1 | SUBROUTINE prandtl_fluxes |
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2 | |
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3 | !------------------------------------------------------------------------------! |
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4 | ! Actual revisions: |
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5 | ! ----------------- |
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6 | ! |
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7 | ! |
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8 | ! Former revisions: |
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9 | ! ----------------- |
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10 | ! $Id: prandtl_fluxes.f90 77 2007-03-29 04:26:56Z raasch $ |
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11 | ! |
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12 | ! 75 2007-03-22 09:54:05Z raasch |
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13 | ! moisture renamed humidity |
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14 | ! |
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15 | ! RCS Log replace by Id keyword, revision history cleaned up |
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16 | ! |
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17 | ! Revision 1.19 2006/04/26 12:24:35 raasch |
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18 | ! +OpenMP directives and optimization (array assignments replaced by DO loops) |
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19 | ! |
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20 | ! Revision 1.1 1998/01/23 10:06:06 raasch |
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21 | ! Initial revision |
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22 | ! |
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23 | ! |
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24 | ! Description: |
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25 | ! ------------ |
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26 | ! Diagnostic computation of vertical fluxes in the Prandtl layer from the |
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27 | ! values of the variables at grid point k=1 |
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28 | !------------------------------------------------------------------------------! |
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29 | |
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30 | USE arrays_3d |
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31 | USE control_parameters |
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32 | USE grid_variables |
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33 | USE indices |
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34 | |
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35 | IMPLICIT NONE |
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36 | |
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37 | INTEGER :: i, j, k |
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38 | REAL :: a, b, rifm, uv_total, z_p |
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39 | |
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40 | ! |
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41 | !-- Compute theta* |
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42 | IF ( constant_heatflux ) THEN |
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43 | ! |
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44 | !-- For a given heat flux in the Prandtl layer: |
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45 | !-- for u* use the value from the previous time step |
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46 | !$OMP PARALLEL DO |
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47 | DO i = nxl-1, nxr+1 |
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48 | DO j = nys-1, nyn+1 |
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49 | ts(j,i) = -shf(j,i) / ( us(j,i) + 1E-30 ) |
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50 | ! |
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51 | !-- ts must be limited, because otherwise overflow may occur in case of |
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52 | !-- us=0 when computing rif further below |
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53 | IF ( ts(j,i) < -1.05E5 ) ts = -1.0E5 |
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54 | IF ( ts(j,i) > 1.0E5 ) ts = 1.0E5 |
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55 | ENDDO |
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56 | ENDDO |
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57 | |
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58 | ELSE |
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59 | ! |
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60 | !-- For a given surface temperature: |
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61 | !-- (the Richardson number is still the one from the previous time step) |
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62 | !$OMP PARALLEL DO PRIVATE( a, b, k, z_p ) |
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63 | DO i = nxl-1, nxr+1 |
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64 | DO j = nys-1, nyn+1 |
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65 | |
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66 | k = nzb_s_inner(j,i) |
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67 | z_p = zu(k+1) - zw(k) |
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68 | |
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69 | IF ( rif(j,i) >= 0.0 ) THEN |
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70 | ! |
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71 | !-- Stable stratification |
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72 | ts(j,i) = kappa * ( pt(k+1,j,i) - pt(k,j,i) ) / ( & |
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73 | LOG( z_p / z0(j,i) ) + & |
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74 | 5.0 * rif(j,i) * ( z_p - z0(j,i) ) / z_p & |
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75 | ) |
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76 | ELSE |
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77 | ! |
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78 | !-- Unstable stratification |
