS/2l+4aQVyBjWtjIwcZRkY3qUnH2qwiiMOpfCZWUgGQvyS81qjX6ttpWUGMCLJ6Vo+7iggKN7rslKgjgrgSzymiWCbTw309aaXi2v1rCGL7ExBEcZgKfvRyRcLBLlYLh6klcmkZu1oDgsxgjh+V9Hinxi73G5ERp6JH74PxLJcS4PPl+JhjswW+g7Yt1wgDgzWE9PVatw/HfwgIMsyEegYCIIhDJ//n7lrY00ZioB+IlfFiY96EXPv//+WtRlpbpmnapvGVHul9l0ACXns8Gj1WikAMSdHqGiJfpbrseu5yFWvxiCBcvlqtGBASpua4I4LGZJFw1DTkWItUg+hA+w3aCwdNv5EQM9SCnG4dKVutjCB9QkbeweytdoUiCGswDkpuoSCGOU9mCXx7OgQhq5ERZEkI7ILGZZV98nKSq+Flh81lhzmC8ql6QBDr3FsHKUZWYxpSDsSISeh6gsHnVjZQie/FRG4adbDqj/GJEUGsI9CRBlG/H504Qy1Ba7a0SSOzXk/fjluMVgAAIABJREFURZBq/dukg4Jf1AOCgnLQ9LohZlqUctL0G3RQ3ywhCG2b+DLs2XwxHd4uaRJWxCiC9hb0Xu2QpCe0tIo6mUXc/ZcnQ5BWmPHacZAg5nhIN75E4S2tRShBC+o6/QyCpGEUzZ7QvJj7C+Ug9ddIrYTGoKWcxE3+SDJG2/g9cBCeS3ZP8mR4H+ovQJC4+xJDNivWuEr6NziIsf1HMPsDBKkvRg5BTPtN6+4KVdI0IigogjQPVgixJsZsmTRXj0/kl71Jb0PQpcUaVEkzEASQ5/liT8pB5DlIXNOiUldLdQ8ZgmB0fgJBYPwZgiSzerqQO9kUtrWaDgrmISueklVjbwkEQeQoaOIgBV8QBAm+QGSwWistpN6WN93e/S6CtPUCiCC8z0HSBdRbsfQn2IDmTuYDB0mIWTkIiTeZUagJNmsnLAfb4wYaEaRLQDI/jL/AwXRQOoZnQxB2HM51kGiLUJ1QjQDdAysGRIkZu/2CFXM41e4xhbNiQU+hbpwl+7/oIsvVj4iBsuZvdRDrrjcgKOANFEMitdFXAiVssz2pxVtKWoyMHk5CTPEOgiTm7A5MKOaF51YMLePcus9n3BhRsl+4D7TfRfLmOyhyPQMZQQjJ4ZZCOQj6qus/rfaQo789o5IOPHHQ+oyQDsaEaFGqLEE4KGgugX/Ois11ECrM2BEJlDEuuF51bVgc4N1bBMnpIAr8hg7Sc6vVHtb8GLpHdJDErAxBzO8hCG5d3OuR7Mu+eMeKKYImwLD+7ACz7YHdCVJ9r5vyEPkwBCmm1ZvnDKrMQUEXpToI8CGJycZ1V9V6frZLIiif9zCbcxj8wPnR05ghaD9y0AZXNGh5Ewui5AxzLsUni3P8AEGSterZ+2JRmiD6k40ws3BPUgcS6GDUZCUdfNBWDuNbY7oUvcFBgXOuXh1jUmUtCCKEmk43+hEH6ZXVkGbyxV74HR2UPk72tHpmPZ+jf4JsO/nE8GSgAEsqXBktqwaE6lG8hdM6WTEcuuXFQu5uEIfeUq9EyyBomsubyxDBz7lEOqDbQvDbOPRkqg5icI6O4gGLJgQVuMX7gbB6sWJgjvzeDkEaMJIKM2e0dDb0dDWKWWmkWDGQNnbOCkcVOPNZGPnfvKBlmeegSm/qQi8BlPSY/0xHA19MLhg2pMkg3dUG4QC02RsrytLrK+3+YheOZCynZ0l+sGKyAdDxaPqsw7mYnPlCI0Uzh1PPGGcIys0i/zCVURkIOCk0HjStwSKMmabTt0icyW1SLFLl6ppxNoQ8oMK1wRFIQ5irNLRvYDGahsZdz9q7RlpQqRnoN2p4y4uK23bPpoNa10A4vaZVrR5BW6dyknDZt971+o3FSbth3L8jB1V69i3k3YrRylQrB1NbGSyft/qEsKxYS4wjRy6+xEk6VVtno9IpSxzkTNQDghDOOc9UDr9IouVX9mTZQ5V1GNkqZARhnVOebFxUwQlB08tL7Di0/WDXHR5dOmPXTr65JwAnxKRXKHbys7zSqOYYOy8Es1rSkwxOCZUX4tHbQbFO78ODTHMEEc99MXOuPmVx9RBC57yzS/berYWWIKj4BkGWdjAEiVqmcN7qcoCognXGnrNRdLhNGkaU1Lm6eQezi7fjTOWo3/SBRUUZ2sZOMhmCOO9Hf0RQAIKUsRZBkJarJGjUg3Uk5+uXQ7WqXv65UyOdFq7X11spnRfud7pehZFMe+L88uZSqPe+0URzhZ/h38CJoNJxkODPI0hqY1D/5TAWHW383uIgbyhy4ayYDndA9Ygg6g0OIos45v1MmpdKQrvgWJdQ3lESa4VflZTN+psAEPVGKs5kT7AxEx8wGh2EUZHfLHHQekd6zr7PQaazFtv1DA7KPe13bFja/BOkb2JC0GEtP3/t77Fp0NwkqBu0q9TsIcqbOAgvlVqzGAiZJBmE0/rgTpxbMUZPsuCCPelkixX9JIWnNWgTgnR0iMmjyxscxNonbeSgoCVIqr00D8dq1TwcglfSbPeYJ1aTKRMFRRmXRB9ZlOWbJw6y5P07HHTRKEdYaNezDs/otuU2pkfyAA/r0yV+OX99ESOWUHSsym3XbavTvbmilaJFY4L1SlGr1SOJIS2pLEID+CTVUPbO04qJk7xwlt8Yep7vXwsfI/hv4w0xaA2aizBGrdYHO23f5iAyilIrBkDp0JqY3k23JA+3CR8o15gpab1YFJ3tQcRhZvg0y/rri0I9mgu0k2wPiuZDvM1BNWvh5LIc1N1KtH7h625IBiu+1oeNxBWa6+u+OkYpAe7usGqGmKA6KGYvMXEQGKW8WNmL+NvaQcor6RjL1k1WIDQI945weo/CS4bf4SAchdNBqPXPh59eah85SBvthvGGhq9gwRW7J4LuzfCUg2WRZxjiqXX76Kv7RCrDV/oYsaIf6vRp2GBmpv9tDtrhD5bRQRMH7c7lsSxPO7p+GU4Xvr7W56+ihKjZDftaJozd7xr6jbkbsMSkla7T/UaxZuz4rmNhjTr1SnUzHaR9EYML1nJRxyn8QzaPKnwOB2ksLnjvfgpuMl1mHMRB2g0bZJwvFvQeFx0UbAZb17mYJ9k7+jj6DDAFnOswS3Pgrz5ixaIFfkZ6W9da//F9X6wzz39RDrrWp1W1Wq2/9q+Jc8476o5fE4Jks+GXzaE/bzaHy53vDUj9ZVOW0r68XFvkinNySqPE+p8WGZJT0oXN8pklMTR056s7mD7LiqGqaLq2scb2MrJgClP9yEEVFjLJUuGgaDFrF4Rh74nb1QvFg6fl016KscIHqSU8wx9ZFAZ0eR3UjTL5exyUF7BMPEg5qGk31bnvb+tNfd2W1WbYVKuEoKSEmjaBRVqUD73482JP67Zt+/R1XGu9VA41FON3JmIRh3cchNJBjyAtY57jRed0fpKS1uU9vr0dnjRhkxVpQFJKairLI+RIGWnFbnCR+RxHfPyc2Ud8M3Z9HhQ1cf7BRXGYyqtkYjXr8VpEtbPdPiYo0xrWO1vyIlbMzlTSQX2f/MTuVLVxt01uWbXflLt7sq9NX65Px+1tWO/vbHnLyVMJ7wTALM7Vdi7JJemOjp+kPkXqoNFyBxF2qTCr3rjDHmN6RfEshz/LRxVK+7IZWPcwBhubyzJzXbe2L2PFTAddJSbNdKy23fW1PR77dl+KyBc3f2iTzGmHcodeG9ORfw9BPtHOxLOcBftU559+xCPl/uog+rYq/tqHerDiPKx3OVsMkycD7r0r8+kRReWg2B6l6Cbc1j162pPMpRNlnJQ0qk6pO1dyZPefR1Ch+IkUHoTJ09zDbAVFbNp3d/t7EVSYSNOe95xviyQkFkaQcVDclvs60GWoLvFybO/05VCdowCo6fbDsePYD5sukJ/1/BMchOQwz3QgPxGCxqR8Ls+ivxhBIddNnTvK3ibidue4LIJMB9Wn9f54PK0PXTyWw8ttX21apl1ipmu/Kc/Hl2F9vnNzbX4BQaRSevLVETn5HEfr0xBEIWdpmJ7nyD7oe4ZcDTL5xESzgu3F4kHNa68OV01NfRC/fnO8N9d2dYuEyb1JWmt46OcRhLdGZNEp6eCn/f556QBfzEoW/wcIgtVihyCEL8J/wkFJMe+H4SwbRWh3G4Z9Lxmxeuhj08R+P5zOO+vM+QtK2