1 | !> @file src/transform.f90 |
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2 | !------------------------------------------------------------------------------! |
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3 | ! This file is part of the PALM model system. |
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4 | ! |
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5 | ! PALM is free software: you can redistribute it and/or modify it under the |
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6 | ! terms of the GNU General Public License as published by the Free Software |
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7 | ! Foundation, either version 3 of the License, or (at your option) any later |
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8 | ! version. |
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9 | ! |
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10 | ! PALM is distributed in the hope that it will be useful, but WITHOUT ANY |
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11 | ! WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR |
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12 | ! A PARTICULAR PURPOSE. See the GNU General Public License for more details. |
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13 | ! |
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14 | ! You should have received a copy of the GNU General Public License along with |
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15 | ! PALM. If not, see <http://www.gnu.org/licenses/>. |
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16 | ! |
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17 | ! Copyright 2017-2018 Leibniz Universitaet Hannover |
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18 | ! Copyright 2017-2018 Deutscher Wetterdienst Offenbach |
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19 | !------------------------------------------------------------------------------! |
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20 | ! |
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21 | ! Current revisions: |
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22 | ! ----------------- |
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23 | ! |
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24 | ! |
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25 | ! Former revisions: |
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26 | ! ----------------- |
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27 | ! $Id: transform.f90 2718 2018-01-02 08:49:38Z sward $ |
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28 | ! Initial revision |
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29 | ! |
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30 | ! |
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31 | ! |
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32 | ! Authors: |
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33 | ! -------- |
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34 | ! @author Eckhard Kadasch |
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35 | ! |
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36 | ! Description: |
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37 | ! ------------ |
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38 | !> The transform module provides INIFOR's low-level transformation and |
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39 | !> interpolation routines. The rotated-pole transformation routines phirot2phi, |
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40 | !> phi2phirot, rlarot2rla, rla2rlarot, uv2uvrot, and uvrot2uv are adapted from |
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41 | !> int2lm's utility routines. |
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42 | !------------------------------------------------------------------------------! |
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43 | MODULE transform |
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44 | |
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45 | USE control |
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46 | USE defs, & |
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47 | ONLY: TO_DEGREES, TO_RADIANS, PI, dp |
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48 | USE types |
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49 | USE util, & |
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50 | ONLY: real_to_str, str |
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51 | |
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52 | IMPLICIT NONE |
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53 | |
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54 | CONTAINS |
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55 | |
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56 | !------------------------------------------------------------------------------! |
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57 | ! Description: |
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58 | ! ------------ |
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59 | !> Interpolates linearly in the vertical direction in very column (i,j) of the |
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60 | !> output array outvar(i,j,:) using values of the source array invar. In cells |
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61 | !> that are outside the COSMO-DE domain, indicated by negative interpolation |
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62 | !> weights, extrapolate constantly from the cell above. |
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63 | !> |
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64 | !> Input parameters: |
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65 | !> ----------------- |
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66 | !> invar : Array of source data |
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67 | !> |
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68 | !> outgrid % kk : Array of vertical neighbour indices. kk(i,j,k,:) contain the |
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69 | !> indices of the two vertical neighbors of PALM-4U point (i,j,k) on the |
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70 | !> input grid corresponding to the source data invar. |
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71 | !> |
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72 | !> outgrid % w_verti : Array of weights for vertical linear interpolation |
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73 | !> corresponding to neighbour points indexed by kk. |
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74 | !> |
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75 | !> Output papameters: |
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76 | !> ------------------ |
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77 | !> outvar : Array of interpolated data |
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78 | !------------------------------------------------------------------------------! |
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79 | SUBROUTINE interpolate_1d(in_arr, out_arr, outgrid) |
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80 | TYPE(grid_definition), INTENT(IN) :: outgrid |
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81 | REAL(dp), INTENT(IN) :: in_arr(0:,0:,0:) |
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82 | REAL(dp), INTENT(OUT) :: out_arr(0:,0:,0:) |
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83 | |
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84 | INTEGER :: i, j, k, l, nx, ny, nz |
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85 | |
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86 | nx = UBOUND(out_arr, 1) |
