1 | !> @file tridia_solver_mod.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 terms of the GNU General |
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6 | ! Public License as published by the Free Software Foundation, either version 3 of the License, or |
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7 | ! (at your option) any later version. |
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8 | ! |
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9 | ! PALM is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the |
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10 | ! implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General |
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11 | ! Public License for more details. |
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12 | ! |
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13 | ! You should have received a copy of the GNU General Public License along with PALM. If not, see |
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14 | ! <http://www.gnu.org/licenses/>. |
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15 | ! |
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16 | ! Copyright 1997-2021 Leibniz Universitaet Hannover |
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17 | !--------------------------------------------------------------------------------------------------! |
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18 | ! |
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19 | ! |
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20 | ! Current revisions: |
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21 | ! ----------------- |
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22 | ! |
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23 | ! |
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24 | ! Former revisions: |
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25 | ! ----------------- |
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26 | ! $Id: tridia_solver_mod.f90 4828 2021-01-05 11:21:41Z Giersch $ |
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27 | ! file re-formatted to follow the PALM coding standard |
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28 | ! |
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29 | ! 4360 2020-01-07 11:25:50Z suehring |
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30 | ! Added missing OpenMP directives |
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31 | ! |
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32 | ! 4182 2019-08-22 15:20:23Z scharf |
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33 | ! Corrected "Former revisions" section |
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34 | ! |
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35 | ! 3761 2019-02-25 15:31:42Z raasch |
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36 | ! OpenACC modification to prevent compiler warning about unused variable |
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37 | ! |
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38 | ! 3690 2019-01-22 22:56:42Z knoop |
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39 | ! OpenACC port for SPEC |
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40 | ! |
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41 | ! 1212 2013-08-15 08:46:27Z raasch |
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42 | ! Initial revision. |
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43 | ! Routines have been moved to seperate module from former file poisfft to here. The tridiagonal |
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44 | ! matrix coefficients of array tri are calculated only once at the beginning, i.e. routine split is |
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45 | ! called within tridia_init. |
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46 | ! |
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47 | ! |
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48 | ! Description: |
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49 | ! ------------ |
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50 | !> Solves the linear system of equations: |
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51 | !> |
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52 | !> -(4 pi^2(i^2/(dx^2*nnx^2)+j^2/(dy^2*nny^2))+ 1/(dzu(k)*dzw(k))+1/(dzu(k-1)*dzw(k)))*p(i,j,k)+ |
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53 | !> 1/(dzu(k)*dzw(k))*p(i,j,k+1)+1/(dzu(k-1)*dzw(k))*p(i,j,k-1)=d(i,j,k) |
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54 | !> |
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55 | !> by using the Thomas algorithm |
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56 | !--------------------------------------------------------------------------------------------------! |
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57 | |
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58 | #define __acc_fft_device ( defined( _OPENACC ) && ( defined ( __cuda_fft ) ) ) |
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59 | |
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60 | MODULE tridia_solver |
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61 | |
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62 | |
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63 | USE basic_constants_and_equations_mod, & |
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64 | ONLY: pi |
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65 | |
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66 | USE indices, & |
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67 | ONLY: nx, & |
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68 | ny, & |
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69 | nz |
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70 | |
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71 | USE kinds |
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72 | |
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73 | USE transpose_indices, & |
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74 | ONLY: nxl_z, & |
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75 | nyn_z, & |
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76 | nxr_z, & |
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77 | nys_z |
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78 | |
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79 | IMPLICIT NONE |
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80 | |
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81 | REAL(wp), DIMENSION(:,:), ALLOCATABLE :: ddzuw !< |
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82 | |
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83 | PRIVATE |
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84 | |
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85 | INTERFACE tridia_substi |