mJEwccyAj0PCVnAGveQBqP/ZgDZxJNgWQ9jIB/NWAZBnLv9NlO1NqEmiDHSUDrh5eIwKSFyZlfibS7SoOGgwoVO8s7T/MhJgSd60NivreD5gc0rND/5scCba+oXPD9WQKk0cr+DdjOL2IAGvctm8S9te1d8r8rVqjuiPz69BbhY9pobRy9yWd2naDhuoSWYZln2YWXk82eWQtCHIllSPTPDT4TvvuyjiBRoqrpeDKbST2qxDykoRlocQshtz+7xgPnzT4KgdGS7tZWB46uRUg5rhr/gF1ktzKIfEiiz3CJvr1GUUbYs9YVbwV0hDcet4tP4C6iTDuRlTmReUj1YXoowLnhhqmNayFaGUW8uvAKEKih4qRr4iTjI5mpEzzidpgyXvbM6WprmLPUie4d4KXYgCktTkFWEd+PZEqtWPNG+eYroIeduJQ2rLOxr5XDH0j4ahbCY2P2PlLRiZrog+EA0A3mW+NVuVf5vH1L+tPhn/JGVSer+SRD0L3VXotw2rgR5CCRAgPcFHrGd2v//xzc9A0qy17a0qcdUolQlphkRV6MxA2J6Imfff8qL5ZND536SxZ7/abtzm8JPnuLf0JL68rEV6k/hIDHM7rTG+Ny0ys/eMUxmfb43z6mbT1uRw8YtlCTPXYmh0ihx29dTf3me6z/qgNM9KTWJugtTP6uYeP7lcL3nP/0atnVPO8rDWRnPf0+m/5WZ9w+Fj/hmiTr//BiCQdTpOGUEKX2S1xI2zX4DgtRJ+eXP4iCJOj+5wkDQ6S9nJZfzaYUIC52NIPZbCUF/z7thePf3x1HOQpC8cz4dQfmvnoZ/gq952+x0DlLyJvXvOZ7Cctz5b+Agrc63g2QD5ay9NAnSPBdBOmiY/TUI0roa38sonTS4qT7fDipFDFKdZAfJ8Z15Pd8O0q79kw493Z1PjO4PfRznQSRNzS0eKLpLoPgf3QCOuMpDDsboyOWZc+9LkOK7Yn6pLfk17d77tkTBEQ4vIK538/t2PBfTdpyKuT83FeRSWKTuQxRRHuW/5CwdpbyLxJOoytvOd5Tf1eh3+mRBv+w4M3TNl2n0NXFmSK4ph1FUOLOGnK3X13of3rZ+url0BWIUirh7dXFk6jxeKt2u87tafPrsr/ayQlM4tWzQZ2OtNm4Jxxig+6+ZZm8Vuv31oDQpw1xVvvQhDQdBL6yRt4q/D2s0H36Ivi3o9h/vhyNI/ZmQv/t4lDHmrrtukMo/iZz8v9GOkZoRmLl0BTkGxQI4ImqG/jYiLJRTjf0htMpXDp12Ddo273O13oFUEtlLvAFfgWq2Y+dEe3qsOYIRNOLbDL+5cnzBgxPelj1e3kI/AhzoYY4fQAtYts1BjAsaAVQCxADp1oZ/+HLbbhHe4ZjG152eI+BXhcZLp22bYUGdcIBQKc/9qQ6ZTdSLoJsHoTtJeau/RRAhAyhRDE95OD/FhHriV8YpHimWojDckuO165Xpn59+/xlBSLMaGZn9OAzrtFN+ZxFMghTVb+Mx97vf8JOpqIKsiMRN8azKYI7zcoangv7IoIwsE+VH4DwPsOITXhg/HLt1DrMJpaEjMKLSEXwYFwhQkiVHPz79gtzD2gjJ8HleIAfiWk5DIcnsNAdYbAvPBJykDH/Ezevj+BBOY369GHDPYSxdODlMCNI80zaxgzah0tuZeA3AGWeC0AbgLWl7gZOvXXZACNIYjCCadKaSeUzPdzQuIpGsvRx3VQcLcPata7h6IDJ9EgdFgTk0ECRY9xtzozKBcBT3DAHH+0PT0ynJU88zLKS0+YKDorBKXREk4gjemUMZGQzhqa8qhpBiAIl+MlfHHFFfef7YkOeGYKicvCffDlbjfxXTDhBkGKqVOjiISdermwhDSCjzNVDRrAoDpmg0IX+iA1czFKkQnpNB6YMJUTOGAp/KWvQMgphPNT87F92wIHx5HSlZOHPRWEWpuVL5Rw4yJ23BG5NfEWQY6rtwDEdKS3Opqg5j64ikoLakXOgBJ2Ry9AmY5pNVzIDnoiA+lR8TEyuXx8Ti/R/pz03ue0dT+hDF8bJUhPiEx70gxg6GCjQHhDjF3Y61Bp2OUvxu+JyrxpLGv8VyE+ZvHmTQvucgc6yWuayEnHIn5BMz/Fxe/pU7AivQQu/ljZa004gGyN0Z9s/botgwBy07w6uBFkzt+3WkgnI7x5dykPvhat5cEnPGMnaYtRyIgaqmXZzEg8N0emmTpE2xskA+ZlqJFmnOTnFSLBD0xLpDv1/peqjQiSq6WnGfcpDEJAIqDT0k7hpeHfs4aeuNRR2NWjs82TRLkcRTKv4SDYKlmiRJUeZaP17MCaq8irmySJJuBhf4hcpbgBSq9F72FhxUlfTUHqyHAaea1GjvLJ7gYw5iACllO1QMKNxRy27eIBjlvO0Hnnl1x5WQ7vW5mtCSpE+ZR4yOvuegXDovpU4qVpoQzjdjkrxRf/m9GmJ6dAWbbsegDOE0F7VSrt0hMpLfXpSfQUG5hHEIes2MwMRLMlEXv8QXKA7Nm6TuSXqgqgr3K3Zn6AsdX6/uxsufAujwxfg/NazcmI0Vtb3Fj68LGw2uzNpKA2AJ30/FXPR+wfUlW8KwPvogcFJVAxdS2M35lbWTOprEVIqNWyCoWbmQIt0kcM/bgq+bm9H+yA6iNdFyzRKaUr6W/qo0WDrtEuQ0k/tZXLuwyDtu72Wcb46bjr6xpE3OImHcSV1DtZZC7OZfJmnfj03tMghTWB6NP67z/G67JDf5SRzEzBGFsLIp62q7xK+12tess3bKpoYsw7TPsh50MOD+EBeWo8uMt0lbyjWMvC9dUxMIFFSemzIuBlu2rxNN0Yy+v8Zv4JtqShhBUIWg+2MyiHaYb/qxtNbOlZDSE9sTZFXNbbLYusu6Ss1tsdDzXmtUeogvsSXDt46T1dolmyq23j3Btrd1f1ncc3YQD27VXybqpKSwir9v+fvG1G2G2vu0wP0hbmcAhvpvziac4UmdDqK/+oE3j1KWbKROL14HtZcX+nFKpgbB6oOtx8s/m7foz6EorES1Gr5e4mK+bRSdZwfJ8hg2doj+qK3O72u8qpefcbqppi2o8XVbtMRLxAYTTSdT9XEJ/VxaX/qEplc1FYsIMksI2r8mbvDEInEsqr4ondrrovV7R8+jlZEoWKdj3AmCyoKmkytRIuaoT8e+CVF2z7zZ5TmhyniqoExSpG6J10q5uui33IzxSONN83YBkVJdXtONzVPbtg2GvGj0caD3Ww7iRSxNxkZJf9ifY7PR9+kpZi3aIl4IpmmGtdoNaB/2n7y9WNk44D0So1hGNvoaqKz91LaWXL4hntTLGKdKN2Nr3RovNFI2fttoUIZqq5Zi2nhTxvd0beh6PVRhgzF9liUNk1B8AjIO6pk8RF+2i7LxCAuCILOpeqqp/kDQkAzONCMSHTKCaICojRgcsXLNF9M2UBDOnxtnbcUh17SsxDRgfifIbDrtS2I03LEQpKnWZN02jCXRSbd03dDo544nmQia/U3doIaEC98hsQ49pSA2HQcIJgFBcQlhpYFWBG55GbP0RJ/N6hbS9C0H0WyvypRI1a1tqfj7ZNYhX9y62okRRJQD89wW64bUMHofsrIfe+v0diAobGh/Q6gOgwJeo2kdt2Rv0gwvXVqjq5r2bdt/YkoQKY0bJ7ygQZlZ36dzx4HzMzkI62NkRBmC/RSaKE3f1r7GAFKTk3LTTUqXPfY8Xsai68diEh0tv8djA429dqxCZc1n0/bwNcTZZD/B7wNNoirpgKC6IAu6mn0lCGqmYuy7YiR2wD4jCJvMCTI/nzwVZmQnxiD/MzHNTlNWER/0xQ+trNtbyJZQw1D0S5vV7CkQogYYt0tmVf6UHSR+GPZ30rGbiegGIIi+v6m58WvMq1gWz8RRE/Mdsir2lwLGS8nbFuJ+RvqbNxAcgoliaI0n5rZkjRL6qes23hpwdTKp/Sf1FK1l41sFovN7AQsSpFpd5RWDHXTWq7C7HXFP1a3Woq98mSxAUJlQx4CcBEEV22/4Hbp5f0mILaAtMzbs0zyspfjqNMTEO+TnNRlE9smLoe9rImW2rgEuGIk9PEJ0yRDH/dQX2fpBCfwrCuJ9cvzx8/gKyIwzTOfp9YemAfeMIJqiWTdN4+Vi4T3R0JNHRWQ00LL8FAexd87FND