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87 | ny = UBOUND(out_arr, 2) |
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88 | nz = UBOUND(out_arr, 3) |
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89 | |
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90 | DO j = 0, ny |
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91 | DO i = 0, nx |
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92 | DO k = nz, 0, -1 |
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93 | |
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94 | ! TODO: Remove IF clause and extrapolate based on a critical vertical |
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95 | ! TODO: index marking the lower bound of COSMO-DE data coverage. |
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96 | ! Check for negative interpolation weights indicating grid points |
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97 | ! below COSMO-DE domain and extrapolate from the top in such cells. |
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98 | IF (outgrid % w_verti(i,j,k,1) < -1.0_dp .AND. k < nz) THEN |
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99 | out_arr(i,j,k) = out_arr(i,j,k+1) |
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100 | ELSE |
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101 | out_arr(i,j,k) = 0.0_dp |
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102 | DO l = 1, 2 |
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103 | out_arr(i,j,k) = out_arr(i,j,k) + & |
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104 | outgrid % w_verti(i,j,k,l) * & |
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105 | in_arr(i,j,outgrid % kk(i,j,k, l) ) |
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106 | END DO |
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107 | END IF |
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108 | END DO |
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109 | END DO |
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110 | END DO |
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111 | END SUBROUTINE interpolate_1d |
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112 | |
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113 | |
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114 | !------------------------------------------------------------------------------! |
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115 | ! Description: |
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116 | ! ------------ |
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117 | !> Interpolates bi-linearly in horizontal planes on every k level of the output |
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118 | !> array outvar(:,:,k) using values of the source array invar(:,:,:). The source |
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119 | !> (invar) and interpolation array (outvar) need to have matching dimensions. |
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120 | !> |
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121 | !> Input parameters: |
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122 | !> ----------------- |
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123 | !> invar : Array of source data |
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124 | !> |
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125 | !> outgrid % ii, % jj : Array of neighbour indices in x and y direction. |
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126 | !> ii(i,j,k,:), and jj(i,j,k,:) contain the four horizontal neighbour points |
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127 | !> of PALM-4U point (i,j,k) on the input grid corresponding to the source |
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128 | !> data invar. (The outgrid carries the relationship with the ingrid in the |
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129 | ! form of the interpoaltion weights.) |
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130 | !> |
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131 | !> outgrid % w_horiz: Array of weights for horizontal bi-linear interpolation |
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132 | !> corresponding to neighbour points indexed by ii and jj. |
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133 | !> |
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134 | !> Output papameters: |
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135 | !> ------------------ |
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136 | !> outvar : Array of interpolated data |
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137 | !------------------------------------------------------------------------------! |
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138 | SUBROUTINE interpolate_2d(invar, outvar, outgrid, ncvar) |
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139 | ! I index 0-based for the indices of the outvar to be consistent with the |
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140 | ! outgrid indices and interpolation weights. |
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141 | TYPE(grid_definition), INTENT(IN) :: outgrid |
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142 | REAL(dp), INTENT(IN) :: invar(0:,0:,0:) |
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143 | REAL(dp), INTENT(OUT) :: outvar(0:,0:,0:) |
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144 | TYPE(nc_var), INTENT(IN), OPTIONAL :: ncvar |
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145 | |
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146 | INTEGER :: i, j, k, l |
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147 | |
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148 | ! TODO: check if input dimensions are consistent, i.e. ranges are correct |
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149 | IF (UBOUND(outvar, 3) .GT. UBOUND(invar, 3)) THEN |
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150 | message = "Output array for '" // TRIM(ncvar % name) // "' has ' more levels (" // & |
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151 | TRIM(str(UBOUND(outvar, 3))) // ") than input variable ("//& |
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152 | TRIM(str(UBOUND(invar, 3))) // ")." |
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153 | CALL abort('interpolate_2d', message) |
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154 | END IF |
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155 | |
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156 | DO k = 0, UBOUND(outvar, 3) |
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157 | DO j = 0, UBOUND(outvar, 2) |
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158 | DO i = 0, UBOUND(outvar, 1) |
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159 | outvar(i,j,k) = 0.0_dp |
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160 | DO l = 1, 4 |
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161 | |
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162 | outvar(i,j,k) = outvar(i,j,k) + & |
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163 | outgrid % w_horiz(i,j,l) * invar( outgrid % ii(i,j,l), & |
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164 | outgrid % jj(i,j,l), & |
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165 | k ) |
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166 | END DO |
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167 | END DO |
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168 | END DO |
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169 | END DO |
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170 | |
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171 | END SUBROUTINE interpolate_2d |
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172 | |