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86 | MODULE PROCEDURE tridia_substi |
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87 | END INTERFACE tridia_substi |
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88 | |
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89 | INTERFACE tridia_substi_overlap |
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90 | MODULE PROCEDURE tridia_substi_overlap |
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91 | END INTERFACE tridia_substi_overlap |
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92 | |
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93 | PUBLIC tridia_substi, tridia_substi_overlap, tridia_init, tridia_1dd |
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94 | |
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95 | CONTAINS |
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96 | |
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97 | |
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98 | !--------------------------------------------------------------------------------------------------! |
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99 | ! Description: |
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100 | ! ------------ |
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101 | !> @todo Missing subroutine description. |
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102 | !--------------------------------------------------------------------------------------------------! |
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103 | SUBROUTINE tridia_init |
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104 | |
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105 | USE arrays_3d, & |
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106 | ONLY: ddzu_pres, & |
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107 | ddzw, & |
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108 | rho_air_zw |
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109 | |
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110 | #if defined( _OPENACC ) |
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111 | USE arrays_3d, & |
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112 | ONLY: tri |
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113 | #endif |
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114 | |
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115 | IMPLICIT NONE |
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116 | |
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117 | INTEGER(iwp) :: k !< |
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118 | |
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119 | ALLOCATE( ddzuw(0:nz-1,3) ) |
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120 | |
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121 | DO k = 0, nz-1 |
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122 | ddzuw(k,1) = ddzu_pres(k+1) * ddzw(k+1) * rho_air_zw(k) |
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123 | ddzuw(k,2) = ddzu_pres(k+2) * ddzw(k+1) * rho_air_zw(k+1) |
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124 | ddzuw(k,3) = -1.0_wp * ( ddzu_pres(k+2) * ddzw(k+1) * rho_air_zw(k+1) + & |
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125 | ddzu_pres(k+1) * ddzw(k+1) * rho_air_zw(k) ) |
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126 | ENDDO |
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127 | ! |
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128 | !-- Calculate constant coefficients of the tridiagonal matrix |
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129 | CALL maketri |
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130 | CALL split |
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131 | |
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132 | #if __acc_fft_device |
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133 | !$ACC ENTER DATA & |
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134 | !$ACC COPYIN(ddzuw(0:nz-1,1:3)) & |
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135 | !$ACC COPYIN(tri(nxl_z:nxr_z,nys_z:nyn_z,0:nz-1,1:2)) |
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136 | #endif |
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137 | |
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138 | END SUBROUTINE tridia_init |
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139 | |
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140 | |
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141 | !--------------------------------------------------------------------------------------------------! |
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142 | ! Description: |
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143 | ! ------------ |
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144 | !> Computes the i- and j-dependent component of the matrix. |
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145 | !> Provide the constant coefficients of the tridiagonal matrix for solution of the Poisson equation |
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146 | !> in Fourier space. The coefficients are computed following the method of Schmidt et al. |
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147 | !> (DFVLR-Mitteilung 84-15), which departs from Stephan Siano's original version by discretizing the |
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148 | !> Poisson equation, before it is Fourier-transformed. |
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149 | !--------------------------------------------------------------------------------------------------! |
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150 | SUBROUTINE maketri |
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151 | |
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152 | |
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153 | USE arrays_3d, & |
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154 | ONLY: tric, & |
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155 | rho_air |
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156 | |
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157 | USE control_parameters, & |
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158 | ONLY: ibc_p_b, & |
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159 | ibc_p_t |
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160 | |
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161 | USE grid_variables, & |
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162 | ONLY: dx, & |
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163 | dy |
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164 | |
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165 | |
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166 | IMPLICIT NONE |
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167 | |
