1 |
m_bates |
1.9 |
C $Header: /u/gcmpack/MITgcm/pkg/gmredi/gmredi_k3d.F,v 1.8 2013/08/31 17:33:55 m_bates Exp $ |
2 |
m_bates |
1.1 |
C $Name: $ |
3 |
m_bates |
1.9 |
#include "CPP_OPTIONS.h" |
4 |
m_bates |
1.1 |
#include "GMREDI_OPTIONS.h" |
5 |
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6 |
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C !ROUTINE: GMREDI_K3D |
7 |
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C !INTERFACE: |
8 |
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SUBROUTINE GMREDI_K3D( |
9 |
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I iMin, iMax, jMin, jMax, |
10 |
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I sigmaX, sigmaY, sigmaR, |
11 |
m_bates |
1.4 |
I bi, bj, myTime, myThid ) |
12 |
m_bates |
1.1 |
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13 |
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C !DESCRIPTION: \bv |
14 |
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C *==========================================================* |
15 |
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C | SUBROUTINE GMREDI_K3D |
16 |
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C | o Calculates the 3D diffusivity as per Bates et al. (2013) |
17 |
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C *==========================================================* |
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C \ev |
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20 |
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IMPLICIT NONE |
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22 |
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C == Global variables == |
23 |
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#include "SIZE.h" |
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#include "GRID.h" |
25 |
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#include "DYNVARS.h" |
26 |
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#include "EEPARAMS.h" |
27 |
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#include "PARAMS.h" |
28 |
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#include "GMREDI.h" |
29 |
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30 |
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C !INPUT/OUTPUT PARAMETERS: |
31 |
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C == Routine arguments == |
32 |
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C bi, bj :: tile indices |
33 |
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C myThid :: My Thread Id. number |
34 |
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35 |
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INTEGER iMin,iMax,jMin,jMax |
36 |
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_RL sigmaX(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
37 |
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_RL sigmaY(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
38 |
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_RL sigmaR(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
39 |
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INTEGER bi, bj |
40 |
m_bates |
1.4 |
_RL myTime |
41 |
m_bates |
1.1 |
INTEGER myThid |
42 |
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43 |
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#ifdef GM_K3D |
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45 |
m_bates |
1.4 |
C === Functions ==== |
46 |
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LOGICAL DIFFERENT_MULTIPLE |
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EXTERNAL DIFFERENT_MULTIPLE |
48 |
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49 |
m_bates |
1.1 |
C !LOCAL VARIABLES: |
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C == Local variables == |
51 |
m_bates |
1.4 |
INTEGER i,j,k,kk,m |
52 |
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53 |
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C update_modes :: Whether to update the eigenmodes |
54 |
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LOGICAL update_modes |
55 |
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56 |
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C surfk :: index of the depth of the surface layer |
57 |
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C kLow_C :: Local version of the index of deepest wet grid cell on tracer grid |
58 |
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C kLow_U :: Local version of the index of deepest wet grid cell on U grid |
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C kLow_V :: Local version of the index of deepest wet grid cell on V grid |
60 |
m_bates |
1.1 |
INTEGER surfk(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
61 |
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INTEGER kLow_C(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
62 |
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INTEGER kLow_U(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
63 |
