| [3184] | 1 | module gfluxv_mod |
|---|
| [3409] | 2 | |
|---|
| [3184] | 3 | implicit none |
|---|
| [3409] | 4 | |
|---|
| [3184] | 5 | contains |
|---|
| [3409] | 6 | |
|---|
| [3184] | 7 | SUBROUTINE GFLUXV(DTDEL,TDEL,TAUCUMIN,WDEL,CDEL,UBAR0,F0PI,RSF, |
|---|
| 8 | * BTOP,BSURF,FMIDP,FMIDM,DIFFV,FLUXUP,FLUXDN) |
|---|
| 9 | |
|---|
| 10 | |
|---|
| 11 | C THIS SUBROUTINE TAKES THE OPTICAL CONSTANTS AND BOUNDARY CONDITIONS |
|---|
| 12 | C FOR THE VISIBLE FLUX AT ONE WAVELENGTH AND SOLVES FOR THE FLUXES AT |
|---|
| 13 | C THE LEVELS. THIS VERSION IS SET UP TO WORK WITH LAYER OPTICAL DEPTHS |
|---|
| [3409] | 14 | C MEASURED FROM THE TOP OF EACH LAYER. (DTAU) TOP OF EACH LAYER HAS |
|---|
| [3184] | 15 | C OPTICAL DEPTH TAU(N).IN THIS SUB LEVEL N IS ABOVE LAYER N. THAT IS LAYER N |
|---|
| 16 | C HAS LEVEL N ON TOP AND LEVEL N+1 ON BOTTOM. OPTICAL DEPTH INCREASES |
|---|
| 17 | C FROM TOP TO BOTTOM. SEE C.P. MCKAY, TGM NOTES. |
|---|
| [3409] | 18 | C THIS SUBROUTINE DIFFERS FROM ITS IR COUNTERPART IN THAT HERE WE SOLVE FOR |
|---|
| [3184] | 19 | C THE FLUXES DIRECTLY USING THE GENERALIZED NOTATION OF MEADOR AND WEAVOR |
|---|
| 20 | C J.A.S., 37, 630-642, 1980. |
|---|
| [3409] | 21 | C THE TRI-DIAGONAL MATRIX SOLVER IS DSOLVER AND IS DOUBLE PRECISION SO MANY |
|---|
| [3184] | 22 | C VARIABLES ARE PASSED AS SINGLE THEN BECOME DOUBLE IN DSOLVER |
|---|
| 23 | C |
|---|
| 24 | C NLL = NUMBER OF LEVELS (NAYER + 1) THAT WILL BE SOLVED |
|---|
| 25 | C NAYER = NUMBER OF LAYERS (NOTE DIFFERENT SPELLING HERE) |
|---|
| 26 | C WAVEN = WAVELENGTH FOR THE COMPUTATION |
|---|
| 27 | C DTDEL(NLAYER) = ARRAY OPTICAL DEPTH OF THE LAYERS |
|---|
| 28 | C TDEL(NLL) = ARRAY COLUMN OPTICAL DEPTH AT THE LEVELS |
|---|
| 29 | C WDEL(NLEVEL) = SINGLE SCATTERING ALBEDO |
|---|
| 30 | C CDEL(NLL) = ASYMMETRY FACTORS, 0=ISOTROPIC |
|---|
| [3409] | 31 | C UBARV = AVERAGE ANGLE, |
|---|
| [3184] | 32 | C UBAR0 = SOLAR ZENITH ANGLE |
|---|
| 33 | C F0PI = INCIDENT SOLAR DIRECT BEAM FLUX |
|---|
| 34 | C RSF = SURFACE REFLECTANCE |
|---|
| 35 | C BTOP = UPPER BOUNDARY CONDITION ON DIFFUSE FLUX |
|---|
| 36 | C BSURF = REFLECTED DIRECT BEAM = (1-RSFI)*F0PI*EDP-TAU/U |
|---|