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173 | |
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174 | SUBROUTINE average_2d(in_arr, out_arr, imin, imax, jmin, jmax) |
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175 | REAL(dp), INTENT(IN) :: in_arr(0:,0:,0:) |
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176 | REAL(dp), INTENT(OUT) :: out_arr(0:) |
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177 | INTEGER, INTENT(IN) :: imin, imax, jmin, jmax |
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178 | |
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179 | INTEGER :: i, j, k |
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180 | REAL(dp) :: ni |
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181 | |
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182 | IF (imin < 0) CALL abort('average_2d', "imin < 0.") |
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183 | IF (jmin < 0) CALL abort('average_2d', "jmin < 0.") |
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184 | IF (imax > UBOUND(in_arr, 1)) CALL abort('average_2d', "imax out of i bound.") |
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185 | IF (jmax > UBOUND(in_arr, 2)) CALL abort('average_2d', "jmax out of j bound.") |
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186 | |
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187 | DO k = 0, UBOUND(out_arr, 1) |
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188 | |
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189 | out_arr(k) = 0.0_dp |
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190 | DO j = jmin, jmax |
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191 | DO i = imin, imax |
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192 | out_arr(k) = out_arr(k) + in_arr(i, j, k) |
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193 | END DO |
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194 | END DO |
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195 | |
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196 | END DO |
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197 | |
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198 | ! devide by number of grid points |
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199 | ni = 1.0_dp / ( (imax - imin + 1) * (jmax - jmin + 1) ) |
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200 | out_arr(:) = out_arr(:) * ni |
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201 | |
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202 | END SUBROUTINE average_2d |
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203 | |
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204 | |
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205 | SUBROUTINE interpolate_3d(source_array, palm_array, palm_intermediate, palm_grid) |
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206 | TYPE(grid_definition), INTENT(IN) :: palm_intermediate, palm_grid |
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207 | REAL(dp), DIMENSION(:,:,:), INTENT(IN) :: source_array |
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208 | REAL(dp), DIMENSION(:,:,:), INTENT(OUT) :: palm_array |
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209 | REAL(dp), DIMENSION(:,:,:), ALLOCATABLE :: intermediate_array |
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210 | INTEGER :: nx, ny, nz |
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211 | |
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212 | nx = palm_intermediate % nx |
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213 | ny = palm_intermediate % ny |
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214 | nz = palm_intermediate % nz ! nlev |
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215 | |
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216 | ! Interpolate from COSMO-DE to intermediate grid. Allocating with one |
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217 | ! less point in the vertical, since scalars like T have 50 instead of 51 |
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218 | ! points in COSMO-DE. |
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219 | ALLOCATE(intermediate_array(0:nx, 0:ny, 0:nz-1)) ! |
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220 | |
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221 | CALL interpolate_2d(source_array, intermediate_array, palm_intermediate) |
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222 | |
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223 | ! Interpolate from intermediate grid to palm_grid grid, includes |
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224 | ! extrapolation for cells below COSMO-DE domain. |
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225 | CALL interpolate_1d(intermediate_array, palm_array, palm_grid) |
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226 | |
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227 | DEALLOCATE(intermediate_array) |
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228 | |
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229 | END SUBROUTINE interpolate_3d |
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230 | |
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231 | |
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232 | SUBROUTINE average_profile(source_array, profile_array, imin, imax, jmin, jmax,& |
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233 | palm_intermediate, palm_grid) |
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234 | TYPE(grid_definition), INTENT(IN) :: palm_intermediate, palm_grid |
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235 | REAL(dp), DIMENSION(:,:,:), INTENT(IN) :: source_array |
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236 | INTEGER, INTENT(IN) :: imin, imax, jmin, jmax |
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237 | REAL(dp), DIMENSION(0:,0:,0:), INTENT(OUT) :: profile_array |
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238 | REAL(dp), DIMENSION(:,:,:), ALLOCATABLE :: intermediate_array |
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239 | INTEGER :: nx, ny, nz |
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240 | |
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241 | nx = palm_intermediate % nx |
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242 | ny = palm_intermediate % ny |
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243 | nz = palm_intermediate % nz |
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244 | ALLOCATE(intermediate_array(0:nx, 0:ny, 0:nz-1)) |
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245 | intermediate_array(:,:,:) = 0.0_dp |
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246 | |
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247 | ! average input array to intermediate profile |
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248 | CALL average_2d(source_array, intermediate_array(0,0,:), imin, imax, jmin, jmax) |
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249 | |
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250 | ! vertically interpolate to ouput array |
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251 | CALL interpolate_1d(intermediate_array, profile_array, palm_grid) |
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252 | |
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253 | DEALLOCATE(intermediate_array) |
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254 | |
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255 | END SUBROUTINE average_profile |
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256 | |
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257 | |
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258 | |
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259 | !-----------------------------------------------------------------------------! |
