1 | //#---------------------------------------------------------------------------
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2 | //# pks_maths.cc: Mathematical functions for Parkes single-dish data reduction
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3 | //#---------------------------------------------------------------------------
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4 | //# Copyright (C) 1994-2006
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5 | //# Associated Universities, Inc. Washington DC, USA.
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6 | //#
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7 | //# This library is free software; you can redistribute it and/or modify it
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8 | //# under the terms of the GNU Library General Public License as published by
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9 | //# the Free Software Foundation; either version 2 of the License, or (at your
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10 | //# option) any later version.
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11 | //#
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12 | //# This library is distributed in the hope that it will be useful, but WITHOUT
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13 | //# ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or
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14 | //# FITNESS FOR A PARTICULAR PURPOSE. See the GNU Library General Public
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15 | //# License for more details.
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16 | //#
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17 | //# You should have received a copy of the GNU Library General Public License
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18 | //# along with this library; if not, write to the Free Software Foundation,
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19 | //# Inc., 675 Massachusetts Ave, Cambridge, MA 02139, USA.
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20 | //#
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21 | //# Correspondence concerning AIPS++ should be addressed as follows:
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22 | //# Internet email: aips2-request@nrao.edu.
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23 | //# Postal address: AIPS++ Project Office
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24 | //# National Radio Astronomy Observatory
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25 | //# 520 Edgemont Road
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26 | //# Charlottesville, VA 22903-2475 USA
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27 | //#
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28 | //# Original: Mark Calabretta
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29 | //# $Id: pks_maths.cc,v 1.5 2006-05-19 00:12:35 mcalabre Exp $
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30 | //----------------------------------------------------------------------------
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31 |
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32 | // AIPS++ includes.
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33 | #include <casa/aips.h>
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34 | #include <casa/math.h>
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35 | #include <casa/Arrays/ArrayMath.h>
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36 | #include <casa/Arrays/Vector.h>
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37 | #include <casa/BasicSL/Constants.h>
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38 | #include <casa/Utilities/GenSort.h>
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39 |
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40 | // Parkes includes.
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41 | #include <atnf/pks/pks_maths.h>
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42 |
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43 |
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44 | //----------------------------------------------------------------------- nint
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45 |
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46 | // Nearest integral value; halfway cases are rounded to the integral value
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47 | // larger in value. No check is made for integer overflow.
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48 |
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49 | Int nint(Double v)
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50 | {
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51 | return Int(floor(v + 0.5));
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52 | }
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53 |
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54 | //---------------------------------------------------------------------- anint
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55 |
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56 | // Nearest integral value; halfway cases are rounded to the integral value
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57 | // larger in value.
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58 |
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59 | Double anint(Double v)
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60 | {
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61 | return floor(v + 0.5);
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62 | }
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63 |
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64 | //---------------------------------------------------------------------- round
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65 |
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66 | // Round value v to the nearest integral multiple of precision p.
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67 |
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68 | Double round(Double v, Double p)
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69 | {
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70 | return p * floor(v/p + 0.5);
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71 | }
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72 |
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73 | //--------------------------------------------------------------------- median
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74 |
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75 | // Compute the weighted median value of an array.
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76 |
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77 | Float median(const Vector<Float> &v, const Vector<Float> &wgt)
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78 | {
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79 | uInt nElem = v.nelements();
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80 | if (nElem == 0) return 0.0f;
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81 |
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82 | // Generate the sort index.
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83 | Vector<uInt> sortindex(nElem);
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84 | GenSortIndirect<Float>::sort(sortindex, v);
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85 |
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86 | // Find the middle weight.
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87 | Float wgt_2 = sum(wgt)/2.0f;
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88 |
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89 | // Find the corresponding vector element.
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90 | Float weight = 0.0f;
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91 | Float accwgt = 0.0f;
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92 | uInt j1 = 0;
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93 | uInt j2;
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94 | for (j2 = 0; j2 < nElem; j2++) {
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95 | weight = wgt(sortindex(j2));
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96 | if (weight == 0.0f) {
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97 | // Ignore zero-weight data;
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98 | continue;
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99 | }
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100 |
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101 | // The accumulated weight.
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102 | accwgt += weight;
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103 |
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104 | if (accwgt <= wgt_2) {
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105 | // Keep looping.
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106 | j1 = j2;
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107 | } else {
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108 | break;
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109 | }
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110 | }
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111 |
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112 | // Compute weighted median.
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113 | Float v1 = v(sortindex(j1));
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114 | Float v2 = v(sortindex(j2));
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115 |
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116 | // Compute pro-rata value from below.
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117 | Float dw = wgt_2 - (accwgt - weight);
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118 | v1 += (v2 - v1) * dw / weight;
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119 |
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120 | // Find next non-zero-weight value.