| 37 | C FP(NLEVEL) = UPWARD FLUX AT LEVELS |
|---|
| 38 | C FM(NLEVEL) = DOWNWARD FLUX AT LEVELS |
|---|
| 39 | C FMIDP(NLAYER) = UPWARD FLUX AT LAYER MIDPOINTS |
|---|
| 40 | C FMIDM(NLAYER) = DOWNWARD FLUX AT LAYER MIDPOINTS |
|---|
| 41 | C added Dec 2002 |
|---|
| 42 | C DIFFV = downward diffuse solar flux at the surface |
|---|
| [3409] | 43 | C |
|---|
| [3184] | 44 | !======================================================================! |
|---|
| 45 | |
|---|
| 46 | use radinc_h, only: L_TAUMAX, L_NLAYRAD, L_NLEVRAD, L_LEVELS |
|---|
| 47 | |
|---|
| 48 | implicit none |
|---|
| 49 | |
|---|
| 50 | !! INTEGER NLP |
|---|
| 51 | !! PARAMETER (NLP=101) ! MUST BE LARGER THAN NLEVEL |
|---|
| 52 | |
|---|
| 53 | REAL*8 EM, EP, EXPTRM |
|---|
| 54 | REAL*8 W0(L_NLAYRAD), COSBAR(L_NLAYRAD), DTAU(L_NLAYRAD) |
|---|
| 55 | REAL*8 TAU(L_NLEVRAD), WDEL(L_NLAYRAD), CDEL(L_NLAYRAD) |
|---|
| 56 | REAL*8 DTDEL(L_NLAYRAD), TDEL(L_NLEVRAD) |
|---|
| 57 | REAL*8 FMIDP(L_NLAYRAD), FMIDM(L_NLAYRAD) |
|---|
| 58 | REAL*8 LAMDA(L_NLAYRAD), ALPHA(L_NLAYRAD), XK1(L_NLAYRAD) |
|---|
| 59 | REAL*8 XK2(L_NLAYRAD),G1(L_NLAYRAD), G2(L_NLAYRAD) |
|---|
| 60 | REAL*8 G3(L_NLAYRAD), GAMA(L_NLAYRAD),CP(L_NLAYRAD),CM(L_NLAYRAD) |
|---|
| 61 | REAL*8 CPM1(L_NLAYRAD),CMM1(L_NLAYRAD), E1(L_NLAYRAD) |
|---|
| 62 | REAL*8 E2(L_NLAYRAD),E3(L_NLAYRAD),E4(L_NLAYRAD) |
|---|
| 63 | REAL*8 FLUXUP, FLUXDN |
|---|
| 64 | REAL*8 FACTOR, TAUCUMIN(L_LEVELS), TAUCUM(L_LEVELS) |
|---|
| 65 | |
|---|
| 66 | integer NAYER, L, K |
|---|
| 67 | real*8 ubar0, f0pi, rsf, btop, bsurf, g4, denom, am, ap |
|---|
| 68 | real*8 taumax, taumid, cpmid, cmmid |
|---|
| 69 | real*8 diffv |
|---|
| 70 | |
|---|
| 71 | C======================================================================C |
|---|
| 72 | |
|---|
| 73 | |
|---|
| 74 | |
|---|
| 75 | |
|---|
| 76 | NAYER = L_NLAYRAD |
|---|
| 77 | TAUMAX = L_TAUMAX !Default is 35.0 |
|---|
| [3409] | 78 | |
|---|
| [3184] | 79 | ! Delta-Eddington Scaling |
|---|
| 80 | |
|---|
| 81 | |
|---|
| 82 | FACTOR = 1.0D0 - WDEL(1)*CDEL(1)**2 |
|---|
| 83 | |
|---|
| 84 | TAU(1) = TDEL(1)*FACTOR |
|---|
| 85 | TAUCUM(1) = 0.0D0 |
|---|
| 86 | TAUCUM(2) = TAUCUMIN(2)*FACTOR |
|---|