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260 | ! Description: |
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261 | ! ----------- |
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262 | !> This routine computes the inverse Plate Carree projection, i.e. in projects |
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263 | !> Cartesian coordinates (x,y) onto a sphere. It returns the latitude and |
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264 | !> lngitude of a geographical system centered at x0 and y0. |
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265 | !-----------------------------------------------------------------------------! |
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266 | SUBROUTINE inv_plate_carree(x, y, x0, y0, r, lat, lon) |
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267 | REAL(dp), INTENT(IN) :: x(:), y(:), x0, y0, r |
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268 | REAL(dp), INTENT(OUT) :: lat(:), lon(:) |
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269 | |
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270 | REAL(dp) :: ri |
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271 | |
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272 | ! TODO check dimensions of lat/lon and y/x match |
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273 | |
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274 | ri = 1.0_dp / r |
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275 | |
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276 | lat(:) = (y(:) - y0) * ri |
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277 | lon(:) = (x(:) - x0) * ri |
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278 | END SUBROUTINE |
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279 | |
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280 | |
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281 | !-----------------------------------------------------------------------------! |
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282 | ! Description: |
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283 | ! ------------ |
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284 | !> Computes the reverse Plate-Carree projection of a x or y position on a |
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285 | !> Cartesian grid. |
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286 | !> |
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287 | !> Input parameters: |
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288 | !> ----------------- |
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289 | !> xy : x or y coordinate of the Cartasian grid point [m]. |
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290 | !> |
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291 | !> xy0 : x or y coordinate that coincides with the origin of the underlying |
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292 | !> sperical system (crossing point of the equator and prime meridian) [m]. |
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293 | !> |
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294 | !> r : Radius of the of the underlying sphere, e.g. EARTH_RADIUS [m]. |
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295 | !> |
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296 | !> Returns: |
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297 | !> -------- |
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298 | !> project : Longitude (in case xy = x) or latitude (xy = y) of the given input |
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299 | !> coordinate xy. |
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300 | !------------------------------------------------------------------------------! |
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301 | ELEMENTAL REAL(dp) FUNCTION project(xy, xy0, r) |
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302 | REAL(dp), INTENT(IN) :: xy, xy0, r |
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303 | REAL(dp) :: ri |
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304 | |
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305 | ! If this elemental function is called with a large array as xy, it is |
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306 | ! computationally more efficient to precompute the inverse radius and |
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307 | ! then muliply. |
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308 | ri = 1.0_dp / r |
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309 | |
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310 | project = (xy - xy0) * ri |
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311 | |
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312 | END FUNCTION project |
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313 | |
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314 | |
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315 | REAL(dp) FUNCTION phic_to_phin(phi_c) |
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316 | REAL(dp), INTENT(IN) :: phi_c |
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317 | |
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318 | phic_to_phin = 0.5_dp * PI - ABS(phi_c) |
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319 | |
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320 | END FUNCTION phic_to_phin |
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321 | |
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322 | |
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323 | REAL(dp) FUNCTION lamc_to_lamn(phi_c, lam_c) |
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324 | REAL(dp), INTENT(IN) :: phi_c, lam_c |
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325 | |
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326 | lamc_to_lamn = lam_c |
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327 | IF (phi_c > 0.0_dp) THEN |
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328 | lamc_to_lamn = lam_c - SIGN(PI, lam_c) |
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329 | END IF |
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330 | |
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331 | END FUNCTION lamc_to_lamn |
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332 | |
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333 | |
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334 | REAL(dp) FUNCTION gamma_from_hemisphere(phi_cg, phi_ref) |
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335 | REAL(dp), INTENT(IN) :: phi_cg, phi_ref |
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336 | LOGICAL :: palm_centre_is_south_of_cosmo_origin |
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337 | |
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338 | palm_centre_is_south_of_cosmo_origin = (phi_cg < phi_ref) |
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339 | |
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340 | IF (palm_centre_is_south_of_cosmo_origin) THEN |
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341 | gamma_from_hemisphere = PI |
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342 | ELSE |
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343 | gamma_from_hemisphere = 0.0_dp |
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344 | END IF |
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345 | END FUNCTION gamma_from_hemisphere |
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346 | |
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347 | |
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348 | !------------------------------------------------------------------------------! |
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349 | ! Description: |