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168 | INTEGER(iwp) :: i !< |
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169 | INTEGER(iwp) :: j !< |
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170 | INTEGER(iwp) :: k !< |
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171 | INTEGER(iwp) :: nnxh !< |
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172 | INTEGER(iwp) :: nnyh !< |
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173 | |
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174 | REAL(wp) :: ll(nxl_z:nxr_z,nys_z:nyn_z) !< |
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175 | |
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176 | |
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177 | nnxh = ( nx + 1 ) / 2 |
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178 | nnyh = ( ny + 1 ) / 2 |
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179 | |
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180 | DO j = nys_z, nyn_z |
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181 | DO i = nxl_z, nxr_z |
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182 | IF ( j >= 0 .AND. j <= nnyh ) THEN |
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183 | IF ( i >= 0 .AND. i <= nnxh ) THEN |
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184 | ll(i,j) = 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * i ) / & |
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185 | REAL( nx+1, KIND=wp ) ) ) / ( dx * dx ) + & |
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186 | 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * j ) / & |
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187 | REAL( ny+1, KIND=wp ) ) ) / ( dy * dy ) |
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188 | ELSE |
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189 | ll(i,j) = 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * ( nx+1-i ) ) / & |
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190 | REAL( nx+1, KIND=wp ) ) ) / ( dx * dx ) + & |
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191 | 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * j ) / & |
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192 | REAL( ny+1, KIND=wp ) ) ) / ( dy * dy ) |
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193 | ENDIF |
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194 | ELSE |
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195 | IF ( i >= 0 .AND. i <= nnxh ) THEN |
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196 | ll(i,j) = 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * i ) / & |
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197 | REAL( nx+1, KIND=wp ) ) ) / ( dx * dx ) + & |
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198 | 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * ( ny+1-j ) ) / & |
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199 | REAL( ny+1, KIND=wp ) ) ) / ( dy * dy ) |
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200 | ELSE |
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201 | ll(i,j) = 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * ( nx+1-i ) ) / & |
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202 | REAL( nx+1, KIND=wp ) ) ) / ( dx * dx ) + & |
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203 | 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * ( ny+1-j ) ) / & |
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204 | REAL( ny+1, KIND=wp ) ) ) / ( dy * dy ) |
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205 | ENDIF |
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206 | ENDIF |
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207 | ENDDO |
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208 | ENDDO |
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209 | |
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210 | DO k = 0, nz-1 |
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211 | DO j = nys_z, nyn_z |
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212 | DO i = nxl_z, nxr_z |
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213 | tric(i,j,k) = ddzuw(k,3) - ll(i,j) * rho_air(k+1) |
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214 | ENDDO |
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215 | ENDDO |
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216 | ENDDO |
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217 | |
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218 | IF ( ibc_p_b == 1 ) THEN |
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219 | DO j = nys_z, nyn_z |
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220 | DO i = nxl_z, nxr_z |
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221 | tric(i,j,0) = tric(i,j,0) + ddzuw(0,1) |
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222 | ENDDO |
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223 | ENDDO |
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224 | ENDIF |
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225 | IF ( ibc_p_t == 1 ) THEN |
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226 | DO j = nys_z, nyn_z |
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227 | DO i = nxl_z, nxr_z |
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228 | tric(i,j,nz-1) = tric(i,j,nz-1) + ddzuw(nz-1,2) |
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229 | ENDDO |
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230 | ENDDO |
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231 | ENDIF |
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232 | |
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233 | END SUBROUTINE maketri |
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234 | |
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235 | |
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236 | !--------------------------------------------------------------------------------------------------! |
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237 | ! Description: |
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238 | ! ------------ |
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239 | !> Substitution (Forward and Backward) (Thomas algorithm). |
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240 | !--------------------------------------------------------------------------------------------------! |
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241 | SUBROUTINE tridia_substi( ar ) |
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242 | |
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243 | |
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244 | USE arrays_3d, & |
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245 | ONLY: tri |
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246 | |
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247 | USE control_parameters, & |
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248 | ONLY: ibc_p_b, & |