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79 | a = SQRT( 1.0 - 16.0 * rif(j,i) ) |
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80 | b = SQRT( 1.0 - 16.0 * rif(j,i) / z_p * z0(j,i) ) |
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81 | ! |
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82 | !-- If a borderline case occurs, the formula for stable |
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83 | !-- stratification must be used anyway, or else a zero division |
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84 | !-- would occur in the argument of the logarithm |
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85 | IF ( a == 1.0 .OR. b == 1.0 ) THEN |
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86 | ts(j,i) = kappa * ( pt(k+1,j,i) - pt(k,j,i) ) / ( & |
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87 | LOG( z_p / z0(j,i) ) + & |
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88 | 5.0 * rif(j,i) * ( z_p - z0(j,i) ) / z_p & |
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89 | ) |
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90 | ELSE |
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91 | ts(j,i) = kappa * ( pt(k+1,j,i) - pt(k,j,i) ) / ( & |
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92 | LOG( (1.0+b) / (1.0-b) * (1.0-a) / (1.0+a) ) & |
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93 | ) |
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94 | ENDIF |
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95 | ENDIF |
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96 | |
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97 | ENDDO |
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98 | ENDDO |
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99 | ENDIF |
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100 | |
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101 | ! |
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102 | !-- Compute z_p/L (corresponds to the Richardson-flux number) |
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103 | IF ( .NOT. humidity ) THEN |
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104 | !$OMP PARALLEL DO PRIVATE( k, z_p ) |
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105 | DO i = nxl-1, nxr+1 |
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106 | DO j = nys-1, nyn+1 |
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107 | k = nzb_s_inner(j,i) |
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108 | z_p = zu(k+1) - zw(k) |
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109 | rif(j,i) = z_p * kappa * g * ts(j,i) / & |
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110 | ( pt(k+1,j,i) * ( us(j,i)**2 + 1E-30 ) ) |
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111 | ! |
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112 | !-- Limit the value range of the Richardson numbers. |
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113 | !-- This is necessary for very small velocities (u,v --> 0), because |
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114 | !-- the absolute value of rif can then become very large, which in |
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115 | !-- consequence would result in very large shear stresses and very |
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116 | !-- small momentum fluxes (both are generally unrealistic). |
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117 | IF ( rif(j,i) < rif_min ) rif(j,i) = rif_min |
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118 | IF ( rif(j,i) > rif_max ) rif(j,i) = rif_max |
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119 | ENDDO |
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120 | ENDDO |
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121 | ELSE |
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122 | !$OMP PARALLEL DO PRIVATE( k, z_p ) |
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123 | DO i = nxl-1, nxr+1 |
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124 | DO j = nys-1, nyn+1 |
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125 | k = nzb_s_inner(j,i) |
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126 | z_p = zu(k+1) - zw(k) |
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127 | rif(j,i) = z_p * kappa * g * & |
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128 | ( ts(j,i) + 0.61 * pt(k+1,j,i) * qs(j,i) ) / & |
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129 | ( vpt(k+1,j,i) * ( us(j,i)**2 + 1E-30 ) ) |
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130 | ! |
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131 | !-- Limit the value range of the Richardson numbers. |
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132 | !-- This is necessary for very small velocities (u,v --> 0), because |
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133 | !-- the absolute value of rif can then become very large, which in |
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134 | !-- consequence would result in very large shear stresses and very |
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135 | !-- small momentum fluxes (both are generally unrealistic). |
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136 | IF ( rif(j,i) < rif_min ) rif(j,i) = rif_min |
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137 | IF ( rif(j,i) > rif_max ) rif(j,i) = rif_max |
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138 | ENDDO |
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139 | ENDDO |
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140 | ENDIF |
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141 | |
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142 | ! |
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143 | !-- Compute u* at the scalars' grid points |
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144 | !$OMP PARALLEL DO PRIVATE( a, b, k, uv_total, z_p ) |
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145 | DO i = nxl, nxr |
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146 | DO j = nys, nyn |
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147 | |
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148 | k = nzb_s_inner(j,i) |
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149 | z_p = zu(k+1) - zw(k) |
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150 | |