| 87 | TAUCUM(3) = TAUCUM(2) +(TAUCUMIN(3)-TAUCUMIN(2))*FACTOR |
|---|
| 88 | |
|---|
| 89 | |
|---|
| 90 | DO L=1,L_NLAYRAD-1 |
|---|
| 91 | FACTOR = 1.0D0 - WDEL(L)*CDEL(L)**2 |
|---|
| 92 | W0(L) = WDEL(L)*(1.0D0-CDEL(L)**2)/FACTOR |
|---|
| [3409] | 93 | IF (W0(L).gt.1) THEN |
|---|
| 94 | W0(L) = 1 |
|---|
| 95 | END IF |
|---|
| [3184] | 96 | COSBAR(L) = CDEL(L)/(1.0D0+CDEL(L)) |
|---|
| 97 | |
|---|
| 98 | DTAU(L) = DTDEL(L)*FACTOR |
|---|
| 99 | TAU(L+1) = TAU(L)+DTAU(L) |
|---|
| 100 | K = 2*(L+1) |
|---|
| 101 | TAUCUM(K) = TAU(L+1) |
|---|
| 102 | TAUCUM(K+1) = TAUCUM(K) + (TAUCUMIN(K+1)-TAUCUMIN(K))*FACTOR |
|---|
| 103 | END DO |
|---|
| 104 | |
|---|
| 105 | ! Bottom layer |
|---|
| 106 | |
|---|
| 107 | L = L_NLAYRAD |
|---|
| 108 | FACTOR = 1.0D0 - WDEL(L)*CDEL(L)**2 |
|---|
| 109 | W0(L) = WDEL(L)*(1.0D0-CDEL(L)**2)/FACTOR |
|---|
| [3409] | 110 | IF (W0(L).gt.1) THEN |
|---|
| 111 | W0(L) = 1 |
|---|
| 112 | END IF |
|---|
| [3184] | 113 | COSBAR(L) = CDEL(L)/(1.0D0+CDEL(L)) |
|---|
| 114 | DTAU(L) = DTDEL(L)*FACTOR |
|---|
| 115 | TAU(L+1) = TAU(L)+DTAU(L) |
|---|
| 116 | TAUCUM(2*L+1) = TAU(L+1) |
|---|
| 117 | |
|---|
| 118 | BSURF = RSF*UBAR0*F0PI*EXP(-MIN(TAU(L+1),TAUMAX)/UBAR0) |
|---|
| 119 | ! new definition of BSURF |
|---|
| 120 | ! the old one was false because it used tau, not tau' |
|---|
| 121 | ! tau' includes the contribution to the downward flux |
|---|
| 122 | ! of the radiation scattered in the forward direction |
|---|
| 123 | |
|---|
| 124 | C WE GO WITH THE QUADRATURE APPROACH HERE. THE "SQRT(3)" factors |
|---|
| 125 | C ARE THE UBARV TERM. |
|---|
| 126 | |
|---|
| 127 | DO L=1,L_NLAYRAD |
|---|
| 128 | |
|---|
| 129 | ALPHA(L)=SQRT( (1.0-W0(L))/(1.0-W0(L)*COSBAR(L) ) ) |
|---|
| 130 | |
|---|
| [3409] | 131 | C SET OF CONSTANTS DETERMINED BY DOM |
|---|
| [3184] | 132 | |
|---|
| 133 | ! Quadrature method |
|---|
| 134 | G1(L) = (SQRT(3.0)*0.5)*(2.0- W0(L)*(1.0+COSBAR(L))) |
|---|
| 135 | G2(L) = (SQRT(3.0)*W0(L)*0.5)*(1.0-COSBAR(L)) |
|---|
| 136 | G3(L) = 0.5*(1.0-SQRT(3.0)*COSBAR(L)*UBAR0) |
|---|
| 137 | |
|---|
| 138 | ! ----- some other methods... (RDW) ------ |
|---|
| 139 | |
|---|
| 140 | ! Eddington method |
|---|