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INTEGER kLow_V(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
64 |
m_bates |
1.4 |
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65 |
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C N2loc :: local N**2 |
66 |
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C slope :: local slope |
67 |
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C Req :: local equatorial deformation radius (m) |
68 |
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C deltaH :: local thickness of Eady integration (m) |
69 |
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C g_reciprho_sq :: (gravity*recip_rhoConst)**2 |
70 |
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C M4loc :: local M**4 |
71 |
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C maxDRhoDz :: maximum value of d(rho)/dz (derived from GM_K3D_minN2) |
72 |
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C sigx :: local d(rho)/dx |
73 |
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C sigy :: local d(rho)/dy |
74 |
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C sigz :: local d(rho)/dz |
75 |
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C hsurf :: local surface layer depth |
76 |
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C small :: a small number (to avoid floating point exceptions) |
77 |
m_bates |
1.1 |
_RL N2loc |
78 |
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_RL slope |
79 |
m_bates |
1.4 |
_RL Req |
80 |
m_bates |
1.1 |
_RL deltaH |
81 |
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_RL g_reciprho_sq |
82 |
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_RL M4loc |
83 |
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_RL maxDRhoDz |
84 |
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_RL sigx, sigy, sigz |
85 |
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_RL hsurf |
86 |
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_RL small |
87 |
m_bates |
1.4 |
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88 |
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C dfdy :: gradient of the Coriolis paramter, df/dy, 1/(m*s) |
89 |
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C dfdx :: gradient of the Coriolis paramter, df/dx, 1/(m*s) |
90 |
m_bates |
1.6 |
C gradf :: gradient of the Coriolis paramter at a cell centre, 1/(m*s) |
91 |
m_bates |
1.8 |
C Rurms :: a local mixing length used in calculation of urms (m) |
92 |
m_bates |
1.4 |
C RRhines :: The Rhines scale (m) |
93 |
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C Rmix :: Mixing length |
94 |
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C N2 :: Square of the buoyancy frequency (1/s**2) |
95 |
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C N2W :: Square of the buoyancy frequency (1/s**2) averaged to west of grid cell |
96 |
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C N2S :: Square of the buoyancy frequency (1/s**2) averaged to south of grid cell |
97 |
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C N :: Buoyancy frequency, SQRT(N2) |
98 |
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C BVint :: The vertical integral of N (m/s) |
99 |
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C ubar :: Zonal velocity on a tracer point (m/s) |
100 |
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C vbar :: Meridional velocity on a tracer point (m/s) |
101 |
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C Ubaro :: Barotropic velocity (m/s) |
102 |
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_RL dfdy( 1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
103 |
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_RL dfdx( 1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
104 |
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_RL gradf( 1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
105 |
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_RL dummy( 1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
106 |
m_bates |
1.8 |
_RL Rurms( 1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
107 |
m_bates |
1.4 |
_RL RRhines(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
108 |
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_RL Rmix( 1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
109 |
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_RL N2( 1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
110 |
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_RL N2W( 1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
111 |
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_RL N2S( 1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
112 |
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_RL N( 1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
113 |
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_RL BVint( 1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
114 |
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_RL Ubaro( 1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