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350 | ! ------------ |
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351 | !> Computes the geographical coordinates corresponding to the given rotated-pole |
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352 | !> coordinates. |
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353 | !> |
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354 | !> In INIFOR, this routine is used to convert coordinates between two |
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355 | !> rotated-pole systems: COSMO-DE's rotated-pole system, and one centred at the |
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356 | !> PALM-4U domain centre. In this case, the PALM-4U system is thought of as the |
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357 | !> rotated-pole system and the routine is used to rotate back to COSMO-DE's |
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358 | !> system which is thought of as the geographical one. |
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359 | !> |
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360 | !> Input parameters: |
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361 | !> ----------------- |
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362 | !> phir(:), lamr(: ): latitudes and longitudes of the rotated-pole grid |
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363 | !> |
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364 | !> phip, lamp: latitude and longitude of the rotated north pole |
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365 | !> |
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366 | !> gam: "angle between the north poles. If [gam] is not present, the other |
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367 | !> system is the real geographical system." (original phiro2rot |
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368 | !> description) |
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369 | !> |
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370 | !> Output parameters: |
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371 | !> ------------------ |
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372 | !> phi(:,:), lam(:,:): geographical latitudes and logitudes |
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373 | !------------------------------------------------------------------------------! |
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374 | SUBROUTINE rotate_to_cosmo(phir, lamr, phip, lamp, phi, lam, gam) |
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375 | REAL(dp), INTENT(IN) :: phir(0:), lamr(0:), phip, lamp, gam |
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376 | REAL(dp), INTENT(OUT) :: phi(0:,0:), lam(0:,0:) |
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377 | |
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378 | INTEGER :: i, j |
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379 | |
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380 | IF ( SIZE(phi, 1) .NE. SIZE(lam, 1) .OR. & |
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381 | SIZE(phi, 2) .NE. SIZE(lam, 2) ) THEN |
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382 | PRINT *, "inifor: rotate_to_cosmo: Dimensions of phi and lambda do not match. Dimensions are:" |
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383 | PRINT *, "inifor: rotate_to_cosmo: phi: ", SIZE(phi, 1), SIZE(phi, 2) |
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384 | PRINT *, "inifor: rotate_to_cosmo: lam: ", SIZE(lam, 1), SIZE(lam, 2) |
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385 | STOP |
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386 | END IF |
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387 | |
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388 | IF ( SIZE(phir) .NE. SIZE(phi, 2) .OR. & |
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389 | SIZE(lamr) .NE. SIZE(phi, 1) ) THEN |
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390 | PRINT *, "inifor: rotate_to_cosmo: Dimensions of phir and lamr do not match. Dimensions are:" |
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391 | PRINT *, "inifor: rotate_to_cosmo: phir: ", SIZE(phir), SIZE(phi, 2) |
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392 | PRINT *, "inifor: rotate_to_cosmo: lamr: ", SIZE(lamr), SIZE(phi, 1) |
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393 | STOP |
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394 | END IF |
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395 | |
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396 | DO j = 0, UBOUND(phir, 1) |
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397 | DO i = 0, UBOUND(lamr, 1) |
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398 | |
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399 | phi(i,j) = phirot2phi(phir(j) * TO_DEGREES, & |
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400 | lamr(i) * TO_DEGREES, & |
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401 | phip * TO_DEGREES, & |
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402 | lamp * TO_DEGREES, & |
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403 | gam * TO_DEGREES) * TO_RADIANS |
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404 | |
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405 | lam(i,j) = rlarot2rla(phir(j) * TO_DEGREES, & |
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406 | lamr(i) * TO_DEGREES, & |
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407 | phip * TO_DEGREES, & |
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408 | lamp * TO_DEGREES, & |
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409 | gam * TO_DEGREES) * TO_RADIANS |
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410 | |
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411 | END DO |
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412 | END DO |
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413 | |
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414 | END SUBROUTINE rotate_to_cosmo |
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415 | |
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416 | |
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417 | !------------------------------------------------------------------------------! |
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418 | ! Description: |
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419 | ! ------------ |
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420 | !> Compute indices of PALM-4U grid point neighbours in the target |
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421 | !> system (COSMO-DE) by rounding up and down. (i,j) are the indices of |
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422 | !> the PALM-4U grid and (ii(i,j,1-4), jj(i,j,1-4)) contain the indices |
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423 | !> of the its four neigbouring points in the COSMO-DE grid. |
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424 | !> |
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425 | !> |
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426 | !> COSMO-DE grid |
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427 | !> ------------- |
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428 | !> jj, lat |
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429 | !> ^ j |
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430 | !> | \ i |
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431 | !> jj(i,j,2/3) + ... 2 ---\--------/------ 3 |
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432 | !> | | ^ \ / | |
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433 | !> | | |wp \ / | |
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434 | !> | | v \ / | |