| 141 | ! G1(L) = 0.25*(7.0 - W0(L)*(4.0 - 3.0*COSBAR(L))) |
|---|
| 142 | ! G2(L) = -0.25*(1.0 - W0(L)*(4.0 - 3.0*COSBAR(L))) |
|---|
| 143 | ! G3(L) = 0.25*(2.0 - 3.0*COSBAR(L)*UBAR0) |
|---|
| 144 | |
|---|
| 145 | ! delta-Eddington method |
|---|
| 146 | ! G1(L) = (7.0 - 3.0*g^2 - W0(L)*(4.0 + 3.0*g) + W0(L)*g^2*(4*beta0 + 3*g)) / & |
|---|
| 147 | ! (4* (1 - g^2*() )) 0.25*(7.0 - W0(L)*(4.0 - 3.0*COSBAR(L))) |
|---|
| 148 | |
|---|
| 149 | ! Hybrid modified Eddington-delta function method |
|---|
| 150 | |
|---|
| 151 | ! ---------------------------------------- |
|---|
| 152 | |
|---|
| 153 | c So they use Quadrature |
|---|
| 154 | c but the scaling is Eddington? |
|---|
| 155 | |
|---|
| [3409] | 156 | IF (G1(L) - G2(L) < 1E-15) THEN |
|---|
| 157 | LAMDA(L) = 0 |
|---|
| 158 | ELSE |
|---|
| 159 | LAMDA(L) = SQRT(G1(L)**2 - G2(L)**2) |
|---|
| 160 | END IF |
|---|
| [3184] | 161 | GAMA(L) = (G1(L)-LAMDA(L))/G2(L) |
|---|
| 162 | END DO |
|---|
| 163 | |
|---|
| 164 | |
|---|
| 165 | DO L=1,L_NLAYRAD |
|---|
| 166 | G4 = 1.0-G3(L) |
|---|
| 167 | DENOM = LAMDA(L)**2 - 1./UBAR0**2 |
|---|
| [3409] | 168 | |
|---|
| [3184] | 169 | C THERE IS A POTENTIAL PROBLEM HERE IF W0=0 AND UBARV=UBAR0 |
|---|
| [3409] | 170 | C THEN DENOM WILL VANISH. THIS ONLY HAPPENS PHYSICALLY WHEN |
|---|
| [3184] | 171 | C THE SCATTERING GOES TO ZERO |
|---|
| 172 | C PREVENT THIS WITH AN IF STATEMENT |
|---|
| 173 | |
|---|
| 174 | IF ( DENOM .EQ. 0.) THEN |
|---|
| 175 | DENOM=1.E-10 |
|---|
| 176 | END IF |
|---|
| 177 | |
|---|
| 178 | |
|---|
| 179 | AM = F0PI*W0(L)*(G4 *(G1(L)+1./UBAR0) +G2(L)*G3(L) )/DENOM |
|---|
| 180 | AP = F0PI*W0(L)*(G3(L)*(G1(L)-1./UBAR0) +G2(L)*G4 )/DENOM |
|---|
| 181 | |
|---|
| 182 | C CPM1 AND CMM1 ARE THE CPLUS AND CMINUS TERMS EVALUATED |
|---|
| 183 | C AT THE TOP OF THE LAYER, THAT IS LOWER OPTICAL DEPTH TAU(L) |
|---|
| [3409] | 184 | |
|---|
| [3184] | 185 | CPM1(L) = AP*EXP(-TAU(L)/UBAR0) |
|---|
| 186 | CMM1(L) = AM*EXP(-TAU(L)/UBAR0) |
|---|
| 187 | |
|---|
| 188 | C CP AND CM ARE THE CPLUS AND CMINUS TERMS EVALUATED AT THE |
|---|
| 189 | C BOTTOM OF THE LAYER. THAT IS AT HIGHER OPTICAL DEPTH TAU(L+1) |
|---|
| 190 | |
|---|
| 191 | CP(L) = AP*EXP(-TAU(L+1)/UBAR0) |