115 |
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_RL ubar( 1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr,nSx,nSy) |
116 |
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_RL vbar( 1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr,nSx,nSy) |
117 |
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118 |
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C Rmid :: Rossby radius (m) |
119 |
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C KPV :: Diffusivity (m**2/s) |
120 |
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C SlopeX :: isopycnal slope in x direction |
121 |
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C SlopeY :: isopycnal slope in y direction |
122 |
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C dSigmaDx :: sigmaX averaged onto tracer grid |
123 |
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C dSigmaDy :: sigmaY averaged onto tracer grid |
124 |
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C tfluxX :: thickness flux in x direction |
125 |
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C tfluxY :: thickness flux in y direction |
126 |
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C fCoriU :: Coriolis parameter averaged to U points |
127 |
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C fCoriV :: Coriolis parameter averaged to V points |
128 |
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C cori :: Coriolis parameter forced to be finite near the equator |
129 |
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C coriU :: As for cori, but, at U point |
130 |
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C coriV :: As for cori, but, at V point |
131 |
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C surfkz :: Depth of surface layer (in r units) |
132 |
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_RL Rmid(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
133 |
m_bates |
1.3 |
_RL KPV(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
134 |
m_bates |
1.1 |
_RL SlopeX(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
135 |
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_RL SlopeY(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
136 |
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_RL dSigmaDx(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
137 |
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_RL dSigmaDy(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
138 |
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_RL tfluxX(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
139 |
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_RL tfluxY(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
140 |
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_RL cori(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
141 |
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_RL coriU(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
142 |
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_RL coriV(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
143 |
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_RL fCoriU(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
144 |
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_RL fCoriV(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
145 |
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_RL surfkz(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
146 |
m_bates |
1.4 |
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147 |
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C gradqx :: Potential vorticity gradient in x direction |
148 |
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C gradqy :: Potential vorticity gradient in y direction |
149 |
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C XimX :: Vertical integral of phi_m*K*gradqx |
150 |
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C XimY :: Vertical integral of phi_m*K*gradqy |
151 |
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C cDopp :: Quasi-Doppler shifted long Rossby wave speed (m/s) |
152 |
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C umc :: ubar-c (m/s) |
153 |
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C eady :: Eady growth rate (1/s) |
154 |
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C urms :: the rms eddy velocity (m/s) |
155 |
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C supp :: The suppression factor |
156 |
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C ustar :: The eddy induced velocity in the x direction |
157 |
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C vstar :: The eddy induced velocity in the y direction |
158 |
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C Xix :: Xi in the x direction (m/s**2) |
159 |
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C Xiy :: Xi in the y direction (m/s**2) |
160 |
m_bates |
1.1 |
_RL gradqx(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