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151 | ! |
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152 | !-- Compute the absolute value of the horizontal velocity |
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153 | uv_total = SQRT( ( 0.5 * ( u(k+1,j,i) + u(k+1,j,i+1) ) )**2 + & |
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154 | ( 0.5 * ( v(k+1,j,i) + v(k+1,j+1,i) ) )**2 & |
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155 | ) |
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156 | |
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157 | IF ( rif(j,i) >= 0.0 ) THEN |
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158 | ! |
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159 | !-- Stable stratification |
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160 | us(j,i) = kappa * uv_total / ( & |
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161 | LOG( z_p / z0(j,i) ) + & |
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162 | 5.0 * rif(j,i) * ( z_p - z0(j,i) ) / z_p & |
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163 | ) |
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164 | ELSE |
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165 | ! |
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166 | !-- Unstable stratification |
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167 | a = 1.0 / SQRT( SQRT( 1.0 - 16.0 * rif(j,i) ) ) |
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168 | b = 1.0 / SQRT( SQRT( 1.0 - 16.0 * rif(j,i) / z_p * z0(j,i) ) ) |
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169 | ! |
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170 | !-- If a borderline case occurs, the formula for stable stratification |
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171 | !-- must be used anyway, or else a zero division would occur in the |
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172 | !-- argument of the logarithm. |
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173 | IF ( a == 1.0 .OR. b == 1.0 ) THEN |
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174 | us(j,i) = kappa * uv_total / ( & |
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175 | LOG( z_p / z0(j,i) ) + & |
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176 | 5.0 * rif(j,i) * ( z_p - z0(j,i) ) / z_p & |
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177 | ) |
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178 | ELSE |
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179 | us(j,i) = kappa * uv_total / ( & |
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180 | LOG( (1.0+b) / (1.0-b) * (1.0-a) / (1.0+a) ) + & |
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181 | 2.0 * ( ATAN( b ) - ATAN( a ) ) & |
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182 | ) |
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183 | ENDIF |
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184 | ENDIF |
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185 | ENDDO |
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186 | ENDDO |
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187 | |
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188 | ! |
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189 | !-- Compute u'w' for the total model domain. |
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190 | !-- First compute the corresponding component of u* and square it. |
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191 | !$OMP PARALLEL DO PRIVATE( a, b, k, rifm, z_p ) |
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192 | DO i = nxl, nxr |
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193 | DO j = nys, nyn |
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194 | |
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195 | k = nzb_u_inner(j,i) |
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196 | z_p = zu(k+1) - zw(k) |
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197 | |
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198 | ! |
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199 | !-- Compute Richardson-flux number for this point |
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200 | rifm = 0.5 * ( rif(j,i-1) + rif(j,i) ) |
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201 | IF ( rifm >= 0.0 ) THEN |
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202 | ! |
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203 | !-- Stable stratification |
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204 | usws(j,i) = kappa * u(k+1,j,i) / ( & |
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205 | LOG( z_p / z0(j,i) ) + & |
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206 | 5.0 * rifm * ( z_p - z0(j,i) ) / z_p & |
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207 | ) |
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208 | ELSE |
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209 | ! |
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210 | !-- Unstable stratification |
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211 | a = 1.0 / SQRT( SQRT( 1.0 - 16.0 * rifm ) ) |
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212 | b = 1.0 / SQRT( SQRT( 1.0 - 16.0 * rifm / z_p * z0(j,i) ) ) |
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213 | ! |
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214 | !-- If a borderline case occurs, the formula for stable stratification |
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215 | !-- must be used anyway, or else a zero division would occur in the |
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216 | !-- argument of the logarithm. |
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217 | IF ( a == 1.0 .OR. B == 1.0 ) THEN |
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218 | usws(j,i) = kappa * u(k+1,j,i) / ( & |
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219 | LOG( z_p / z0(j,i) ) + & |
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220 | 5.0 * rifm * ( z_p - z0(j,i) ) / z_p & |
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221 | ) |
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222 | ELSE |
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223 | usws(j,i) = kappa * u(k+1,j,i) / ( & |
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224 | LOG( (1.0+b) / (1.0-b) * (1.0-a) / (1.0+a) ) + & |