|---|
| 192 | CM(L) = AM*EXP(-TAU(L+1)/UBAR0) |
|---|
| 193 | |
|---|
| 194 | END DO |
|---|
| 195 | |
|---|
| 196 | |
|---|
| [3409] | 197 | |
|---|
| [3184] | 198 | C NOW CALCULATE THE EXPONENTIAL TERMS NEEDED |
|---|
| 199 | C FOR THE TRIDIAGONAL ROTATED LAYERED METHOD |
|---|
| 200 | |
|---|
| 201 | DO L=1,L_NLAYRAD |
|---|
| 202 | EXPTRM = MIN(TAUMAX,LAMDA(L)*DTAU(L)) ! CLIPPED EXPONENTIAL |
|---|
| 203 | EP = EXP(EXPTRM) |
|---|
| 204 | |
|---|
| 205 | EM = 1.0/EP |
|---|
| 206 | E1(L) = EP+GAMA(L)*EM |
|---|
| 207 | E2(L) = EP-GAMA(L)*EM |
|---|
| 208 | E3(L) = GAMA(L)*EP+EM |
|---|
| 209 | E4(L) = GAMA(L)*EP-EM |
|---|
| 210 | END DO |
|---|
| 211 | |
|---|
| 212 | CALL DSOLVER(NAYER,GAMA,CP,CM,CPM1,CMM1,E1,E2,E3,E4,BTOP, |
|---|
| 213 | * BSURF,RSF,XK1,XK2) |
|---|
| 214 | |
|---|
| 215 | C NOW WE CALCULATE THE FLUXES AT THE MIDPOINTS OF THE LAYERS. |
|---|
| [3409] | 216 | |
|---|
| [3184] | 217 | DO L=1,L_NLAYRAD-1 |
|---|
| 218 | EXPTRM = MIN(TAUMAX,LAMDA(L)*(TAUCUM(2*L+1)-TAUCUM(2*L))) |
|---|
| [3409] | 219 | |
|---|
| [3184] | 220 | EP = EXP(EXPTRM) |
|---|
| 221 | |
|---|
| 222 | EM = 1.0/EP |
|---|
| 223 | G4 = 1.0-G3(L) |
|---|
| 224 | DENOM = LAMDA(L)**2 - 1./UBAR0**2 |
|---|
| 225 | |
|---|
| 226 | C THERE IS A POTENTIAL PROBLEM HERE IF W0=0 AND UBARV=UBAR0 |
|---|
| [3409] | 227 | C THEN DENOM WILL VANISH. THIS ONLY HAPPENS PHYSICALLY WHEN |
|---|
| [3184] | 228 | C THE SCATTERING GOES TO ZERO |
|---|
| 229 | C PREVENT THIS WITH A IF STATEMENT |
|---|
| 230 | |
|---|
| 231 | |
|---|
| 232 | IF ( DENOM .EQ. 0.) THEN |
|---|
| 233 | DENOM=1.E-10 |
|---|
| 234 | END IF |
|---|
| 235 | |
|---|
| 236 | AM = F0PI*W0(L)*(G4 *(G1(L)+1./UBAR0) +G2(L)*G3(L) )/DENOM |
|---|
| 237 | AP = F0PI*W0(L)*(G3(L)*(G1(L)-1./UBAR0) +G2(L)*G4 )/DENOM |
|---|
| 238 | |
|---|
| 239 | C CPMID AND CMMID ARE THE CPLUS AND CMINUS TERMS EVALUATED |
|---|
| 240 | C AT THE MIDDLE OF THE LAYER. |
|---|
| 241 | |
|---|
| 242 | TAUMID = TAUCUM(2*L+1) |
|---|
| 243 | |
|---|
| 244 | CPMID = AP*EXP(-TAUMID/UBAR0) |
|---|
| 245 | CMMID = AM*EXP(-TAUMID/UBAR0) |
|---|
| 246 | |
|---|
| 247 | FMIDP(L) = XK1(L)*EP + GAMA(L)*XK2(L)*EM + CPMID |
|---|
| 248 | FMIDM(L) = XK1(L)*EP*GAMA(L) + XK2(L)*EM + CMMID |