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249 | ibc_p_t |
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250 | |
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251 | IMPLICIT NONE |
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252 | |
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253 | INTEGER(iwp) :: i !< |
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254 | INTEGER(iwp) :: j !< |
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255 | INTEGER(iwp) :: k !< |
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256 | |
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257 | REAL(wp) :: ar(nxl_z:nxr_z,nys_z:nyn_z,1:nz) !< |
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258 | |
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259 | REAL(wp), DIMENSION(nxl_z:nxr_z,nys_z:nyn_z,0:nz-1) :: ar1 !< |
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260 | #if __acc_fft_device |
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261 | !$ACC DECLARE CREATE(ar1) |
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262 | #endif |
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263 | |
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264 | !$OMP PARALLEL PRIVATE(i,j,k) |
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265 | |
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266 | ! |
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267 | !-- Forward substitution |
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268 | #if __acc_fft_device |
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269 | !$ACC PARALLEL PRESENT(ar, ar1, tri) PRIVATE(i,j,k) |
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270 | #endif |
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271 | DO k = 0, nz - 1 |
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272 | #if __acc_fft_device |
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273 | !$ACC LOOP COLLAPSE(2) |
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274 | #endif |
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275 | !$OMP DO |
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276 | DO j = nys_z, nyn_z |
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277 | DO i = nxl_z, nxr_z |
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278 | |
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279 | IF ( k == 0 ) THEN |
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280 | ar1(i,j,k) = ar(i,j,k+1) |
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281 | ELSE |
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282 | ar1(i,j,k) = ar(i,j,k+1) - tri(i,j,k,2) * ar1(i,j,k-1) |
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283 | ENDIF |
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284 | |
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285 | ENDDO |
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286 | ENDDO |
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287 | ENDDO |
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288 | #if __acc_fft_device |
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289 | !$ACC END PARALLEL |
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290 | #endif |
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291 | |
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292 | ! |
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293 | !-- Backward substitution |
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294 | !-- Note, the 1.0E-20 in the denominator is due to avoid divisions by zero appearing if the |
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295 | !-- pressure bc is set to neumann at the top of the model domain. |
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296 | #if __acc_fft_device |
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297 | !$ACC PARALLEL PRESENT(ar, ar1, ddzuw, tri) PRIVATE(i,j,k) |
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298 | #endif |
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299 | DO k = nz-1, 0, -1 |
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300 | #if __acc_fft_device |
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301 | !$ACC LOOP COLLAPSE(2) |
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302 | #endif |
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303 | !$OMP DO |
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304 | DO j = nys_z, nyn_z |
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305 | DO i = nxl_z, nxr_z |
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306 | |
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307 | IF ( k == nz-1 ) THEN |
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308 | ar(i,j,k+1) = ar1(i,j,k) / ( tri(i,j,k,1) + 1.0E-20_wp ) |
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309 | ELSE |
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310 | ar(i,j,k+1) = ( ar1(i,j,k) - ddzuw(k,2) * ar(i,j,k+2) ) / tri(i,j,k,1) |
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311 | ENDIF |
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312 | ENDDO |
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313 | ENDDO |
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314 | ENDDO |
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315 | #if __acc_fft_device |
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316 | !$ACC END PARALLEL |
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317 | #endif |
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318 | |
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319 | !$OMP END PARALLEL |
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320 | |
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321 | ! |
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322 | !-- Indices i=0, j=0 correspond to horizontally averaged pressure. The respective values of ar |
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323 | !-- should be zero at all k-levels if acceleration of horizontally averaged vertical velocity |
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324 | !-- is zero. |
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325 | IF ( ibc_p_b == 1 .AND. ibc_p_t == 1 ) THEN |
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326 | IF ( nys_z == 0 .AND. nxl_z == 0 ) THEN |
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327 | #if __acc_fft_device |
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328 | !$ACC PARALLEL LOOP PRESENT(ar) |
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329 | #endif |
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330 | DO k = 1, nz |
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331 | ar(nxl_z,nys_z,k) = 0.0_wp |
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332 | ENDDO |
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333 | ENDIF |
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334 | ENDIF |