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435 | !> latpos + ............ o/ (i,j) | |
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436 | !> | | : | |
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437 | !> | | :<----wl---->| |
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438 | !> jj(i,j,1/4) + ... 1 -------:----------- 4 |
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439 | !> | : : : |
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440 | !> | : : : |
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441 | !> | : lonpos : |
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442 | !> L-----+--------+------------+------> ii, lon |
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443 | !> ii(i,j,1/2) ii(i,j,3/4) |
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444 | !> |
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445 | !> |
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446 | !> Input parameters: |
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447 | !> ----------------- |
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448 | !> source_lat, source_lon : (rotated-pole) coordinates of the source grid (e.g. |
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449 | !> COSMO-DE) |
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450 | !> |
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451 | !> source_dxi, source_dyi : inverse grid spacings of the source grid. |
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452 | !> |
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453 | !> target_lat, target_lon : (rotated-pole) coordinates of the target grid (e.g. |
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454 | !> COSMO-DE) |
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455 | !> |
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456 | !> Output parameters: |
---|
457 | !> ------------------ |
---|
458 | !> palm_ii, palm_jj : x and y index arrays of horizontal neighbour columns |
---|
459 | !> |
---|
460 | !------------------------------------------------------------------------------! |
---|
461 | SUBROUTINE find_horizontal_neighbours(cosmo_lat, cosmo_lon, cosmo_dxi, & |
---|
462 | cosmo_dyi, palm_clat, palm_clon, palm_ii, palm_jj) |
---|
463 | |
---|
464 | REAL(dp), DIMENSION(0:), INTENT(IN) :: cosmo_lat, cosmo_lon |
---|
465 | REAL(dp), DIMENSION(0:,0:), INTENT(IN) :: palm_clat, palm_clon |
---|
466 | REAL(dp), INTENT(IN) :: cosmo_dxi, cosmo_dyi |
---|
467 | INTEGER, DIMENSION(0:,0:,1:), INTENT(OUT) :: palm_ii, palm_jj |
---|
468 | |
---|
469 | REAL(dp) :: lonpos, latpos, lon0, lat0 |
---|
470 | INTEGER :: i, j |
---|
471 | |
---|
472 | lon0 = cosmo_lon(0) |
---|
473 | lat0 = cosmo_lat(0) |
---|
474 | |
---|
475 | DO j = 0, UBOUND(palm_clon, 2)!palm_grid % ny |
---|
476 | DO i = 0, UBOUND(palm_clon, 1)!palm_grid % nx |
---|
477 | ! Compute the floating point index corrseponding to PALM-4U grid point |
---|
478 | ! location along target grid (COSMO-DE) axes. |
---|
479 | lonpos = (palm_clon(i,j) - lon0) * cosmo_dxi |
---|
480 | latpos = (palm_clat(i,j) - lat0) * cosmo_dyi |
---|
481 | |
---|
482 | IF (lonpos < 0.0 .OR. latpos < 0.0) THEN |
---|
483 | PRINT *, " Error while finding neighbours: lonpos or latpos out of bounds!" |
---|
484 | PRINT *, " (i,j) = (", i, ",",j,")" |
---|
485 | PRINT *, " lonpos ", lonpos*TO_DEGREES, ", latpos ", latpos*TO_DEGREES |
---|
486 | PRINT *, " lon0 ", lon0 *TO_DEGREES, ", lat0 ", lat0*TO_DEGREES |
---|
487 | PRINT *, " PALM lon ", palm_clon(i,j)*TO_DEGREES, ", PALM lat ",palm_clat(i,j)*TO_DEGREES |
---|
488 | STOP |
---|
489 | END IF |
---|
490 | |
---|
491 | palm_ii(i,j,1) = FLOOR(lonpos) |
---|
492 | palm_ii(i,j,2) = FLOOR(lonpos) |
---|
493 | palm_ii(i,j,3) = CEILING(lonpos) |
---|
494 | palm_ii(i,j,4) = CEILING(lonpos) |
---|
495 | |
---|
496 | palm_jj(i,j,1) = FLOOR(latpos) |
---|
497 | palm_jj(i,j,2) = CEILING(latpos) |
---|
498 | palm_jj(i,j,3) = CEILING(latpos) |
---|
499 | palm_jj(i,j,4) = FLOOR(latpos) |
---|
500 | END DO |
---|
501 | END DO |
---|
502 | |
---|
503 | END SUBROUTINE find_horizontal_neighbours |
---|
504 | |
---|
505 | |
---|
506 | SUBROUTINE find_vertical_neighbours_and_weights(palm_grid, palm_intermediate) |
---|
507 | TYPE(grid_definition), INTENT(INOUT) :: palm_grid |
---|
508 | TYPE(grid_definition), INTENT(IN) :: palm_intermediate |
---|
509 | |
---|
510 | INTEGER :: i, j, k, nx, ny, nz, nlev, kcur |
---|
511 | LOGICAL :: point_is_below_grid, point_is_above_grid, & |
---|
512 | point_is_in_current_cell |
---|
513 | REAL(dp) :: current_height, column_base, column_top, h_top, h_bottom, & |
---|
514 | weight |
---|
515 | |
---|
516 | nx = palm_grid % nx |
---|
517 | ny = palm_grid % ny |
---|
518 | nz = palm_grid % nz |
---|
519 | nlev = palm_intermediate % nz |
---|
520 | |
---|
521 | ! in each column of the fine grid, find vertical neighbours of every cell |
---|
522 | DO i = 0, nx |
---|
523 | DO j = 0, ny |
---|
524 | |
---|
525 | kcur = 0 |
---|
526 | |
---|
527 | column_base = palm_intermediate % h(i,j,0) |
---|
528 | column_top = palm_intermediate % h(i,j,nlev) |
---|
529 | |
---|
530 | ! scan through palm_grid column until and set neighbour indices in |
---|
531 | ! case current_height is either below column_base, in the current |
---|
532 | ! cell, or above column_top. Keep increasing current cell index until |
---|
533 | ! the current cell overlaps with the current_height. |
---|
534 | DO k = 0, nz |
---|
535 | |
---|
536 | ! Memorize the top and bottom boundaries of the coarse cell and the |
---|
537 | ! current height within it |
---|
538 | current_height = palm_grid % z(k) + palm_grid % z0 |
---|
539 | h_top = palm_intermediate % h(i,j,kcur+1) |
---|
540 | h_bottom = palm_intermediate % h(i,j,kcur) |
---|
541 | |
---|
542 | point_is_above_grid = (current_height > column_top) !22000m, very unlikely |
---|
543 | point_is_below_grid = (current_height < column_base) |
---|
544 | |
---|
545 | point_is_in_current_cell = ( & |
---|
546 | current_height >= h_bottom .AND. & |
---|
547 | current_height < h_top & |
---|
548 | ) |
---|
549 | |
---|
550 | ! set default weights |
---|
551 | palm_grid % w_verti(i,j,k,1:2) = 0.0_dp |
---|
552 | |
---|
553 | IF (point_is_above_grid) THEN |
---|
554 | |
---|
555 | palm_grid % kk(i,j,k,1:2) = nlev |
---|
556 | palm_grid % w_verti(i,j,k,1:2) = - 2.0_dp |
---|
557 | |
---|
558 | ELSE IF (point_is_below_grid) THEN |
---|
559 | |
---|
560 | palm_grid % kk(i,j,k,1:2) = 0 |
---|
561 | palm_grid % w_verti(i,j,k,1:2) = - 2.0_dp |
---|
562 | |
---|
563 | ELSE |
---|
564 | ! cycle through intermediate levels until current |
---|
565 | ! intermediate-grid cell overlaps with current_height |
---|
566 | DO WHILE (.NOT. point_is_in_current_cell .AND. kcur <= nlev-1) |
---|
567 | kcur = kcur + 1 |
---|
568 | |
---|
569 | h_top = palm_intermediate % h(i,j,kcur+1) |
---|
570 | h_bottom = palm_intermediate % h(i,j,kcur) |
---|
571 | point_is_in_current_cell = ( & |
---|
572 | current_height >= h_bottom .AND. & |
---|
573 | current_height < h_top & |
---|
574 | ) |
---|
575 | END DO |
---|
576 | |
---|
577 | ! kcur = 48 indicates the last section (indices 48 and 49), i.e. |
---|
578 | ! kcur = 49 is not the beginning of a valid cell. |
---|
579 | IF (kcur > nlev-1) THEN |
---|
580 | message = "Index " // TRIM(str(kcur)) // " is above intermediate grid range." |
---|
581 | CALL abort('find_vertical_neighbours', message) |
---|
582 | END IF |
---|
583 | |
---|
584 | palm_grid % kk(i,j,k,1) = kcur |
---|
585 | palm_grid % kk(i,j,k,2) = kcur + 1 |
---|
586 | |
---|
587 | ! copmute vertical weights |
---|
588 | weight = (h_top - current_height) / (h_top - h_bottom) |
---|
589 | palm_grid % w_verti(i,j,k,1) = weight |
---|
590 | palm_grid % w_verti(i,j,k,2) = 1.0_dp - weight |
---|
591 | END IF |
---|
592 | |
---|
593 | END DO |
---|
594 | |
---|
595 | END DO |
---|
596 | END DO |
---|
597 | |
---|