|---|
| [3409] | 249 | |
|---|
| [3184] | 250 | C ADD THE DIRECT FLUX TO THE DOWNWELLING TERM |
|---|
| 251 | |
|---|
| 252 | FMIDM(L)= FMIDM(L)+UBAR0*F0PI*EXP(-MIN(TAUMID,TAUMAX)/UBAR0) |
|---|
| [3409] | 253 | |
|---|
| [3184] | 254 | END DO |
|---|
| [3409] | 255 | |
|---|
| [3184] | 256 | C FLUX AT THE Ptop layer |
|---|
| 257 | |
|---|
| 258 | ! EP = 1.0 |
|---|
| 259 | ! EM = 1.0 |
|---|
| 260 | C JL18 correction to account for the fact that the radiative top is not at zero optical depth. |
|---|
| 261 | EXPTRM = MIN(TAUMAX,LAMDA(L)*(TAUCUM(2))) |
|---|
| 262 | EP = EXP(EXPTRM) |
|---|
| 263 | EM = 1.0/EP |
|---|
| 264 | G4 = 1.0-G3(1) |
|---|
| 265 | DENOM = LAMDA(1)**2 - 1./UBAR0**2 |
|---|
| 266 | |
|---|
| 267 | C THERE IS A POTENTIAL PROBLEM HERE IF W0=0 AND UBARV=UBAR0 |
|---|
| [3409] | 268 | C THEN DENOM WILL VANISH. THIS ONLY HAPPENS PHYSICALLY WHEN |
|---|
| [3184] | 269 | C THE SCATTERING GOES TO ZERO |
|---|
| 270 | C PREVENT THIS WITH A IF STATEMENT |
|---|
| 271 | |
|---|
| 272 | IF ( DENOM .EQ. 0.) THEN |
|---|
| 273 | DENOM=1.E-10 |
|---|
| 274 | END IF |
|---|
| 275 | |
|---|
| 276 | AM = F0PI*W0(1)*(G4 *(G1(1)+1./UBAR0) +G2(1)*G3(1) )/DENOM |
|---|
| 277 | AP = F0PI*W0(1)*(G3(1)*(G1(1)-1./UBAR0) +G2(1)*G4 )/DENOM |
|---|
| 278 | |
|---|
| 279 | C CPMID AND CMMID ARE THE CPLUS AND CMINUS TERMS EVALUATED |
|---|
| 280 | C AT THE MIDDLE OF THE LAYER. |
|---|
| 281 | |
|---|
| 282 | C CPMID = AP |
|---|
| 283 | C CMMID = AM |
|---|
| 284 | C JL18 correction to account for the fact that the radiative top is not at zero optical depth. |
|---|
| 285 | TAUMID = TAUCUM(2) |
|---|
| 286 | CPMID = AP*EXP(-TAUMID/UBAR0) |
|---|
| 287 | CMMID = AM*EXP(-TAUMID/UBAR0) |
|---|
| 288 | |
|---|
| 289 | FLUXUP = XK1(1)*EP + GAMA(1)*XK2(1)*EM + CPMID |
|---|
| 290 | FLUXDN = XK1(1)*EP*GAMA(1) + XK2(1)*EM + CMMID |
|---|
| 291 | |
|---|
| 292 | C ADD THE DIRECT FLUX TO THE DOWNWELLING TERM |
|---|
| 293 | |
|---|
| 294 | ! fluxdn = fluxdn+UBAR0*F0PI*EXP(-MIN(TAUCUM(1),TAUMAX)/UBAR0) |
|---|
| 295 | !JL18 the line above assumed that the top of the radiative model was P=0 |
|---|
| [3409] | 296 | ! it seems to be better for the IR to use the middle of the last physical layer as the radiative top. |