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_RL gradqy(1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
162 |
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_RL XimX(GM_K3D_NModes,1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
163 |
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_RL XimY(GM_K3D_NModes,1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
164 |
m_bates |
1.4 |
_RL cDopp(1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
165 |
m_bates |
1.1 |
_RL umc( 1-Olx:sNx+Olx,1-Oly:sNy+Oly,1:Nr) |
166 |
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_RL eady( 1-Olx:sNx+Olx,1-Oly:sNy+Oly) |
167 |
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_RL urms( 1-Olx:sNx+Olx,1-Oly:sNy+Oly,1:Nr) |
168 |
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_RL supp( 1-Olx:sNx+Olx,1-Oly:sNy+Oly,1:Nr) |
169 |
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_RL ustar(1-Olx:sNx+Olx,1-Oly:sNy+Oly,1:Nr) |
170 |
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_RL vstar(1-Olx:sNx+Olx,1-Oly:sNy+Oly,1:Nr) |
171 |
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_RL Xix( 1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
172 |
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_RL Xiy( 1-Olx:sNx+Olx,1-Oly:sNy+Oly,Nr) |
173 |
m_bates |
1.4 |
#ifdef GM_K3D_PASSIVE |
174 |
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C psistar :: eddy induced streamfunction in the y direction |
175 |
m_bates |
1.1 |
_RL psistar(1-Olx:sNx+Olx,1-Oly:sNy+Oly,1:Nr) |
176 |
m_bates |
1.4 |
#endif |
177 |
m_bates |
1.1 |
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178 |
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179 |
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C---+----1----+----2----+----3----+----4----+----5----+----6----+----7-|--+----| |
180 |
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181 |
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C ====================================== |
182 |
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C Initialise some variables |
183 |
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C ====================================== |
184 |
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small = TINY(zeroRL) |
185 |
m_bates |
1.4 |
update_modes=.FALSE. |
186 |
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IF ( DIFFERENT_MULTIPLE(GM_K3D_vecFreq,myTime,deltaTClock) ) |
187 |
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& update_modes=.TRUE. |
188 |
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189 |
m_bates |
1.1 |
DO j=1-Oly,sNy+Oly |
190 |
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DO i=1-Olx,sNx+Olx |
191 |
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kLow_C(i,j) = kLowC(i,j,bi,bj) |
192 |
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ENDDO |
193 |
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ENDDO |
194 |
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DO j=1-Oly,sNy+Oly |
195 |
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DO i=1-Olx+1,sNx+Olx |
196 |
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kLow_U(i,j) = MIN( kLow_C(i,j), kLow_C(i-1,j) ) |
197 |
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ENDDO |
198 |
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ENDDO |
199 |
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DO j=1-Oly+1,sNy+Oly |
200 |
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DO i=1-Olx,sNx+Olx |
201 |
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kLow_V(i,j) = MIN( kLow_C(i,j), kLow_C(i,j-1) ) |
202 |
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ENDDO |
203 |
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ENDDO |
204 |
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205 |
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C Dummy values for the edges |
206 |
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C This avoids weirdness in gmredi_calc_eigs |
207 |
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i=1-Olx |
208 |
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DO j=1-Oly,sNy+Oly |
209 |
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kLow_U(i,j) = kLow_C(i,j) |
210 |
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ENDDO |
211 |
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j=1-Oly |
212 |
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DO i=1-Olx,sNx+Olx |
213 |
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kLow_V(i,j) = kLow_C(i,j) |
214 |
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ENDDO |
215 |
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216 |
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g_reciprho_sq = (gravity*recip_rhoConst)**2 |
217 |
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C Gradient of Coriolis |
218 |
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DO j=1-Oly+1,sNy+Oly |
219 |
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DO i=1-Olx+1,sNx+Olx |
220 |
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dfdx(i,j) = ( fCori(i,j,bi,bj)-fCori(i-1,j,bi,bj) ) |