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121 | for (j2++ ; j2 < nElem; j2++) {
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122 | weight = wgt(sortindex(j2));
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123 | if (weight != 0.0f) {
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124 | break;
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125 | }
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126 | }
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127 |
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128 | if (j2 < nElem) {
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129 | // Compute pro-rata value from above.
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130 | Float v3 = v(sortindex(j2));
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131 |
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132 | v2 += (v3 - v2) * dw / weight;
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133 | }
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134 |
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135 | return (v1 + v2)/2.0f;
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136 | }
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137 |
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138 | //---------------------------------------------------------------- angularDist
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139 |
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140 | // Determine the angular distance between two directions (angles in radians).
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141 |
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142 | Double angularDist(Double lng0, Double lat0, Double lng, Double lat)
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143 | {
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144 | Double costheta = sin(lat0)*sin(lat) + cos(lat0)*cos(lat)*cos(lng0-lng);
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145 | return acos(costheta);
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146 | }
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147 |
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148 | //--------------------------------------------------------------------- distPA
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149 |
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150 | void distPA(Double lng0, Double lat0, Double lng, Double lat, Double &dist,
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151 | Double &pa)
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152 |
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153 | // Determine the generalized position angle of the field point (lng,lat) from
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154 | // the reference point (lng0,lat0) and the angular distance between them
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155 | // (angles in radians).
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156 |
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157 | {
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158 | // Euler angles which rotate the coordinate frame so that (lng0,lat0) is
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159 | // at the pole of the new system, with the pole of the old system at zero
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160 | // longitude in the new.
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161 | Double phi0 = C::pi_2 + lng0;
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162 | Double theta = C::pi_2 - lat0;
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163 | Double phi = -C::pi_2;
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164 |
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165 | // Rotate the field point to the new system.
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166 | Double alpha, beta;
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167 | eulerx(lng, lat, phi0, theta, phi, alpha, beta);
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168 |
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169 | dist = C::pi_2 - beta;
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170 | pa = -alpha;
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171 | if (pa < -C::pi) pa = pa + C::_2pi;
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172 | }
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173 |
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174 | //--------------------------------------------------------------------- eulerx
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175 |
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176 | void eulerx(Double lng0, Double lat0, Double phi0, Double theta, Double phi,
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177 | Double &lng1, Double &lat1)
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178 |
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179 | // Applies the Euler angle based transformation of spherical coordinates.
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180 | //
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181 | // phi0 Longitude of the ascending node in the old system, radians. The
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182 | // ascending node is the point of intersection of the equators of
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183 | // the two systems such that the equator of the new system crosses
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184 | // from south to north as viewed in the old system.
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185 | //
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186 | // theta Angle between the poles of the two systems, radians. THETA is
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187 | // positive for a positive rotation about the ascending node.
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188 | //
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189 | // phi Longitude of the ascending node in the new system, radians.
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190 |
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191 | {
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192 | // Compute intermediaries.
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193 | Double lng0p = lng0 - phi0;
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194 | Double slng0p = sin(lng0p);
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195 | Double clng0p = cos(lng0p);
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196 | Double slat0 = sin(lat0);
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197 | Double clat0 = cos(lat0);
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198 | Double ctheta = cos(theta);
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199 | Double stheta = sin(theta);
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200 |
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201 | Double x = clat0*clng0p;
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202 | Double y = clat0*slng0p*ctheta + slat0*stheta;
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203 |
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204 | // Longitude in the new system.
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205 | if (x != 0.0 || y != 0.0) {
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206 | lng1 = phi + atan2(y, x);
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207 | } else {
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208 | // Longitude at the poles in the new system is consistent with that
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209 | // specified in the old system.
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210 | lng1 = phi + lng0p;
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211 | }
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212 | lng1 = fmod(lng1, C::_2pi);
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213 | if (lng1 < 0.0) lng1 += C::_2pi;
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214 |
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215 | lat1 = asin(slat0*ctheta - clat0*stheta*slng0p);
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216 | }
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217 |
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218 | //------------------------------------------------------------------------ sol
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219 |
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220 | // Low precision coordinates of the Sun (accurate to 1 arcmin between 1800 and
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221 | // 2200) from http://aa.usno.navy.mil/faq/docs/SunApprox.html matches closely
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222 | // that in the Astronomical Almanac.
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223 |
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224 | void sol(Double mjd, Double &elng, Double &ra, Double &dec)
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225 | {
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226 | Double d2r = C::pi/180.0;
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227 |
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228 | // Number of days since J2000.0.
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229 | Double d = mjd - 51544.5;
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230 |
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231 | // Mean longitude and mean anomaly of the Sun (deg).