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225 | 2.0 * ( ATAN( b ) - ATAN( a ) ) & |
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226 | ) |
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227 | ENDIF |
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228 | ENDIF |
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229 | usws(j,i) = -usws(j,i) * ABS( usws(j,i) ) |
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230 | ENDDO |
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231 | ENDDO |
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232 | |
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233 | ! |
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234 | !-- Compute v'w' for the total model domain. |
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235 | !-- First compute the corresponding component of u* and square it. |
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236 | !$OMP PARALLEL DO PRIVATE( a, b, k, rifm, z_p ) |
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237 | DO i = nxl, nxr |
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238 | DO j = nys, nyn |
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239 | |
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240 | k = nzb_v_inner(j,i) |
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241 | z_p = zu(k+1) - zw(k) |
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242 | |
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243 | ! |
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244 | !-- Compute Richardson-flux number for this point |
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245 | rifm = 0.5 * ( rif(j-1,i) + rif(j,i) ) |
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246 | IF ( rifm >= 0.0 ) THEN |
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247 | ! |
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248 | !-- Stable stratification |
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249 | vsws(j,i) = kappa * v(k+1,j,i) / ( & |
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250 | LOG( z_p / z0(j,i) ) + & |
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251 | 5.0 * rifm * ( z_p - z0(j,i) ) / z_p & |
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252 | ) |
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253 | ELSE |
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254 | ! |
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255 | !-- Unstable stratification |
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256 | a = 1.0 / SQRT( SQRT( 1.0 - 16.0 * rifm ) ) |
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257 | b = 1.0 / SQRT( SQRT( 1.0 - 16.0 * rifm / z_p * z0(j,i) ) ) |
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258 | ! |
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259 | !-- If a borderline case occurs, the formula for stable stratification |
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260 | !-- must be used anyway, or else a zero division would occur in the |
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261 | !-- argument of the logarithm. |
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262 | IF ( a == 1.0 .OR. b == 1.0 ) THEN |
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263 | vsws(j,i) = kappa * v(k+1,j,i) / ( & |
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264 | LOG( z_p / z0(j,i) ) + & |
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265 | 5.0 * rifm * ( z_p - z0(j,i) ) / z_p & |
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266 | ) |
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267 | ELSE |
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268 | vsws(j,i) = kappa * v(k+1,j,i) / ( & |
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269 | LOG( (1.0+b) / (1.0-b) * (1.0-a) / (1.0+a) ) + & |
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270 | 2.0 * ( ATAN( b ) - ATAN( a ) ) & |
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271 | ) |
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272 | ENDIF |
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273 | ENDIF |
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274 | vsws(j,i) = -vsws(j,i) * ABS( vsws(j,i) ) |
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275 | ENDDO |
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276 | ENDDO |
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277 | |
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278 | ! |
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279 | !-- If required compute q* |
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280 | IF ( humidity .OR. passive_scalar ) THEN |
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281 | IF ( constant_waterflux ) THEN |
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282 | ! |
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283 | !-- For a given water flux in the Prandtl layer: |
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284 | !$OMP PARALLEL DO |
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285 | DO i = nxl-1, nxr+1 |
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286 | DO j = nys-1, nyn+1 |
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287 | qs(j,i) = -qsws(j,i) / ( us(j,i) + 1E-30 ) |
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288 | ENDDO |
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289 | ENDDO |
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290 | |
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291 | ELSE |
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292 | !$OMP PARALLEL DO PRIVATE( a, b, k, z_p ) |
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293 | DO i = nxl-1, nxr+1 |
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294 | DO j = nys-1, nyn+1 |
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295 | |
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296 | k = nzb_s_inner(j,i) |
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297 | z_p = zu(k+1) - zw(k) |
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298 | |
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299 | IF ( rif(j,i) >= 0.0 ) THEN |
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300 | ! |
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301 | !-- Stable stratification |