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335 | |
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336 | END SUBROUTINE tridia_substi |
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337 | |
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338 | |
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339 | !--------------------------------------------------------------------------------------------------! |
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340 | ! Description: |
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341 | ! ------------ |
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342 | !> Substitution (Forward and Backward) (Thomas algorithm). |
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343 | !--------------------------------------------------------------------------------------------------! |
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344 | SUBROUTINE tridia_substi_overlap( ar, jj ) |
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345 | |
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346 | |
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347 | USE arrays_3d, & |
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348 | ONLY: tri |
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349 | |
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350 | USE control_parameters, & |
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351 | ONLY: ibc_p_b, & |
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352 | ibc_p_t |
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353 | |
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354 | IMPLICIT NONE |
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355 | |
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356 | INTEGER(iwp) :: i !< |
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357 | INTEGER(iwp) :: j !< |
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358 | INTEGER(iwp) :: jj !< |
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359 | INTEGER(iwp) :: k !< |
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360 | |
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361 | REAL(wp) :: ar(nxl_z:nxr_z,nys_z:nyn_z,1:nz) !< |
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362 | |
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363 | REAL(wp), DIMENSION(nxl_z:nxr_z,nys_z:nyn_z,0:nz-1) :: ar1 !< |
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364 | |
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365 | ! |
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366 | !-- Forward substitution |
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367 | DO k = 0, nz - 1 |
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368 | DO j = nys_z, nyn_z |
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369 | DO i = nxl_z, nxr_z |
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370 | |
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371 | IF ( k == 0 ) THEN |
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372 | ar1(i,j,k) = ar(i,j,k+1) |
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373 | ELSE |
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374 | ar1(i,j,k) = ar(i,j,k+1) - tri(i,jj,k,2) * ar1(i,j,k-1) |
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375 | ENDIF |
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376 | |
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377 | ENDDO |
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378 | ENDDO |
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379 | ENDDO |
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380 | |
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381 | ! |
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382 | !-- Backward substitution |
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383 | !-- Note, the 1.0E-20 in the denominator is due to avoid divisions by zero appearing if the |
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384 | !-- pressure bc is set to neumann at the top of the model domain. |
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385 | DO k = nz-1, 0, -1 |
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386 | DO j = nys_z, nyn_z |
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387 | DO i = nxl_z, nxr_z |
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388 | |
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389 | IF ( k == nz-1 ) THEN |
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390 | ar(i,j,k+1) = ar1(i,j,k) / ( tri(i,jj,k,1) + 1.0E-20_wp ) |
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391 | ELSE |
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392 | ar(i,j,k+1) = ( ar1(i,j,k) - ddzuw(k,2) * ar(i,j,k+2) ) / tri(i,jj,k,1) |
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393 | ENDIF |
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394 | ENDDO |
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395 | ENDDO |
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396 | ENDDO |
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397 | |
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398 | ! |
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399 | !-- Indices i=0, j=0 correspond to horizontally averaged pressure. The respective values of ar |
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400 | !-- should be zero at all k-levels if acceleration of horizontally averaged vertical velocity |
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401 | !-- is zero. |
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402 | IF ( ibc_p_b == 1 .AND. ibc_p_t == 1 ) THEN |
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403 | IF ( nys_z == 0 .AND. nxl_z == 0 ) THEN |
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404 | DO k = 1, nz |
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405 | ar(nxl_z,nys_z,k) = 0.0_wp |
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406 | ENDDO |
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407 | ENDIF |
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408 | ENDIF |
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409 | |
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410 | END SUBROUTINE tridia_substi_overlap |
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411 | |
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412 | |
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413 | !--------------------------------------------------------------------------------------------------! |
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414 | ! Description: |
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415 | ! ------------ |
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416 | !> Splitting of the tridiagonal matrix (Thomas algorithm). |
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417 | !--------------------------------------------------------------------------------------------------! |