221 |
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& *recip_dxC(i,j,bi,bj) |
222 |
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dfdy(i,j) = ( fCori(i,j,bi,bj)-fCori(i,j-1,bi,bj) ) |
223 |
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& *recip_dyC(i,j,bi,bj) |
224 |
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ENDDO |
225 |
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ENDDO |
226 |
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227 |
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C Coriolis at C points enforcing a minimum value so |
228 |
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C that it is defined at the equator |
229 |
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DO j=1-Oly,sNy+Oly |
230 |
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DO i=1-Olx,sNx+Olx |
231 |
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cori(i,j) = SIGN( MAX( ABS(fCori(i,j,bi,bj)),GM_K3D_minCori ), |
232 |
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& fCori(i,j,bi,bj) ) |
233 |
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ENDDO |
234 |
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ENDDO |
235 |
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C Coriolis at U and V points |
236 |
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DO j=1-Oly+1,sNy+Oly |
237 |
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DO i=1-Olx+1,sNx+Olx |
238 |
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C Limited so that the inverse is defined at the equator |
239 |
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coriU(i,j) = op5*( cori(i,j)+cori(i-1,j) ) |
240 |
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coriU(i,j) = SIGN( MAX( ABS(coriU(i,j)),GM_K3D_minCori ), |
241 |
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& coriU(i,j) ) |
242 |
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243 |
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coriV(i,j) = op5*( cori(i,j)+cori(i,j-1) ) |
244 |
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coriV(i,j) = SIGN( MAX( ABS(coriV(i,j)),GM_K3D_minCori ), |
245 |
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& coriV(i,j) ) |
246 |
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247 |
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C Not limited |
248 |
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fCoriU(i,j) = op5*( fCori(i,j,bi,bj)+fCori(i-1,j,bi,bj) ) |
249 |
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fCoriV(i,j) = op5*( fCori(i,j,bi,bj)+fCori(i,j-1,bi,bj) ) |
250 |
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ENDDO |
251 |
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ENDDO |
252 |
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DO j=1-Oly,sNy+Oly |
253 |
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DO i=1-Olx,sNx+Olx |
254 |
m_bates |
1.6 |
gradf(i,j) = recip_rSphere*fCoriCos(i,j,bi,bj) |
255 |
m_bates |
1.1 |
ENDDO |
256 |
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ENDDO |
257 |
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258 |
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C Zeroing some cumulative fields |
259 |
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DO j=1-Oly,sNy+Oly |
260 |
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DO i=1-Olx,sNx+Olx |
261 |
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eady(i,j) = zeroRL |
262 |
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BVint(i,j) = zeroRL |
263 |
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Ubaro(i,j) = zeroRL |
264 |
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ENDDO |
265 |
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ENDDO |
266 |
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267 |
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C Find the zonal velocity at the cell centre |
268 |
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C The logicals here are, in order: 1/ go from grid to north/east directions |
269 |
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C 2/ go from C to A grid and 3/ apply the mask |
270 |
m_bates |
1.9 |
#ifdef ALLOW_EDDYPSI |
271 |
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IF (GM_InMomAsStress) THEN |
272 |
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CALL rotate_uv2en_rl(uMean, vMean, ubar, vbar, .TRUE., .TRUE., |
273 |
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& .TRUE.,Nr,mythid) |
274 |
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ELSE |
275 |
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#endif |
276 |
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CALL rotate_uv2en_rl(uVel, vVel, ubar, vbar, .TRUE., .TRUE., |
277 |
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& .TRUE.,Nr,mythid) |
278 |
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#ifdef ALLOW_EDDYPSI |
279 |
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ENDIF |
280 |
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#endif |