|---|
| [3184] | 297 | ! so we correct the downwelling flux below for the calculation of the heating rate |
|---|
| 298 | fluxdn = fluxdn+UBAR0*F0PI*EXP(-TAUCUM(2)/UBAR0) |
|---|
| 299 | |
|---|
| 300 | C This is for the "special" bottom layer, where we take |
|---|
| 301 | C DTAU instead of DTAU/2. |
|---|
| 302 | |
|---|
| [3409] | 303 | L = L_NLAYRAD |
|---|
| [3184] | 304 | EXPTRM = MIN(TAUMAX,LAMDA(L)*(TAUCUM(L_LEVELS)- |
|---|
| 305 | * TAUCUM(L_LEVELS-1))) |
|---|
| 306 | |
|---|
| 307 | EP = EXP(EXPTRM) |
|---|
| 308 | EM = 1.0/EP |
|---|
| 309 | G4 = 1.0-G3(L) |
|---|
| 310 | DENOM = LAMDA(L)**2 - 1./UBAR0**2 |
|---|
| 311 | |
|---|
| 312 | |
|---|
| 313 | C THERE IS A POTENTIAL PROBLEM HERE IF W0=0 AND UBARV=UBAR0 |
|---|
| [3409] | 314 | C THEN DENOM WILL VANISH. THIS ONLY HAPPENS PHYSICALLY WHEN |
|---|
| [3184] | 315 | C THE SCATTERING GOES TO ZERO |
|---|
| 316 | C PREVENT THIS WITH A IF STATEMENT |
|---|
| 317 | |
|---|
| 318 | |
|---|
| 319 | IF ( DENOM .EQ. 0.) THEN |
|---|
| 320 | DENOM=1.E-10 |
|---|
| 321 | END IF |
|---|
| 322 | |
|---|
| 323 | AM = F0PI*W0(L)*(G4 *(G1(L)+1./UBAR0) +G2(L)*G3(L) )/DENOM |
|---|
| 324 | AP = F0PI*W0(L)*(G3(L)*(G1(L)-1./UBAR0) +G2(L)*G4 )/DENOM |
|---|
| 325 | |
|---|
| 326 | C CPMID AND CMMID ARE THE CPLUS AND CMINUS TERMS EVALUATED |
|---|
| 327 | C AT THE MIDDLE OF THE LAYER. |
|---|
| 328 | |
|---|
| 329 | TAUMID = MIN(TAUCUM(L_LEVELS),TAUMAX) |
|---|
| 330 | CPMID = AP*EXP(-MIN(TAUMID,TAUMAX)/UBAR0) |
|---|
| 331 | CMMID = AM*EXP(-MIN(TAUMID,TAUMAX)/UBAR0) |
|---|
| 332 | |
|---|
| 333 | |
|---|
| 334 | FMIDP(L) = XK1(L)*EP + GAMA(L)*XK2(L)*EM + CPMID |
|---|
| 335 | FMIDM(L) = XK1(L)*EP*GAMA(L) + XK2(L)*EM + CMMID |
|---|
| 336 | |
|---|
| 337 | C Save the diffuse downward flux for TEMPGR calculations |
|---|
| 338 | |
|---|
| 339 | DIFFV = FMIDM(L) |
|---|
| 340 | |
|---|
| 341 | |
|---|
| 342 | C ADD THE DIRECT FLUX TO THE DOWNWELLING TERM |
|---|
| 343 | |
|---|
| 344 | FMIDM(L)= FMIDM(L)+UBAR0*F0PI*EXP(-MIN(TAUMID,TAUMAX)/UBAR0) |
|---|
| 345 | |
|---|
| 346 | |
|---|
| 347 | END SUBROUTINE GFLUXV |
|---|
| 348 | |
|---|
| 349 | end module gfluxv_mod |
|---|