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418 | SUBROUTINE split |
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419 | |
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420 | |
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421 | USE arrays_3d, & |
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422 | ONLY: tri, & |
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423 | tric |
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424 | |
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425 | IMPLICIT NONE |
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426 | |
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427 | INTEGER(iwp) :: i !< |
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428 | INTEGER(iwp) :: j !< |
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429 | INTEGER(iwp) :: k !< |
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430 | ! |
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431 | ! Splitting |
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432 | DO j = nys_z, nyn_z |
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433 | DO i = nxl_z, nxr_z |
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434 | tri(i,j,0,1) = tric(i,j,0) |
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435 | ENDDO |
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436 | ENDDO |
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437 | |
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438 | DO k = 1, nz-1 |
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439 | DO j = nys_z, nyn_z |
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440 | DO i = nxl_z, nxr_z |
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441 | tri(i,j,k,2) = ddzuw(k,1) / tri(i,j,k-1,1) |
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442 | tri(i,j,k,1) = tric(i,j,k) - ddzuw(k-1,2) * tri(i,j,k,2) |
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443 | ENDDO |
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444 | ENDDO |
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445 | ENDDO |
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446 | |
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447 | END SUBROUTINE split |
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448 | |
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449 | |
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450 | !--------------------------------------------------------------------------------------------------! |
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451 | ! Description: |
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452 | ! ------------ |
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453 | !> Solves the linear system of equations for a 1d-decomposition along x (see tridia). |
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454 | !> |
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455 | !> @attention When using intel compilers older than 12.0, array tri must be passed as an argument to |
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456 | !> the contained subroutines. Otherwise address faults will occur. This feature can be |
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457 | !> activated with cpp-switch __intel11. On NEC, tri should not be passed |
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458 | !> (except for routine substi_1dd) because this causes very bad performance. |
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459 | !--------------------------------------------------------------------------------------------------! |
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460 | |
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461 | SUBROUTINE tridia_1dd( ddx2, ddy2, nx, ny, j, ar, tri_for_1d ) |
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462 | |
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463 | |
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464 | USE arrays_3d, & |
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465 | ONLY: ddzu_pres, & |
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466 | ddzw, & |
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467 | rho_air, & |
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468 | rho_air_zw |
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469 | |
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470 | USE control_parameters, & |
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471 | ONLY: ibc_p_b, & |
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472 | ibc_p_t |
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473 | |
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474 | IMPLICIT NONE |
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475 | |
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476 | INTEGER(iwp) :: i !< |
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477 | INTEGER(iwp) :: j !< |
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478 | INTEGER(iwp) :: k !< |
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479 | INTEGER(iwp) :: nnyh !< |
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480 | INTEGER(iwp) :: nx !< |
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481 | INTEGER(iwp) :: ny !< |
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482 | |
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483 | REAL(wp) :: ddx2 !< |
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484 | REAL(wp) :: ddy2 !< |
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485 | |
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486 | REAL(wp), DIMENSION(0:nx,1:nz) :: ar !< |
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487 | REAL(wp), DIMENSION(5,0:nx,0:nz-1) :: tri_for_1d !< |
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488 | |
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489 | |
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490 | nnyh = ( ny + 1 ) / 2 |
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491 | |
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492 | ! |
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493 | !-- Define constant elements of the tridiagonal matrix. The compiler on SX6 does loop exchange. |
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494 | !-- If 0:nx is a high power of 2, the exchanged loops create bank conflicts. The following directive |
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495 | !-- prohibits loop exchange and the loops perform much better. |
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496 | !CDIR NOLOOPCHG |
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497 | DO k = 0, nz-1 |
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498 | DO i = 0,nx |
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499 | tri_for_1d(2,i,k) = ddzu_pres(k+1) * ddzw(k+1) * rho_air_zw(k) |
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500 | tri_for_1d(3,i,k) = ddzu_pres(k+2) * ddzw(k+1) * rho_air_zw(k+1) |