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302 | qs(j,i) = kappa * ( q(k+1,j,i) - q(k,j,i) ) / ( & |
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303 | LOG( z_p / z0(j,i) ) + & |
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304 | 5.0 * rif(j,i) * ( z_p - z0(j,i) ) / z_p & |
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305 | ) |
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306 | ELSE |
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307 | ! |
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308 | !-- Unstable stratification |
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309 | a = SQRT( 1.0 - 16.0 * rif(j,i) ) |
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310 | b = SQRT( 1.0 - 16.0 * rif(j,i) / z_p * z0(j,i) ) |
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311 | ! |
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312 | !-- If a borderline case occurs, the formula for stable |
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313 | !-- stratification must be used anyway, or else a zero division |
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314 | !-- would occur in the argument of the logarithm. |
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315 | IF ( a == 1.0 .OR. b == 1.0 ) THEN |
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316 | qs(j,i) = kappa * ( q(k+1,j,i) - q(k,j,i) ) / ( & |
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317 | LOG( z_p / z0(j,i) ) + & |
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318 | 5.0 * rif(j,i) * ( z_p - z0(j,i) ) / z_p & |
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319 | ) |
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320 | ELSE |
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321 | qs(j,i) = kappa * ( q(k+1,j,i) - q(k,j,i) ) / ( & |
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322 | LOG( (1.0+b) / (1.0-b) * (1.0-a) / (1.0+a) ) & |
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323 | ) |
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324 | ENDIF |
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325 | ENDIF |
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326 | |
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327 | ENDDO |
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328 | ENDDO |
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329 | ENDIF |
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330 | ENDIF |
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331 | |
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332 | ! |
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333 | !-- Exchange the boundaries for u* and the momentum fluxes (fluxes only for |
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334 | !-- completeness's sake). |
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335 | CALL exchange_horiz_2d( us ) |
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336 | CALL exchange_horiz_2d( usws ) |
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337 | CALL exchange_horiz_2d( vsws ) |
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338 | IF ( humidity .OR. passive_scalar ) CALL exchange_horiz_2d( qsws ) |
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339 | |
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340 | ! |
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341 | !-- Compute the vertical kinematic heat flux |
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342 | IF ( .NOT. constant_heatflux ) THEN |
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343 | !$OMP PARALLEL DO |
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344 | DO i = nxl-1, nxr+1 |
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345 | DO j = nys-1, nyn+1 |
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346 | shf(j,i) = -ts(j,i) * us(j,i) |
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347 | ENDDO |
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348 | ENDDO |
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349 | ENDIF |
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350 | |
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351 | ! |
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352 | !-- Compute the vertical water/scalar flux |
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353 | IF ( .NOT. constant_heatflux .AND. ( humidity .OR. passive_scalar ) ) THEN |
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354 | !$OMP PARALLEL DO |
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355 | DO i = nxl-1, nxr+1 |
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356 | DO j = nys-1, nyn+1 |
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357 | qsws(j,i) = -qs(j,i) * us(j,i) |
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358 | ENDDO |
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359 | ENDDO |
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360 | ENDIF |
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361 | |
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362 | ! |
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363 | !-- Bottom boundary condition for the TKE |
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364 | IF ( ibc_e_b == 2 ) THEN |
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365 | !$OMP PARALLEL DO |
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366 | DO i = nxl-1, nxr+1 |
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367 | DO j = nys-1, nyn+1 |
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368 | e(nzb_s_inner(j,i)+1,j,i) = ( us(j,i) / 0.1 )**2 |
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369 | ! |
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370 | !-- As a test: cm = 0.4 |
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371 | ! e(nzb_s_inner(j,i)+1,j,i) = ( us(j,i) / 0.4 )**2 |
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372 | e(nzb_s_inner(j,i),j,i) = e(nzb_s_inner(j,i)+1,j,i) |
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373 | ENDDO |
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374 | ENDDO |
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375 | ENDIF |
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376 | |
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377 | |
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378 | END SUBROUTINE prandtl_fluxes |
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