281 |
m_bates |
1.1 |
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282 |
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C Square of the buoyancy frequency at the top of a grid cell |
283 |
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DO k=2,Nr |
284 |
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DO j=1-Oly,sNy+Oly |
285 |
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DO i=1-Olx,sNx+Olx |
286 |
|
|
N2(i,j,k) = -gravity*recip_rhoConst*sigmaR(i,j,k) |
287 |
|
|
ENDDO |
288 |
|
|
ENDDO |
289 |
|
|
ENDDO |
290 |
|
|
C N2(k=1) is always zero |
291 |
|
|
k=1 |
292 |
|
|
DO j=1-Oly,sNy+Oly |
293 |
|
|
DO i=1-Olx,sNx+Olx |
294 |
|
|
N2(i,j,k) = 0.0 |
295 |
|
|
N(i,j,k) = 0.0 |
296 |
|
|
ENDDO |
297 |
|
|
ENDDO |
298 |
|
|
C Enforce a minimum N2 |
299 |
|
|
DO k=2,Nr |
300 |
|
|
DO j=1-Oly,sNy+Oly |
301 |
|
|
DO i=1-Olx,sNx+Olx |
302 |
|
|
IF (N2(i,j,k).LT.GM_K3D_minN2) N2(i,j,k)=GM_K3D_minN2 |
303 |
|
|
N(i,j,k) = SQRT(N2(i,j,k)) |
304 |
|
|
ENDDO |
305 |
|
|
ENDDO |
306 |
|
|
ENDDO |
307 |
|
|
C Calculate the minimum drho/dz |
308 |
|
|
maxDRhoDz = -rhoConst*GM_K3D_minN2/gravity |
309 |
|
|
|
310 |
|
|
C Calculate the barotropic velocity by vertically integrating |
311 |
|
|
C and the dividing by the depth of the water column |
312 |
|
|
C Note that Ubaro is on the U grid. |
313 |
|
|
DO k=1,Nr |
314 |
|
|
DO j=1-Oly,sNy+Oly |
315 |
|
|
DO i=1-Olx,sNx+Olx |
316 |
|
|
Ubaro(i,j) = Ubaro(i,j) + |
317 |
|
|
& maskW(i,j,k,bi,bj)*drF(k)*hfacC(i,j,k,bi,bj) |
318 |
|
|
& *ubar(i,j,k,bi,bj) |
319 |
|
|
ENDDO |
320 |
|
|
ENDDO |
321 |
|
|
ENDDO |
322 |
|
|
DO j=1-Oly,sNy+Oly |
323 |
|
|
DO i=1-Olx,sNx+Olx |
324 |
|
|
IF (kLow_C(i,j).GT.0) THEN |
325 |
|
|
C The minus sign is because r_Low<0 |
326 |
|
|
Ubaro(i,j) = -Ubaro(i,j)/r_Low(i,j,bi,bj) |
327 |
|
|
ENDIF |
328 |
|
|
ENDDO |
329 |
|
|
ENDDO |
330 |
|
|
|
331 |
|
|
C Integrate the buoyancy frequency vertically using the trapezoidal method. |
332 |
|
|
DO k=1,Nr |
333 |
|
|
DO j=1-Oly,sNy+Oly |
334 |
|
|
DO i=1-Olx,sNx+Olx |
335 |
|
|
IF (k.LT.kLow_C(i,j)) THEN |
336 |
|
|
BVint(i,j) = BVint(i,j) + hFacC(i,j,k,bi,bj)*drF(k) |
337 |
|
|
& *(N(i,j,k)+N(i,j,k+1)) |
338 |
|
|
ELSEIF (k.EQ.kLow_C(i,j)) THEN |
339 |
|
|
C Assume that N(z=-H)=0 |
340 |
|
|
BVint(i,j) = BVint(i,j) + hFacC(i,j,k,bi,bj)*drF(k)*N(i,j,k) |
341 |
|
|
ENDIF |
342 |
|
|
ENDDO |
343 |
|
|
ENDDO |
344 |
|
|
ENDDO |
345 |
|
|
DO j=1-Oly,sNy+Oly |
346 |
|
|
DO i=1-Olx,sNx+Olx |
347 |
|
|
BVint(i,j) = op5*BVint(i,j) |
348 |
|
|
ENDDO |
349 |
|
|
ENDDO |
350 |
|
|
|
351 |
|
|
C Calculate the eigenvalues and eigenvectors |
352 |
m_bates |
1.4 |
IF (update_modes) THEN |
353 |
|
|
CALL GMREDI_CALC_EIGS( |
354 |
|
|
I iMin,iMax,jMin,jMax,bi,bj,N2,myThid, |
355 |
|
|
I kLow_C, maskC(:,:,:,bi,bj), |
356 |
|
|
I hfacC(:,:,:,bi,bj), recip_hfacC(:,:,:,bi,bj), |
357 |
|
|
I R_Low(:,:,bi,bj), 1, .TRUE., |
358 |
|
|
O Rmid, modesC(:,:,:,:,bi,bj)) |
359 |
|
|
|
360 |
|
|
C Calculate the Rossby Radius |
361 |
|
|
DO j=1-Oly+1,sNy+Oly |
362 |
|
|
DO i=1-Olx+1,sNx+Olx |
363 |
|
|
Req = SQRT(BVint(i,j)/(2*pi*gradf(i,j))) |
364 |
|
|
Rdef(i,j,bi,bj) = MIN(Rmid(i,j),Req) |
365 |
|
|
ENDDO |
366 |
|
|
ENDDO |
367 |
|
|
ENDIF |
368 |
m_bates |
1.1 |
|
369 |
|
|
C Average dsigma/dx and dsigma/dy onto the centre points |
370 |
|
|
|
371 |
|
|
DO k=1,Nr |
372 |
|
|
DO j=1-Oly,sNy+Oly-1 |
373 |
|
|
DO i=1-Olx,sNx+Olx-1 |
374 |
|
|
dSigmaDx(i,j,k) = op5*(sigmaX(i,j,k)+sigmaX(i+1,j,k)) |
375 |
|
|
dSigmaDy(i,j,k) = op5*(sigmaY(i,j,k)+sigmaY(i,j+1,k)) |
376 |
|
|
ENDDO |
377 |
|
|
ENDDO |
378 |
|
|
ENDDO |
379 |
|
|
|
380 |
|
|
C =============================== |
381 |
|
|
C Calculate the Eady growth rate |
382 |
|
|
C =============================== |
383 |
|
|
DO k=1,Nr |
384 |
|
|
|
385 |
|
|
C The bottom of the grid cell is shallower than the top |
386 |
|
|
C integration level, so, advance the depth. |
387 |
|
|
IF (-rF(k+1).LE. GM_K3D_EadyMinDepth) CYCLE |
388 |
|
|
|
389 |
jmc |
1.7 |
C Do not bother going any deeper since the top of the |
390 |
m_bates |
1.1 |
C cell is deeper than the bottom integration level |
391 |
|
|
IF (-rF(k).GE.GM_K3D_EadyMaxDepth) EXIT |
392 |
|
|
|
393 |
|
|
C We are in the integration depth range |
394 |
|
|
DO j=1-Oly,sNy+Oly-1 |
395 |
|
|
DO i=1-Olx,sNx+Olx-1 |
396 |
|
|
IF (kLow_C(i,j).GE.k) THEN |
397 |
|
|
IF (k.NE.kLow_C(i,j)) THEN |
398 |
|
|
N2loc = op5*(N2(i,j,k)+N2(i,j,k+1)) |
399 |
|
|
ELSE |
400 |
|
|
N2loc = op5*N2(i,j,k) |
401 |
|
|
ENDIF |
402 |
|
|
M4loc = g_reciprho_sq*( dSigmaDx(i,j,k)**2 |
403 |
|
|
& +dSigmaDy(i,j,k)**2 ) |
404 |
|
|
slope = SQRT(SQRT(M4loc)/N2loc) |
405 |
|
|
|
406 |
|
|
C Limit the slope. Note, this is not all the Eady calculations. |
407 |
|
|
IF (slope.LE.GM_K3D_maxSlope) THEN |
408 |
|
|
eady(i,j) = eady(i,j) |
409 |
|
|
& + hfacC(i,j,k,bi,bj)*drF(k)*M4loc/(N2loc) |
410 |
|
|
ELSE |
411 |
|
|
eady(i,j) = eady(i,j) |
412 |
|
|
& + hfacC(i,j,k,bi,bj)*drF(k)*SQRT(M4loc) |
413 |
|
|
& *GM_K3D_maxSlope*GM_K3D_maxSlope |
414 |
|
|
ENDIF |
415 |
|
|
ENDIF |