598 | END SUBROUTINE find_vertical_neighbours_and_weights |
---|
599 | |
---|
600 | !------------------------------------------------------------------------------! |
---|
601 | ! Description: |
---|
602 | ! ------------ |
---|
603 | !> Compute the four weights for horizontal bilinear interpolation given the |
---|
604 | !> coordinates clon(i,j) clat(i,j) of the PALM-4U grid in the COSMO-DE |
---|
605 | !> rotated-pole grid and the neightbour indices ii(i,j,1-4) and jj(i,j,1-4). |
---|
606 | !> |
---|
607 | !> Input parameters: |
---|
608 | !> ----------------- |
---|
609 | !> palm_grid % clon : longitudes of PALM-4U scalars (cell centres) in COSMO-DE's rotated-pole grid [rad] |
---|
610 | !> |
---|
611 | !> palm_grid % clat : latitudes of PALM-4U cell centres in COSMO-DE's rotated-pole grid [rad] |
---|
612 | !> |
---|
613 | !> cosmo_grid % lon : rotated-pole longitudes of scalars (cell centres) of the COSMO-DE grid [rad] |
---|
614 | !> |
---|
615 | !> cosmo_grid % lat : rotated-pole latitudes of scalars (cell centers) of the COSMO-DE grid [rad] |
---|
616 | !> |
---|
617 | !> cosmo_grid % dxi : inverse grid spacing in the first dimension [m^-1] |
---|
618 | !> |
---|
619 | !> cosmo_grid % dyi : inverse grid spacing in the second dimension [m^-1] |
---|
620 | !> |
---|
621 | !> Output parameters: |
---|
622 | !> ------------------ |
---|
623 | !> palm_grid % w_horiz(:,:,1-4) : weights for bilinear horizontal interpolation |
---|
624 | ! |
---|
625 | ! COSMO-DE grid |
---|
626 | ! ------------- |
---|
627 | ! jj, lat |
---|
628 | ! ^ j |
---|
629 | ! | \ i |
---|
630 | ! jj(i,j,2/3) + ... 2 ---\--------/------ 3 |
---|
631 | ! | | ^ \ / | |
---|
632 | ! | | |wp \ / | |
---|
633 | ! | | v \ / | |
---|
634 | ! latpos + ............ o/ (i,j) | |
---|
635 | ! | | : | |
---|
636 | ! | | :<----wl---->| |
---|
637 | ! jj(i,j,1/4) + ... 1 -------:----------- 4 |
---|
638 | ! | : : : |
---|
639 | ! | : : : |
---|
640 | ! | : lonpos : |
---|
641 | ! L-----+--------+------------+------> ii, lon |
---|
642 | ! ii(i,j,1/2) ii(i,j,3/4) |
---|
643 | ! |
---|
644 | SUBROUTINE compute_horizontal_interp_weights(cosmo_lat, cosmo_lon, & |
---|
645 | cosmo_dxi, cosmo_dyi, palm_clat, palm_clon, palm_ii, palm_jj, palm_w_horiz) |
---|
646 | |
---|
647 | REAL(dp), DIMENSION(0:), INTENT(IN) :: cosmo_lat, cosmo_lon |
---|
648 | REAL(dp), INTENT(IN) :: cosmo_dxi, cosmo_dyi |
---|
649 | REAL(dp), DIMENSION(0:,0:), INTENT(IN) :: palm_clat, palm_clon |
---|
650 | INTEGER, DIMENSION(0:,0:,1:), INTENT(IN) :: palm_ii, palm_jj |
---|
651 | |
---|
652 | REAL(dp), DIMENSION(0:,0:,1:), INTENT(OUT) :: palm_w_horiz |
---|
653 | |
---|
654 | REAL(dp) :: wl, wp |
---|
655 | INTEGER :: i, j |
---|
656 | |
---|
657 | DO j = 0, UBOUND(palm_clon, 2) |
---|
658 | DO i = 0, UBOUND(palm_clon, 1) |
---|
659 | |
---|
660 | ! weight in lambda direction |
---|
661 | wl = ( cosmo_lon(palm_ii(i,j,4)) - palm_clon(i,j) ) * cosmo_dxi |
---|
662 | |
---|
663 | ! weight in phi direction |
---|
664 | wp = ( cosmo_lat(palm_jj(i,j,2)) - palm_clat(i,j) ) * cosmo_dyi |
---|
665 | |
---|
666 | IF (wl > 1.0_dp .OR. wl < 0.0_dp) THEN |
---|
667 | message = "Horizontal weight wl = " // TRIM(real_to_str(wl)) // & |
---|
668 | " is out bounds." |
---|
669 | CALL abort('compute_horizontal_interp_weights', message) |
---|
670 | END IF |
---|
671 | IF (wp > 1.0_dp .OR. wp < 0.0_dp) THEN |
---|
672 | message = "Horizontal weight wp = " // TRIM(real_to_str(wp)) // & |
---|
673 | " is out bounds." |
---|
674 | CALL abort('compute_horizontal_interp_weights', message) |
---|
675 | END IF |
---|
676 | |
---|
677 | palm_w_horiz(i,j,1) = wl * wp |
---|
678 | palm_w_horiz(i,j,2) = wl * (1.0_dp - wp) |
---|
679 | palm_w_horiz(i,j,3) = (1.0_dp - wl) * (1.0_dp - wp) |
---|
680 | palm_w_horiz(i,j,4) = 1.0_dp - SUM( palm_w_horiz(i,j,1:3) ) |
---|
681 | |
---|
682 | END DO |
---|
683 | END DO |
---|
684 | |
---|
685 | END SUBROUTINE compute_horizontal_interp_weights |
---|
686 | |
---|
687 | |
---|
688 | !------------------------------------------------------------------------------! |
---|
689 | ! Description: |
---|
690 | ! ------------ |
---|
691 | !> Interpolates u and v components of velocities located at cell faces to the |
---|
692 | !> cell centres by averaging neighbouring values. |
---|
693 | !> |
---|
694 | !> This routine is designed to be used with COSMO-DE arrays where there are the |
---|
695 | !> same number of grid points for scalars (centres) and velocities (faces). In |
---|
696 | !> COSMO-DE the velocity points are staggared one half grid spaceing up-grid |
---|
697 | !> which means the first centre point has to be omitted and is set to zero. |
---|
698 | SUBROUTINE centre_velocities(u_face, v_face, u_centre, v_centre) |
---|
699 | REAL(dp), DIMENSION(0:,0:,0:), INTENT(IN) :: u_face, v_face |
---|
700 | REAL(dp), DIMENSION(0:,0:,0:), INTENT(OUT) :: u_centre, v_centre |
---|
701 | INTEGER :: nx, ny |
---|
702 | |
---|
703 | nx = UBOUND(u_face, 1) |
---|
704 | ny = UBOUND(u_face, 2) |
---|
705 | |
---|
706 | u_centre(0,:,:) = 0.0_dp |
---|
707 | u_centre(1:,:,:) = 0.5_dp * ( u_face(0:nx-1,:,:) + u_face(1:,:,:) ) |
---|
708 | |
---|
709 | v_centre(:,0,:) = 0.0_dp |
---|
710 | v_centre(:,1:,:) = 0.5_dp * ( v_face(:,0:ny-1,:) + v_face(:,1:,:) ) |
---|
711 | END SUBROUTINE centre_velocities |
---|
712 | |
---|
713 | |
---|
714 | FUNCTION phirot2phi (phirot, rlarot, polphi, pollam, polgam) |
---|
715 | |
---|
716 | REAL(dp), INTENT (IN) :: polphi !< latitude of the rotated north pole |
---|
717 | REAL(dp), INTENT (IN) :: pollam !< longitude of the rotated north pole |
---|
718 | REAL(dp), INTENT (IN) :: phirot !< latitude in the rotated system |
---|
719 | REAL(dp), INTENT (IN) :: rlarot !< longitude in the rotated system |
---|
720 | REAL(dp), INTENT (IN) :: polgam !< angle between the north poles of the systems |
---|
721 | |
---|
722 | REAL(dp) :: phirot2phi !< latitude in the geographical system |
---|
723 | |
---|
724 | REAL(dp) :: zsinpol, zcospol, zphis, zrlas, zarg, zgam |
---|
725 | |
---|
726 | zsinpol = SIN(polphi * TO_RADIANS) |
---|
727 | zcospol = COS(polphi * TO_RADIANS) |
---|
728 | zphis = phirot * TO_RADIANS |
---|
729 | |
---|
730 | IF (rlarot > 180.0_dp) THEN |
---|
731 | zrlas = rlarot - 360.0_dp |
---|
732 | ELSE |
---|
733 | zrlas = rlarot |
---|
734 | END IF |
---|
735 | zrlas = zrlas * TO_RADIANS |
---|
736 | |
---|
737 | IF (polgam /= 0.0_dp) THEN |
---|
738 | zgam = polgam * TO_RADIANS |
---|
739 | zarg = zsinpol * SIN (zphis) + & |
---|
740 | zcospol * COS(zphis) * ( COS(zrlas) * COS(zgam) - & |
---|
741 | SIN(zgam) * SIN(zrlas) ) |
---|
742 | ELSE |
---|
743 | zarg = zcospol * COS (zphis) * COS (zrlas) + zsinpol * SIN (zphis) |
---|
744 | END IF |
---|
745 | |
---|
746 | phirot2phi = ASIN (zarg) * TO_DEGREES |
---|
747 | |
---|
748 | END FUNCTION phirot2phi |
---|
749 | |
---|
750 | |
---|
751 | FUNCTION phi2phirot (phi, rla, polphi, pollam) |
---|
752 | |
---|
753 | REAL(dp), INTENT (IN) :: polphi !< latitude of the rotated north pole |
---|
754 | REAL(dp), INTENT (IN) :: pollam !< longitude of the rotated north pole |
---|
755 | REAL(dp), INTENT (IN) :: phi !< latitude in the geographical system |
---|
756 | REAL(dp), INTENT (IN) :: rla !< longitude in the geographical system |
---|
757 | |
---|
758 | REAL(dp) :: phi2phirot !< longitude in the rotated system |
---|
759 | |
---|
760 | REAL(dp) :: zsinpol, zcospol, zlampol, zphi, zrla, zarg1, zarg2, zrla1 |
---|
761 | |
---|
762 | zsinpol = SIN(polphi * TO_RADIANS) |
---|
763 | zcospol = COS(polphi * TO_RADIANS) |
---|
764 | zlampol = pollam * TO_RADIANS |
---|
765 | zphi = phi * TO_RADIANS |
---|
766 | |
---|
767 | IF (rla > 180.0_dp) THEN |
---|
768 | zrla1 = rla - 360.0_dp |
---|
769 | ELSE |
---|
770 | zrla1 = rla |
---|
771 | END IF |
---|
772 | zrla = zrla1 * TO_RADIANS |
---|
773 | |
---|
774 | zarg1 = SIN(zphi) * zsinpol |
---|
775 | zarg2 = COS(zphi) * zcospol * COS(zrla - zlampol) |
---|
776 | |
---|
777 | phi2phirot = ASIN(zarg1 + zarg2) * TO_DEGREES |