05o+T+lJhSJSGIWkLe3wLp5fHSTlOXXIAgYp29vYy4JtK4OR7fvsMy2jksmNVQdI2rM57WNS3L8GSgPJfql7ijueZfujdqH7pPruexCGv/sbFoTksbZYJyJW8Fk3+OrIMBQR4Igu+LLH7g+oI5qOMsY2p/AQLIpe/IHNgev0sKHOSNb4a2oMlfMYJogSEE0SgKgnY7goNaWj95pnm7lhVEtIrquQ0hISBPM3R8HSrWPwaC+v+xdyVabupIlMVCAovFYAw2njjz/z85tQo6k+6m846dSUZ1Tl4/egEsXdWm0i1EEDydEdQgneShqooj5llQBxGC6qL2u/wgS5oO/k0QpnboOyKC5hp1msPLKyaqwdU9HNIqEwT52yUHHdtD8CnBGKmgdx8Ds06ZbNOdwfY6QBBNCiNobtoRLER53yBoxixMOoAHSwgyK4Kep4MIQkyBSgia+qons4rQSUAH1aAhCUEL6PoKLDAEwtWNmhPd7xkhCK0YI6h89zUlI4EBHKH0hEmUBocWIHLqG7x7l31vLGY34LtIuwZPLmHJ4T6EtV2f5W97LL2fk8ZB94CR9AY6/xsYGZjbb/3jXxbW6H0kt+HetEM/HK8YGTtGkFsw2DyagKAPdRAhyJfTiBOGkCFCnRtaMcrQEILu+dD34ESCH8SbKNQLB718cqWN/WTDU/b4JrDrrYeBQtcCQo0UIz5QS9V58YigDhE0fof/GtRBgqCTNP21QVM8SwfJIygzCwNyyfGzT+gdl/dL1tImEloxgDcgxmDc0i+4MXMHk9sZdOIGvOaUwEcb5gnl9OZpSPsjZoh92jfwJ+hJ47DfAUE4FOC3OJMPGTgqpQMLf4SoynV4vWNbA/OD6Eo3EM+CFoPJHeB+M3nSpAJPjKAZw5Z7/5hotwas6hWXCnrCiiBrP9ZBiCHw0a4NDgXEW6h7+qyjzQ3ygwynustbhgkvs5im7RhBt0UQxNuIHz4FANSnWDblXZ4OmB+DmxvT3VJicJ7n8TShYsJJmXFX84QeJLzZSIRyusFaPhlBCe+U5hVGhrBgfD5WOTLg03Ajgi4wIN+ycfLG16ehwa1upDdvkQUN1sIibv/PXnOtbUDfAexJOnQlbYeNKWcDalL9oIM8KQm4KQwbTAYiqOnBh3T+WFWN2eVIYzrINOfshFkqeHuwKA1CpF9QO6kVmya8afG98w0i6IiLweepphQ/0UG04rzJD6CUreNQqDF3jOZJ1yCCYDIn5MnN0SDDKy1+Avd9pgYDAG1LlHEfwxQzvSX8/a2j3fgO/B7jOxwQiFXBeC2YAMdoHpXgZfEzOKcQzdcLTsrNJIvSqZfJk3WQVHdAMHo7TiCd6YaiP04DZhQNWzFqwlH07VSfHmd4RXAgwHEcMQPJySwyYz8fjvWYLiAI5rbFhwBCrxCXTLfH94kQdC8IQZcCfo7JwGXxebOAJw2/1J6Ky9tOvR/HYscqa6ccngJBQVqdpxquEUGwZGlRgBNKN72C4sk7CNX67MIZRbPJSb8/u6QdmvFwnnDAGjP9GzOK/eG8UIkFx2Lf6Odj0YOi60Ax3MfDcJwuGfbicoIg91HZGVWHXIoBnwFveb8d+qkdCnC84EPpINaZZBSX0k8eUy4wXjQpSxJ0UPIkHaRlgJzgKnNK0oP0fs4xIDqk+FlL1kHwZUopl97nmPFr59mPdC27Gu960qEO0fKwkxQPWDm0S0L+IUBHovmmlw0Jt0wFqI+Or085b7Z/mlBEmDY3eUgxASR5l2QhNUvRPCpC2l+AB4KOAJUIn5A2KDpNXH6oHBJu7zPJcBVXL3//aNC4iQ6638/0TVBBYISrCR0Z/ryNbq2Kl/tBZOlpJ4PflXc1DuCtd4M+GtwKHp8LLLi2aHGN0DV4IYn6QaSDnlq3KDQEdVawDL40+ako0qNhg91WN49ZWPBni/TSOTDpWQtxeXfJCtpZ/STMlk0NS6kxeUjaIBkx3O/M20Zzk4Lpxpteq4LTP8fsDFPSnFO47nZtrIozDV4UPAH+ZTBvnv+e2FJK358mbneUFRgIWNONsCIgcsPP23niy0uS5NNHWeevOl5XJHWvigKiWFgk3pRXdItw3ODJtMEHVuVIYWsBGtbbTZ3wZ58FbsEyguvQnWC8wahPo3wzw0GEScggPAOrnLWU9efrV54k0za+0gWEqpOcp76oxCpGdcWGq5jps2O9n0W32FDpgUv2zC0XNhBZG51Uka7GJnDbdsqS7I2wX1BnIcxTlXKxp0jRhOPMeMrWI3F2wo2iLfYL09ZE0jRE2tHbcP+ddf4ltwOySmnrVnIcLsM2TG8rzZGp95k0+tg/tdisRHbqpJ+z9NeiahdDfUKpTa8UFHitF33TO+YVCNrgh98N3yiRTjwyJYaaFBst+iXDZ00pm747XthKCbpSiOmwa/Maw7SAoq64a5yUTVNtjLG7uIaV89Ewix+FCcwJv6nNpjaEhutPN9yoUim/Z8yEUXLt2Ce8WVwlK9XwCCevpdfcEOlrCKJTbVLUSMtW2rvxTFF7JcPE/UIAszYrTpLX6iBZmlv6Hme0aykhyipbAbXAMlRWQ+VPLnG7jiJaPnBmlQGK1Yp0LkDmPe6pwCMk53GM1kL63TUu0vsskc7WVmvTeGV6t84AsxCaLSNtYnf2gaVzT7zomHHKWeWiM9KeKjQLYh0rPea/xrgd/HqhV7cbvqCVpIjvyUtOUxGvRRBqXKeJEEG5rBy2NEFRaK8xq5XRJjDj7fFPaLEox0RYWTaxYQtHlTCvYyrMZxSRlttR5krnYJJQrZroh+I5dNqrOuFKstAd0MqvCtPfXsPPSplnM7TQtGoUAz1t+L8vVrxrsyp+gPOh9VVY596EZxqlxfsN9Ot0LsGx7TLGqlUzbGNJBW1mVr/ScYeSnWi765VlyZJql940Tp5LTKRBVTDTLakL1kEl/1Kya/0qZbHzCnvurEiFFJ7a6PImLTdldcr+aV2gzt4TfKBdZ1JGY9fjJGxanDYcNTYMpnz9mocrGHdqmOVtEzYOsj7EzTAudBN8dRuRlS3aqX1dea/dmiGx3Mp61co6+DuJMHTbW+5u12esXY7ZhoVXwMosLGRXn9TuGHMbeghsiLCNmChRbzLYSTgZE/iEEut2ISgJmtmt3JtuVdIYqqssAAAO3klEQVRGusoliqgwqO4LS1ttAb2zFw1jwgEQY9d3EE/PiZ53r7ViWp3hNp1Kw9SGETHBookZ2iRw3a5lq7nFZGOznPic4qbrTY3u+JZGT4jsqu7YEAsyC/xKA2/VkdvAV5eNle6HdheAkkAzb90KIzZROr+4myqtgMW31oXyRQf1DUVsmJL/minyhrQd1qv9IA6wEtHjGkhoXbIsWmpKu6mI4sWkB1J3IUiLkpzcw2lSXJxfubPT4E5PzuoR1mRnQkiSLU7M3nocde2OIL8SnN3NlO3Up3bt1Kkt5/VDuVDTLdltMaxJ8nXWIgG0LjunH43UjA0xXxKMsPuwau23y8vf7HnnLaP8JgTZiKAo/0TK10+oTSKC/h4VhAgqX6N4fvBqovwlKijhI8yvQ1ASrdjfhaDyZQhS7pu90VGUPwVCPz/T8yQEaQncLz5wQ16xDSS3d9TcRJza1/hBZaiafL4V09aLv2bFhJBk5f1ydstPtp7n/CJHWpR/7gm9xmV//2ongHArspw9bSlg0ftiqN8VNzArmUNM9ztpF8WUEUF/T8j3A8fnL0wtUoS5mQ7IYw1tPmZHgAodCRDSQ6SD0qq3ksjaIoKibHRQaRc/38eCjt3ez0XPnZKd91xzOZcz1gsxTWNp7AsI16P8WRAiNp0jUS3ME56UEarR0gqLGjZMN7MppR7hf7YvTpTfAyCqEcGTVEOHh7RqPsRRpWML9g0PRadpevZmrofrJe07LKSNCIqygZCzdPSmGx/Xpq4GZMEgPrAiPTd4JJGO55yb+VqlGR1Pcc7FYYuyjcUMndM/VtVAVFrEzFa35+rUmumU1XV9fvTdfMvSW5szk28ctygbHcRsqrO/pqB2DBEeVUjSVp9upmnbfKr74nsOCOq7xTBfcxy2KFsrRt4ynfPDs4V2/lak/TAM/WNofD6MVXo4IILSG7LJzk/vCBPlD0MQRfQzcpIQIRRopKmQs8J9l49FeuqHByKoOi/SIiGOWpQ3wZgwszEhFBEbVqiDhqFuavCIjl2jCCK+tCTqoCg/IghBtCII+b78POft1JyRTOvePqqgg4hiPg5blE0sJpuoSKVxZUKooRjqtu4rCO/Tqm3PafHI/Y34i8q9p9Gi/P8gqOSzDYwg7N1UTsQPn/VHkxNHSpZmE+ogOj8Z9+aj/IggPiQ0388j8WRiM6ehSqtrh/xlpzQ9HW/VZOqe+LFtrGSL8jaYZ7ZU6btDhKIeqeuILMLxhiqdJy1luz7qoChvRZqfIGKsdhGjA/jSn4r3UqX0rHwa5XKUP1gNlduiRGlRZaULmp7rXNvtRvhE+Xk4vzLHa8X1Wy55qz+LGIoSJUqUKFGiRIkSJUqUKFGiRIkSJUqUKFGiRIkSJUqUKFGiRInyn/auRctNHIka20EWNGCeFkYSIOD/f3GrJB4C005vdtM95wyVTp8ZDEK6deupGA455JBDDjnkkEMOOeSQQw455Ntk+z0Gwl6elUKIDJaD+GrnT0T19uPmVPDvfurK6/ccX7H9p2JE2CMQv/2KC/erMErcRmwWde6X/6EqwiWqazcPx9pu57GERAr4ZDWWcpuKPZd50I+Xi1T/21mSC05A5t0r1OzyDfCzbA9Jwi83iyr0HhXJdi3y/ALUCts9jGT3s4yi/BlkaRzHSdG6nbWWdksTzaC2fkahcvvt4V6200JYW+OVQz1fTzWDiFqWShWOrhxhHcOvifK2I4jQdESe4b/pYAHNW/0pe3wOG6HKxWHVeeYwYfd79EzyPD7X/d8HVebCZs79EhRwa29ZGC7j6V/aGaNfUtw0UM3t9AbbPYxGoPUAPyKwluCRCW0A/cocmlcl0QFtRC3kOPEIZg6rBMr1E/d6PaxlTdLrQePWZUQTgdwrPyqeYvIudY9weQAXme8Hp8l2mQkZGgHWmzrXWryh0KCv4BX5uM3ULwMHmKiuIx2pyp04TZJUfPXLhVQGvn6drAwCjVcQ4ksVdIQms28j+BxhZWMH6g5QzbS1jGroALlhobiZF12O7GK7g5F0eggNz9i9dj/0LUk29Khu37/x1o5FJxndPmGQHJEgTIFd9bhK8ajIpBlNHTW7MMKj9lonYkU8WDQP0tjJ06IcVUjZ0Nzb/l6t7gcee7C8IQ7LguAOXuatyaFByyw/z6fBQLTtLrdh0i0h2pVSiBLki46l/0CXycvoQzowrjLP0asFUGohh7YNZjMBPDABPYfoPJaF1GnwWACnxnzB3c5ecwfbV4woKI3ASh+2mX13GIMYMXgpQLBi0PhhuJnW0BRxNzHoRELpCDCV1K3zUQ+EP+9ZVgFaYBYmYsiy1R+C9iPL1bLoAZyCG8wPWqEfcFmU2bdUzS+bQBAe9FiyfUsg+kH44NaJlVVI71GcgceLFolx/+yL0CM62rchiTF0QFSOQMCmiHws1mFSGfQMltnJ3PW6lQXJ5hKk1gG4ADQBPywzTnkH2x2MYFYD+iM2/BiBkEEqR9dIbAaxuw/ZkQMmts7Thsa/36QnZhOIwQLLAH6bDJcox0tSt1NN4N+nfEk2vs6ta8+dMJNpV/FoqHNnQZFnRey6TiLsrLyxMyXmV5o7vHWKT4MPWG8Ls2YfJ8vo0VYxRFiReqQO/xqDNHkIh7sqtIvB7SnURAQMBn8v/nUMoNRKAzGmgSchKyWztgiCrqJjmKX6hI4OzxmRF2x3MIJiRLtouF3T336OQUGljF56E9Zi5+xAZl1mAdgYKn8pMrV3XhgE15TiA+KfmBShDaeNikoHbTHaoOrYkDvdlBzxItE+D8ghrdxARtHWDaomJDSMiryvFgXBhWxwPytBIMhd0B6Ensuisf7eNrlFF2n4BfGQfMkF4WnTe2X1NDDhYYPQCcnMIDXek7fLBAEvdc7z8+pG7BIBW65X42EhmNYd+CqAZOhun2C7ixESGj2QbN9khn+bQTCDpG2iyQdBVK02pywW1kVFNzOIl57bCVX7rRhGvGDB/iMWvJphpdIp2xrMbeinO1AdO1mb5J3FRkLQDd79Mo31YARAHurYcc+O53nGDHFIqf2Pcj4pqqhJZPnQDVaoo5B4QLZnpSLaQxKrznmfRbtdkD0nO59vPnmHyViML8chZXt1UzF5u/TcR/HsOJ6J58RxHTwu91C/wEMmOYTFoU48MSXTO9juYGRuWMK8CH8f2f9yFMue/uDEi04oFhvsY0Y/nSv1tIzui21zrFuJvLReP9tqkgGDFGYDI6xDnSIqsFbuLfkmul7xiEYG0fARlGnuAVu0dJinXK+e14waNm5QOo0OHY8y6cLPNa+TeTpcbUjZryVNNe60fmaF1+0Zroy9Wbq5oBKYIN+QAak3Uomnk+sxS0V9zg2Hy+MRjvc2gX8OReDb+2r0vuNBnvut2/NcZ6P68Vcv2O5ghDUmOkEGSVUiPn6oFmsDCFTYlmKLe9Qg8Mk854cKUqntyIoOsGRIJKO2HH0EDCLQa+sINta0FLjUFAKzgckMdQXI2vwZjGPxwclL/74uB4EjGP5mHoDBZXACnAv18ZQHUfXqvfU0ZQuZdLXuW+TOnFGYNGjfk9HXBrxukJq4DKFsgkZNczOT4JgE44RYuH6YJ/jh1LMqAvTqcMhploQyF7/ASSc+pNckEHvY7mAE4IDngeTzXJdL4CA8E99Y2aM3OCm0pYVB2HaA9b+2hIw2LQbJNu+xwBSQTkxWyHS1EsLCzOU8yF0MYh3hS6cNsIdT/SyYUlsyeuhNB7ojM5EBUhMHid02IYPb7/hVPsQ9UQuFEGW3yZa2sEmD5swsKqO30QxiHhkj32nOnpZ5TDQm2tdCgLa5y4bz2U2jcN0X1fXFzDIep5At8uAXAINWuIftC0ZAoAqnQNYNKF6Iof++IKadqS4GYdkz2rq9RdW6EqNm8nQqaDjmN+rcCF3oQFLY40hePBLPNI8A7LrHKsgTmq1c50Z3WDsEvDJobf3TLYNgCHqZ2uM3aUbYNN4gGG52D6LU6fyQrLpSJ9tC5jRobAsQFYQBz5aKx8cSwvw85iLdMIjqnTzpYvN47vRZvS7U6mnsilte0bMnCSVmFJeW0inkwb22OKQU4ruH7QtGUkzGZDOI8vKmvo9B49rZ4+KHI4OWFh4bVhFiTAPIZIlUFdjfE7qKg+RE+9GPaio+p2Kao//RdMJfCtsqblOkXoJlniyqTdNlwyBIuSEpbXTpTEZNYB7OfeOp2bBJIIFw0T3Kod6H4/aWLlhIUOSOW2vlmqUZXyLBawTgM+eeTrlIYNdisHKT5Ujdqly2d2YGQZEIqUpebDyj9HDvCO6tocFV2NtGvNWmCklNFhIGy+1ObA/bF4zIzCDwXPM5kLcW39cdAmvxcty0ATH7YqCbuXbkZh946nHgMsEG3BEd44IpC6DSOFmBXz+HUKVTeUlQd1In45AJY67J7kQnpGcvzcDK75YPEpsQq7Nh2Z7PBm/QVPRM8zOEBVdPl+ix1kvS7zDnwxlfuJIUmBIVUPw4XpykBUhaiLkbhJsJSsAqgUEQbm/2NvkqlaFK79Bhi1x3sjUErwyCmq3W1J30fFP44qDl3tj+40lvuNaMkY2yu4mlg35fTI2l1SfYbjECZktIr6FgPbvXZslbv7Esk3N/cwpOZKebJpYzydKeIPOmk3i5zC6FsCtr+iZoX9OjUiGkZ+116ogsSZk9uWUH0WAIMVdCNfglfJjKR+JxqDUre4JU5ahpHcVkwIsgCvAdCc/q3e5P99A48DS7KGcM0L2J+il4yXSs58fkho5zlM+X5kg0tVXbkS5TOkTAHh6X1avNXrHdMqjnZXCpTpZN/9w2vfwMQEJWs6O/NnTh2c6VzNIzn3nA5CohIOwS2nuJ+YpBlEVrRtF3e/LvZPOEcbKUd5F/40EYhhn+fTc4kcEDla13WE2iN3vr8amwuzokb/dqH7eXif4G2zVGRP6T/rXQ110f+WMFbhHajBR+e1MMQ95eFPsNUuT/YfK771747aArjP41b6Umf0y+b4nkwY3hjzgdcsifUegZwZ+DQIf8qYckN+6Hx8tYDvlfOHTQ55BDDjnkkEMOOeSQQw455JBDDjnkkEMOOeS/kf8A4rQXLmCHPIYAAAAASUVORK5CYII=
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