416 |
|
|
ENDDO |
417 |
|
|
ENDDO |
418 |
|
|
ENDDO |
419 |
|
|
|
420 |
|
|
DO j=1-Oly,sNy+Oly |
421 |
|
|
DO i=1-Olx,sNx+Olx |
422 |
|
|
C If the minimum depth for the integration is deeper than ocean |
423 |
|
|
C bottom then give the eady growth rate a dummy, non-zero value |
424 |
|
|
C to avoid floating point exceptions. These points are taken care |
425 |
|
|
C of by setting K3D=GM_K3D_smallK later. |
426 |
m_bates |
1.6 |
IF (-r_Low(i,j,bi,bj).LE.GM_K3D_EadyMinDepth) THEN |
427 |
m_bates |
1.1 |
eady(i,j) = small |
428 |
|
|
|
429 |
|
|
C Otherwise, multiply eady by the various constants to get the |
430 |
|
|
C growth rate. |
431 |
|
|
ELSE |
432 |
|
|
deltaH = MIN(-r_low(i,j,bi,bj),GM_K3D_EadyMaxDepth) |
433 |
|
|
deltaH = deltaH - GM_K3D_EadyMinDepth |
434 |
|
|
eady(i,j) = SQRT(eady(i,j)/deltaH) |
435 |
|
|
|
436 |
|
|
ENDIF |
437 |
|
|
|
438 |
|
|
ENDDO |
439 |
|
|
ENDDO |
440 |
|
|
|
441 |
|
|
C ====================================== |
442 |
|
|
C Calculate the diffusivity |
443 |
|
|
C ====================================== |
444 |
|
|
DO j=1-Oly+1,sNy+Oly |
445 |
|
|
DO i=1-Olx+1,sNx+Olx-1 |
446 |
|
|
C Calculate the Visbeck velocity |
447 |
m_bates |
1.8 |
Rurms(i,j) = MIN(Rdef(i,j,bi,bj),GM_K3D_maxLurms) |
448 |
|
|
urms(i,j,1) = GM_K3D_Lambda*eady(i,j)*Rurms(i,j) |
449 |
m_bates |
1.1 |
C Set the bottom urms to zero |
450 |
|
|
k=kLow_C(i,j) |
451 |
|
|
IF (k.GT.0) urms(i,j,k) = 0.0 |
452 |
|
|
|
453 |
|
|
C Calculate the Rhines scale |
454 |
|
|
RRhines(i,j) = SQRT(urms(i,j,1)/gradf(i,j)) |
455 |
|
|
|
456 |
|
|
C Calculate the estimated length scale |
457 |
m_bates |
1.4 |
Rmix(i,j) = MIN(Rdef(i,j,bi,bj), RRhines(i,j)) |
458 |
m_bates |
1.1 |
|
459 |
|
|
C Calculate the Doppler shifted long Rossby wave speed |
460 |
|
|
C Ubaro is on the U grid so we must average onto the M grid. |
461 |
|
|
cDopp(i,j) = op5*( Ubaro(i,j)+Ubaro(i+1,j) ) |
462 |
m_bates |
1.4 |
& - gradf(i,j)*Rdef(i,j,bi,bj)*Rdef(i,j,bi,bj) |
463 |
m_bates |
1.1 |
C Limit the wave speed to the namelist variable GM_K3D_maxC |
464 |
|
|
IF (ABS(cDopp(i,j)).GT.GM_K3D_maxC) THEN |
465 |
|
|
cDopp(i,j) = MAX(GM_K3D_maxC, cDopp(i,j)) |
466 |
|
|
ENDIF |
467 |
|
|
|
468 |
|
|
ENDDO |
469 |
|
|
ENDDO |
470 |
|
|
|
471 |
|
|
C Project the surface urms to the subsurface using the first baroclinic mode |
472 |
m_bates |
1.4 |
CALL GMREDI_CALC_URMS( |
473 |
|
|
I iMin,iMax,jMin,jMax,bi,bj,N2,myThid, |
474 |
|
|
U urms) |
475 |
m_bates |
1.1 |
|
476 |
|
|
C Calculate the diffusivity (on the mass grid) |
477 |
|
|
DO k=1,Nr |
478 |
|
|
DO j=1-Oly,sNy+Oly |
479 |
|
|
DO i=1-Olx,sNx+Olx |
480 |
|
|
IF (k.LE.kLow_C(i,j)) THEN |
481 |
m_bates |
1.6 |
IF (-r_Low(i,j,bi,bj).LE.GM_K3D_EadyMinDepth) THEN |
482 |
m_bates |
1.1 |
K3D(i,j,k,bi,bj) = GM_K3D_smallK |
483 |
|
|
ELSE |
484 |
|
|
IF (urms(i,j,k).EQ.0.0) THEN |
485 |
|
|
K3D(i,j,k,bi,bj) = GM_K3D_smallK |
486 |
|
|
ELSE |
487 |
|
|
umc(i,j,k) = ubar(i,j,k,bi,bj) - cDopp(i,j) |
488 |
|
|
supp(i,j,k) = 1/( 1 + 4*umc(i,j,k)**2/urms(i,j,1)**2 ) |
489 |
|
|
K3D(i,j,k,bi,bj) = GM_K3D_gamma*urms(i,j,k) |
490 |
|
|
& *Rmix(i,j)*supp(i,j,k) |
491 |
|
|
ENDIF |
492 |
|
|
|
493 |
|
|
C Enforce lower and upper bounds on the diffusivity |
494 |
|
|
IF (K3D(i,j,k,bi,bj).LT.GM_K3D_smallK) |
495 |
|
|
& K3D(i,j,k,bi,bj) = GM_K3D_smallK |
496 |
|
|
IF (K3D(i,j,k,bi,bj).GT.GM_maxK3D) |
497 |
|
|
& K3D(i,j,k,bi,bj) = GM_maxK3D |
498 |
|
|
ENDIF |
499 |
|
|
ENDIF |
500 |
|
|
ENDDO |
501 |
|
|
ENDDO |
502 |
|
|
ENDDO |
503 |
|
|
|
504 |
|
|
C ====================================== |
505 |
|
|
C Find the PV gradient |
506 |
|
|
C ====================================== |
507 |
m_bates |
1.3 |
C Calculate the surface layer thickness. |
508 |
|
|
C Use hMixLayer (calculated in model/src/calc_oce_mxlayer) |
509 |
|
|
C for the mixed layer depth. |
510 |
m_bates |
1.1 |
|
511 |
m_bates |
1.3 |
C Enforce a minimum surface layer depth |
512 |
m_bates |
1.1 |
DO j=1-Oly,sNy+Oly |
513 |
|
|
DO i=1-Olx,sNx+Olx |
514 |
m_bates |
1.3 |
surfkz(i,j) = MIN(-GM_K3D_surfMinDepth,-hMixLayer(i,j,bi,bj)) |
515 |
|
|
surfkz(i,j) = MAX(surfkz(i,j),R_low(i,j,bi,bj)) |
516 |
|
|
IF(maskC(i,j,1,bi,bj).EQ.0.0) surfkz(i,j)=0.0 |
517 |
|
|
surfk(i,j) = 0 |
518 |
m_bates |
1.1 |
ENDDO |
519 |
|
|
ENDDO |
520 |
m_bates |
1.4 |
DO k=1,Nr |
521 |
m_bates |
1.1 |
DO j=1-Oly,sNy+Oly |
522 |
|
|
DO i=1-Olx,sNx+Olx |
523 |
m_bates |
1.3 |
IF (rF(k).GT.surfkz(i,j) .AND. surfkz(i,j).GE.rF(k+1)) |
524 |
|
|
& surfk(i,j) = k |
525 |
m_bates |
1.1 |
ENDDO |
526 |
|
|
ENDDO |
527 |
|
|
ENDDO |
528 |
m_bates |
1.3 |
|
529 |
m_bates |
1.1 |
C Calculate the isopycnal slope |
530 |
|
|
DO j=1-Oly,sNy+Oly-1 |
531 |
|
|
DO i=1-Olx,sNx+Olx-1 |
532 |
|
|
SlopeX(i,j,1) = zeroRL |
533 |
|
|
SlopeY(i,j,1) = zeroRL |
534 |
|
|
ENDDO |
535 |
|
|
ENDDO |
536 |
|
|
DO k=2,Nr |
537 |
|
|
DO j=1-Oly+1,sNy+Oly |
538 |
|
|
DO i=1-Olx+1,sNx+Olx |
539 |
|
|
IF(surfk(i,j).GE.kLowC(i,j,bi,bj)) THEN |
540 |
|
|
C If the surface layer is thinner than the water column |
541 |
|
|
C the set the slope to zero to avoid problems. |