---|
778 | |
---|
779 | END FUNCTION phi2phirot |
---|
780 | |
---|
781 | |
---|
782 | FUNCTION rlarot2rla(phirot, rlarot, polphi, pollam, polgam) |
---|
783 | |
---|
784 | REAL(dp), INTENT (IN) :: polphi !< latitude of the rotated north pole |
---|
785 | REAL(dp), INTENT (IN) :: pollam !< longitude of the rotated north pole |
---|
786 | REAL(dp), INTENT (IN) :: phirot !< latitude in the rotated system |
---|
787 | REAL(dp), INTENT (IN) :: rlarot !< longitude in the rotated system |
---|
788 | REAL(dp), INTENT (IN) :: polgam !< angle between the north poles of the systems |
---|
789 | |
---|
790 | REAL(dp) :: rlarot2rla !< latitude in the geographical system |
---|
791 | |
---|
792 | REAL(dp) :: zsinpol, zcospol, zlampol, zphis, zrlas, zarg1, zarg2, zgam |
---|
793 | |
---|
794 | zsinpol = SIN(TO_RADIANS * polphi) |
---|
795 | zcospol = COS(TO_RADIANS * polphi) |
---|
796 | zlampol = TO_RADIANS * pollam |
---|
797 | zphis = TO_RADIANS * phirot |
---|
798 | |
---|
799 | IF (rlarot > 180.0_dp) THEN |
---|
800 | zrlas = rlarot - 360.0_dp |
---|
801 | ELSE |
---|
802 | zrlas = rlarot |
---|
803 | END IF |
---|
804 | zrlas = TO_RADIANS * zrlas |
---|
805 | |
---|
806 | IF (polgam /= 0.0_dp) THEN |
---|
807 | zgam = TO_RADIANS * polgam |
---|
808 | zarg1 = SIN(zlampol) * (zcospol * SIN(zphis) - zsinpol*COS(zphis) * & |
---|
809 | (COS(zrlas) * COS(zgam) - SIN(zrlas) * SIN(zgam)) ) - & |
---|
810 | COS(zlampol) * COS(zphis) * ( SIN(zrlas) * COS(zgam) + & |
---|
811 | COS(zrlas) * SIN(zgam) ) |
---|
812 | |
---|
813 | zarg2 = COS (zlampol) * (zcospol * SIN(zphis) - zsinpol*COS(zphis) * & |
---|
814 | (COS(zrlas) * COS(zgam) - SIN(zrlas) * SIN(zgam)) ) + & |
---|
815 | SIN(zlampol) * COS(zphis) * ( SIN(zrlas) * COS(zgam) + & |
---|
816 | COS(zrlas) * SIN(zgam) ) |
---|
817 | ELSE |
---|
818 | zarg1 = SIN (zlampol) * (-zsinpol * COS(zrlas) * COS(zphis) + & |
---|
819 | zcospol * SIN(zphis)) - & |
---|
820 | COS (zlampol) * SIN(zrlas) * COS(zphis) |
---|
821 | zarg2 = COS (zlampol) * (-zsinpol * COS(zrlas) * COS(zphis) + & |
---|
822 | zcospol * SIN(zphis)) + & |
---|
823 | SIN (zlampol) * SIN(zrlas) * COS(zphis) |
---|
824 | END IF |
---|
825 | |
---|
826 | IF (zarg2 == 0.0_dp) zarg2 = 1.0E-20_dp |
---|
827 | |
---|
828 | rlarot2rla = ATAN2(zarg1,zarg2) * TO_DEGREES |
---|
829 | |
---|
830 | END FUNCTION rlarot2rla |
---|
831 | |
---|
832 | |
---|
833 | FUNCTION rla2rlarot ( phi, rla, polphi, pollam, polgam ) |
---|
834 | |
---|
835 | REAL(dp), INTENT (IN) :: polphi !< latitude of the rotated north pole |
---|
836 | REAL(dp), INTENT (IN) :: pollam !< longitude of the rotated north pole |
---|
837 | REAL(dp), INTENT (IN) :: phi !< latitude in geographical system |
---|
838 | REAL(dp), INTENT (IN) :: rla !< longitude in geographical system |
---|
839 | REAL(dp), INTENT (IN) :: polgam !< angle between the north poles of the systems |
---|
840 | |
---|
841 | REAL (KIND=dp) :: rla2rlarot !< latitude in the the rotated system |
---|
842 | |
---|
843 | REAL (KIND=dp) :: zsinpol, zcospol, zlampol, zphi, zrla, zarg1, zarg2, zrla1 |
---|
844 | |
---|
845 | zsinpol = SIN(polphi * TO_RADIANS) |
---|
846 | zcospol = COS(polphi * TO_RADIANS) |
---|
847 | zlampol = pollam * TO_RADIANS |
---|
848 | zphi = phi * TO_RADIANS |
---|
849 | |
---|
850 | IF (rla > 180.0_dp) THEN |
---|
851 | zrla1 = rla - 360.0_dp |
---|
852 | ELSE |
---|
853 | zrla1 = rla |
---|
854 | END IF |
---|
855 | zrla = zrla1 * TO_RADIANS |
---|
856 | |
---|
857 | zarg1 = - SIN (zrla-zlampol) * COS(zphi) |
---|
858 | zarg2 = - zsinpol * COS(zphi) * COS(zrla-zlampol) + zcospol * SIN(zphi) |
---|
859 | |
---|
860 | IF (zarg2 == 0.0_dp) zarg2 = 1.0E-20_dp |
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861 | |
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862 | rla2rlarot = ATAN2 (zarg1,zarg2) * TO_DEGREES |
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863 | |
---|
864 | IF (polgam /= 0.0_dp ) THEN |
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865 | rla2rlarot = polgam + rla2rlarot |
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866 | IF (rla2rlarot > 180._dp) rla2rlarot = rla2rlarot - 360.0_dp |
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867 | END IF |
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868 | |
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869 | END FUNCTION rla2rlarot |
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870 | |
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871 | |
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872 | SUBROUTINE uv2uvrot(u, v, rlat, rlon, pollat, pollon, urot, vrot) |
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873 | |
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874 | REAL(dp), INTENT (IN) :: u, v !< wind components in the true geographical system |
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875 | REAL(dp), INTENT (IN) :: rlat, rlon !< coordinates in the true geographical system |
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876 | REAL(dp), INTENT (IN) :: pollat, pollon !< latitude and longitude of the north pole of the rotated grid |
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877 | |
---|
878 | REAL(dp), INTENT (OUT) :: urot, vrot !< wind components in the rotated grid |
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879 | |
---|
880 | REAL (dp) :: zsinpol, zcospol, zlonp, zlat, zarg1, zarg2, znorm |
---|
881 | |
---|
882 | zsinpol = SIN(pollat * TO_RADIANS) |
---|
883 | zcospol = COS(pollat * TO_RADIANS) |
---|
884 | zlonp = (pollon-rlon) * TO_RADIANS |
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885 | zlat = rlat * TO_RADIANS |
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886 | |
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887 | zarg1 = zcospol * SIN(zlonp) |
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888 | zarg2 = zsinpol * COS(zlat) - zcospol * SIN(zlat) * COS(zlonp) |
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889 | znorm = 1.0_dp / SQRT(zarg1*zarg1 + zarg2*zarg2) |
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890 | |
---|
891 | urot = u * zarg2 * znorm - v * zarg1 * znorm |
---|
892 | vrot = u * zarg1 * znorm + v * zarg2 * znorm |
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893 | |
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894 | END SUBROUTINE uv2uvrot |
---|
895 | |
---|
896 | |
---|
897 | SUBROUTINE uvrot2uv (urot, vrot, rlat, rlon, pollat, pollon, u, v) |
---|
898 | |
---|
899 | REAL(dp), INTENT(IN) :: urot, vrot !< wind components in the rotated grid |
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900 | REAL(dp), INTENT(IN) :: rlat, rlon !< latitude and longitude in the true geographical system |
---|
901 | REAL(dp), INTENT(IN) :: pollat, pollon !< latitude and longitude of the north pole of the rotated grid |
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902 | |
---|
903 | REAL(dp), INTENT(OUT) :: u, v !< wind components in the true geographical system |
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904 | |
---|
905 | REAL(dp) :: zsinpol, zcospol, zlonp, zlat, zarg1, zarg2, znorm |
---|
906 | |
---|
907 | zsinpol = SIN(pollat * TO_RADIANS) |
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908 | zcospol = COS(pollat * TO_RADIANS) |
---|
909 | zlonp = (pollon-rlon) * TO_RADIANS |
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910 | zlat = rlat * TO_RADIANS |
---|
911 | |
---|
912 | zarg1 = zcospol * SIN(zlonp) |
---|
913 | zarg2 = zsinpol * COS(zlat) - zcospol * SIN(zlat) * COS(zlonp) |
---|
914 | znorm = 1.0_dp / SQRT(zarg1*zarg1 + zarg2*zarg2) |
---|
915 | |
---|
916 | u = urot * zarg2 * znorm + vrot * zarg1 * znorm |
---|
917 | v = - urot * zarg1 * znorm + vrot * zarg2 * znorm |
---|
918 | |
---|
919 | END SUBROUTINE uvrot2uv |
---|
920 | |
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921 | END MODULE |
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922 | |
---|