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501 | ENDDO |
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502 | ENDDO |
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503 | |
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504 | IF ( j <= nnyh ) THEN |
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505 | CALL maketri_1dd( j ) |
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506 | ELSE |
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507 | CALL maketri_1dd( ny+1-j ) |
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508 | ENDIF |
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509 | |
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510 | CALL split_1dd |
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511 | CALL substi_1dd( ar, tri_for_1d ) |
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512 | |
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513 | CONTAINS |
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514 | |
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515 | |
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516 | !--------------------------------------------------------------------------------------------------! |
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517 | ! Description: |
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518 | ! ------------ |
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519 | !> Computes the i- and j-dependent component of the matrix. |
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520 | !--------------------------------------------------------------------------------------------------! |
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521 | SUBROUTINE maketri_1dd( j ) |
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522 | |
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523 | IMPLICIT NONE |
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524 | |
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525 | INTEGER(iwp) :: i !< |
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526 | INTEGER(iwp) :: j !< |
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527 | INTEGER(iwp) :: k !< |
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528 | INTEGER(iwp) :: nnxh !< |
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529 | |
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530 | REAL(wp) :: a !< |
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531 | REAL(wp) :: c !< |
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532 | |
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533 | REAL(wp), DIMENSION(0:nx) :: l !< |
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534 | |
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535 | |
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536 | nnxh = ( nx + 1 ) / 2 |
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537 | ! |
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538 | !-- Provide the tridiagonal matrix for solution of the Poisson equation in Fourier space. |
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539 | !-- The coefficients are computed following the method of Schmidt et al. (DFVLR-Mitteilung 84-15), |
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540 | !-- which departs from Stephan Siano's original version by discretizing the Poisson equation, |
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541 | !-- before it is Fourier-transformed. |
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542 | DO i = 0, nx |
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543 | IF ( i >= 0 .AND. i <= nnxh ) THEN |
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544 | l(i) = 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * i ) / & |
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545 | REAL( nx+1, KIND=wp ) ) ) * ddx2 + & |
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546 | 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * j ) / & |
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547 | REAL( ny+1, KIND=wp ) ) ) * ddy2 |
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548 | ELSE |
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549 | l(i) = 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * ( nx+1-i ) ) / & |
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550 | REAL( nx+1, KIND=wp ) ) ) * ddx2 + & |
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551 | 2.0_wp * ( 1.0_wp - COS( ( 2.0_wp * pi * j ) / & |
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552 | REAL( ny+1, KIND=wp ) ) ) * ddy2 |
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553 | ENDIF |
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554 | ENDDO |
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555 | |
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556 | DO k = 0, nz-1 |
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557 | DO i = 0, nx |
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558 | a = -1.0_wp * ddzu_pres(k+2) * ddzw(k+1) * rho_air_zw(k+1) |
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559 | c = -1.0_wp * ddzu_pres(k+1) * ddzw(k+1) * rho_air_zw(k) |
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560 | tri_for_1d(1,i,k) = a + c - l(i) * rho_air(k+1) |
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561 | ENDDO |
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562 | ENDDO |
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563 | IF ( ibc_p_b == 1 ) THEN |
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564 | DO i = 0, nx |
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565 | tri_for_1d(1,i,0) = tri_for_1d(1,i,0) + tri_for_1d(2,i,0) |
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566 | ENDDO |
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567 | ENDIF |
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568 | IF ( ibc_p_t == 1 ) THEN |
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569 | DO i = 0, nx |
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570 | tri_for_1d(1,i,nz-1) = tri_for_1d(1,i,nz-1) + tri_for_1d(3,i,nz-1) |
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571 | ENDDO |
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572 | ENDIF |
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573 | |
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574 | END SUBROUTINE maketri_1dd |
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575 | |
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576 | |
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577 | !--------------------------------------------------------------------------------------------------! |
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578 | ! Description: |
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579 | ! ------------ |
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580 | !> Splitting of the tridiagonal matrix (Thomas algorithm). |