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232 | Double L = 280.459 + 0.98564736*d;
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233 | Double g = 357.529 + 0.98560028*d;
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234 |
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235 | // Apparent ecliptic longitude corrected for aberration (deg).
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236 | g *= d2r;
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237 | elng = L + 1.915*sin(g) + 0.020*sin(g+g);
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238 | elng = fmod(elng, 360.0);
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239 | if (elng < 0.0) elng += 360.0;
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240 |
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241 | // Obliquity of the ecliptic (deg).
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242 | Double epsilon = 23.439 - 0.00000036*d;
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243 |
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244 | // Transform ecliptic to equatorial coordinates.
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245 | elng *= d2r;
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246 | epsilon *= d2r;
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247 | ra = atan2(cos(epsilon)*sin(elng), cos(elng));
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248 | dec = asin(sin(epsilon)*sin(elng));
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249 | if (ra < 0.0) ra += C::_2pi;
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250 | }
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251 |
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252 | //------------------------------------------------------------------------ gst
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253 |
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254 | // Greenwich mean sidereal time, and low precision Greenwich apparent sidereal
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255 | // time, both in radian, from http://aa.usno.navy.mil/faq/docs/GAST.html. UT1
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256 | // is given in MJD form.
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257 |
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258 | void gst(Double ut1, Double &gmst, Double &gast)
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259 | {
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260 | Double d2r = C::pi/180.0;
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261 |
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262 | Double d = ut1 - 51544.5;
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263 | Double d0 = int(ut1) - 51544.5;
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264 | Double h = 24.0*(d - d0);
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265 | Double t = d / 35625.0;
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266 |
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267 | // GMST (hr).
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268 | gmst = 6.697374558 + 0.06570982441908*d0 + 1.00273790935*h + 0.000026*t*t;
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269 | gmst = fmod(gmst, 24.0);
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270 |
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271 | // Longitude of the ascending node of the Moon (deg).
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272 | Double Omega = 125.04 - 0.052954*d;
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273 |
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274 | // Mean Longitude of the Sun (deg).
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275 | Double L = 280.47 + 0.98565*d;
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276 |
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277 | // Obliquity of the ecliptic (deg).
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278 | Double epsilon = 23.4393 - 0.0000004*d;
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279 |
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280 | // Approximate nutation in longitude (hr).
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281 | Double dpsi = -0.000319*sin(Omega*d2r) - 0.000024*sin((L+L)*d2r);
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282 |
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283 | // Equation of the equinoxes (hr).
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284 | Double eqeq = dpsi*cos(epsilon*d2r);
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285 |
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286 | // GAST (hr).
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287 | gast = gmst + eqeq;
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288 | gast = fmod(gast, 24.0);
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289 |
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290 | // Convert to radian.
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291 | gmst *= C::pi/12.0;
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292 | gast *= C::pi/12.0;
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293 | }
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294 |
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295 | //----------------------------------------------------------------------- azel
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296 |
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297 | // Convert (ra,dec) to (az,el), from
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298 | // http://aa.usno.navy.mil/faq/docs/Alt_Az.html. Position as a Cartesian
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299 | // triplet in m, UT1 in MJD form, and all angles in radian.
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300 |
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301 | void azel(const Vector<Double> position, Double ut1, Double ra, Double dec,
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302 | Double &az, Double &el)
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303 | {
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304 | // Get gocentric longitude and latitude (rad).
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305 | Double x = position(0);
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306 | Double y = position(1);
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307 | Double z = position(2);
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308 | Double r = sqrt(x*x + y*y + z*z);
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309 | Double lng = atan2(y, x);
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310 | Double lat = asin(z/r);
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311 |
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312 | // Get GAST (rad).
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313 | Double gast, gmst;
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314 | gst(ut1, gmst, gast);
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315 |
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316 | // Local hour angle (rad).
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317 | Double ha = (gast + lng) - ra;
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318 |
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319 | // Azimuth and elevation (rad).
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320 | az = atan2(cos(dec)*sin(ha), cos(dec)*sin(lat)*cos(ha) - sin(dec)*cos(lat));
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321 | if (az < 0.0) az += C::_2pi;
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322 | el = asin(cos(dec)*cos(lat)*cos(ha) + sin(dec)*sin(lat));
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323 | }
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324 |
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325 | //---------------------------------------------------------------------- solel
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326 |
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327 | // Compute the Solar elevation using the above functions.
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328 |
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329 | Double solel(const Vector<Double> position, Double ut1)
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330 | {
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331 | Double az, dec, el, elng, gast, gmst, ra;
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332 | sol(ut1, elng, ra, dec);
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333 | gst(ut1, gmst, gast);
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334 | azel(position, ut1, ra, dec, az, el);
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335 | return el;
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336 | }
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