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581 | !--------------------------------------------------------------------------------------------------! |
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582 | SUBROUTINE split_1dd |
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583 | |
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584 | IMPLICIT NONE |
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585 | |
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586 | INTEGER(iwp) :: i !< |
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587 | INTEGER(iwp) :: k !< |
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588 | |
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589 | |
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590 | ! |
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591 | !-- Splitting |
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592 | DO i = 0, nx |
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593 | tri_for_1d(4,i,0) = tri_for_1d(1,i,0) |
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594 | ENDDO |
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595 | DO k = 1, nz-1 |
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596 | DO i = 0, nx |
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597 | tri_for_1d(5,i,k) = tri_for_1d(2,i,k) / tri_for_1d(4,i,k-1) |
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598 | tri_for_1d(4,i,k) = tri_for_1d(1,i,k) - tri_for_1d(3,i,k-1) * tri_for_1d(5,i,k) |
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599 | ENDDO |
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600 | ENDDO |
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601 | |
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602 | END SUBROUTINE split_1dd |
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603 | |
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604 | |
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605 | !--------------------------------------------------------------------------------------------------! |
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606 | ! Description: |
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607 | ! ------------ |
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608 | !> Substitution (Forward and Backward) (Thomas algorithm). |
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609 | !--------------------------------------------------------------------------------------------------! |
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610 | SUBROUTINE substi_1dd( ar, tri_for_1d ) |
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611 | |
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612 | |
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613 | IMPLICIT NONE |
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614 | |
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615 | INTEGER(iwp) :: i !< |
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616 | INTEGER(iwp) :: k !< |
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617 | |
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618 | REAL(wp), DIMENSION(0:nx,nz) :: ar !< |
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619 | REAL(wp), DIMENSION(0:nx,0:nz-1) :: ar1 !< |
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620 | REAL(wp), DIMENSION(5,0:nx,0:nz-1) :: tri_for_1d !< |
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621 | |
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622 | ! |
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623 | !-- Forward substitution |
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624 | DO i = 0, nx |
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625 | ar1(i,0) = ar(i,1) |
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626 | ENDDO |
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627 | DO k = 1, nz-1 |
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628 | DO i = 0, nx |
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629 | ar1(i,k) = ar(i,k+1) - tri_for_1d(5,i,k) * ar1(i,k-1) |
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630 | ENDDO |
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631 | ENDDO |
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632 | |
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633 | ! |
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634 | !-- Backward substitution |
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635 | !-- Note, the add of 1.0E-20 in the denominator is due to avoid divisions by zero appearing if the |
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636 | !-- pressure bc is set to neumann at the top of the model domain. |
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637 | DO i = 0, nx |
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638 | ar(i,nz) = ar1(i,nz-1) / ( tri_for_1d(4,i,nz-1) + 1.0E-20_wp ) |
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639 | ENDDO |
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640 | DO k = nz-2, 0, -1 |
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641 | DO i = 0, nx |
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642 | ar(i,k+1) = ( ar1(i,k) - tri_for_1d(3,i,k) * ar(i,k+2) ) / tri_for_1d(4,i,k) |
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643 | ENDDO |
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644 | ENDDO |
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645 | |
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646 | ! |
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647 | !-- Indices i=0, j=0 correspond to horizontally averaged pressure. The respective values of ar |
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648 | !-- should be zero at all k-levels if acceleration of horizontally averaged vertical velocity is |
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649 | !-- zero. |
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650 | IF ( ibc_p_b == 1 .AND. ibc_p_t == 1 ) THEN |
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651 | IF ( j == 0 ) THEN |
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652 | DO k = 1, nz |
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653 | ar(0,k) = 0.0_wp |
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654 | ENDDO |
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655 | ENDIF |
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656 | ENDIF |
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657 | |
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658 | END SUBROUTINE substi_1dd |
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659 | |
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660 | END SUBROUTINE tridia_1dd |
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661 | |
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662 | |
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663 | END MODULE tridia_solver |
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