542 |
|
|
SlopeX(i,j,k) = zeroRL |
543 |
|
|
SlopeY(i,j,k) = zeroRL |
544 |
|
|
|
545 |
|
|
ELSE |
546 |
|
|
C Calculate the zonal slope at the western cell face (U grid) |
547 |
m_bates |
1.4 |
sigz = MIN( op5*(sigmaR(i,j,k)+sigmaR(i-1,j,k)), maxDRhoDz ) |
548 |
m_bates |
1.1 |
sigx = op5*( sigmaX(i,j,k)+sigmaX(i,j,k-1) ) |
549 |
|
|
slope = sigx/sigz |
550 |
|
|
C IF(ABS(slope).GT.GM_K3D_maxSlope) |
551 |
|
|
C & slope = SIGN(GM_K3D_maxSlope,slope) |
552 |
|
|
IF(ABS(slope).GT.GM_maxSlope) |
553 |
|
|
& slope = SIGN(GM_maxSlope,slope) |
554 |
|
|
SlopeX(i,j,k)=-maskW(i,j,k-1,bi,bj)*maskW(i,j,k,bi,bj)*slope |
555 |
|
|
|
556 |
|
|
C Calculate the meridional slope at the southern cell face (V grid) |
557 |
m_bates |
1.4 |
sigz = MIN( op5*(sigmaR(i,j,k)+sigmaR(i,j-1,k)), maxDRhoDz ) |
558 |
m_bates |
1.1 |
sigy = op5*( sigmaY(i,j,k) + sigmaY(i,j,k-1) ) |
559 |
|
|
slope = sigy/sigz |
560 |
|
|
C IF(ABS(slope).GT.GM_K3D_maxSlope) |
561 |
|
|
C & slope = SIGN(GM_K3D_maxSlope,slope) |
562 |
|
|
IF(ABS(slope).GT.GM_maxSlope) |
563 |
|
|
& slope = SIGN(GM_maxSlope,slope) |
564 |
|
|
SlopeY(i,j,k)=-maskS(i,j,k-1,bi,bj)*maskS(i,j,k,bi,bj)*slope |
565 |
|
|
ENDIF |
566 |
|
|
ENDDO |
567 |
|
|
ENDDO |
568 |
|
|
ENDDO |
569 |
|
|
|
570 |
|
|
C Calculate the thickness flux |
571 |
|
|
C Enforce a zero slope bottom boundary condition for the bottom most cells (k=Nr) |
572 |
|
|
k=Nr |
573 |
|
|
DO j=1-Oly,sNy+Oly |
574 |
|
|
DO i=1-Olx,sNx+Olx |
575 |
|
|
C Zonal thickness flux at the western cell face |
576 |
|
|
tfluxX(i,j,k) = -fCoriU(i,j)*SlopeX(i,j,k) |
577 |
|
|
& *recip_drF(k)*recip_hFacW(i,j,k,bi,bj) |
578 |
|
|
C Meridional thickness flux at the southern cell face |
579 |
|
|
tfluxY(i,j,k) = -fCoriV(i,j)*SlopeY(i,j,k) |
580 |
|
|
& *recip_drF(k)*recip_hFacS(i,j,k,bi,bj) |
581 |
|
|
ENDDO |
582 |
|
|
ENDDO |
583 |
|
|
|
584 |
|
|
C Calculate the thickness flux for other cells (k<Nr) |
585 |
|
|
C SlopeX and SlopeY are zero in dry cells, so, the bottom boundary |
586 |
|
|
C condition that the slope is zero is taken care of. |
587 |
|
|
C We still need to give special treatment for the surface layer however. |
588 |
|
|
DO k=Nr-1,1,-1 |
589 |
|
|
DO j=1-Oly,sNy+Oly-1 |
590 |
|
|
DO i=1-Olx,sNx+Olx-1 |
591 |
m_bates |
1.3 |
IF(k.LE.surfk(i,j) .AND. .NOT. GM_K3D_likeGM) THEN |
592 |
m_bates |
1.1 |
C We are in the surface layer, so set the thickness flux |
593 |
|
|
C based on the average slope over the surface layer |
594 |
|
|
C If we are on the edge of a "cliff" the surface layer at the |
595 |
|
|
C centre of the grid point could be deeper than the U or V point. |
596 |
|
|
C So, we ensure that we always take a sensible slope. |
597 |
|
|
IF(kLow_U(i,j).LT.surfk(i,j)) THEN |
598 |
|
|
kk=kLow_U(i,j) |
599 |
|
|
hsurf = -rLowW(i,j,bi,bj) |
600 |
|
|
ELSE |
601 |
|
|
kk=surfk(i,j) |
602 |
|
|
hsurf = -surfkz(i,j) |
603 |
|
|
ENDIF |
604 |
|
|
IF(kk.GT.0) THEN |
605 |
m_bates |
1.4 |
IF(kk.EQ.Nr) THEN |
606 |
|
|
tfluxX(i,j,k) = -fCoriU(i,j)*maskW(i,j,k,bi,bj) |
607 |
|
|
& *SlopeX(i,j,kk)/hsurf |
608 |
|
|
ELSE |
609 |
|
|
tfluxX(i,j,k) = -fCoriU(i,j)*maskW(i,j,k,bi,bj) |
610 |
|
|
& *( SlopeX(i,j,kk)-SlopeX(i,j,kk+1) )/hsurf |
611 |
|
|
ENDIF |
612 |
m_bates |
1.1 |
ELSE |
613 |
|
|
tfluxX(i,j,k) = zeroRL |
614 |
|
|
ENDIF |
615 |
|
|
|
616 |
|
|
IF(kLow_V(i,j).LT.surfk(i,j)) THEN |
617 |
|
|
kk=kLow_V(i,j) |
618 |
|
|
hsurf = -rLowS(i,j,bi,bj) |
619 |
|
|
ELSE |
620 |
|
|
kk=surfk(i,j) |
621 |
|
|
hsurf = -surfkz(i,j) |
622 |
|
|
ENDIF |
623 |
|
|
IF(kk.GT.0) THEN |
624 |
m_bates |
1.4 |
IF(kk.EQ.Nr) THEN |
625 |
|
|
tfluxY(i,j,k) = -fCoriV(i,j)*maskS(i,j,k,bi,bj) |
626 |
|
|
& *SlopeY(i,j,kk)/hsurf |
627 |
|
|
ELSE |
628 |
|
|
tfluxY(i,j,k) = -fCoriV(i,j)*maskS(i,j,k,bi,bj) |
629 |
|
|
& *( SlopeY(i,j,kk)-SlopeY(i,j,kk+1) )/hsurf |
630 |
|
|
ENDIF |
631 |
m_bates |
1.1 |
ELSE |
632 |
|
|
tfluxY(i,j,k) = zeroRL |
633 |
|
|
ENDIF |
634 |
|
|
|
635 |
|
|
ELSE |
636 |
|
|
C We are not in the surface layer, so calculate the thickness |
637 |
|
|
C flux based on the local isopyncal slope |
638 |
|
|
|
639 |
|
|
C Zonal thickness flux at the western cell face |
640 |
|
|
tfluxX(i,j,k)=-fCoriU(i,j)*(SlopeX(i,j,k)-SlopeX(i,j,k+1)) |
641 |
|
|
& *recip_drF(k)*recip_hFacW(i,j,k,bi,bj) |
642 |
|
|
& *maskW(i,j,k,bi,bj) |
643 |
|
|
|
644 |
|
|
C Meridional thickness flux at the southern cell face |
645 |
|
|
tfluxY(i,j,k)=-fCoriV(i,j)*(SlopeY(i,j,k)-SlopeY(i,j,k+1)) |
646 |
|
|
& *recip_drF(k)*recip_hFacS(i,j,k,bi,bj) |
647 |
|
|
& *maskS(i,j,k,bi,bj) |
648 |
|
|
ENDIF |
649 |
|
|
ENDDO |
650 |
|
|
ENDDO |
651 |
|
|
ENDDO |
652 |
|
|
|
653 |
|
|
C Calculate gradq |
654 |
m_bates |
1.5 |
IF (GM_K3D_likeGM .OR. GM_K3D_beta_eq_0) THEN |
655 |
|
|
C Ignore beta in the calculation of grad(q) |
656 |
m_bates |
1.2 |
DO k=1,Nr |
657 |
|
|
DO j=1-Oly+1,sNy+Oly |
658 |
|
|
DO i=1-Olx+1,sNx+Olx |
659 |
|
|
gradqx(i,j,k) = maskW(i,j,k,bi,bj)*tfluxX(i,j,k) |
660 |
|
|
gradqy(i,j,k) = maskS(i,j,k,bi,bj)*tfluxY(i,j,k) |
661 |
|
|
ENDDO |
662 |
|
|
ENDDO |
663 |
|
|
ENDDO |
664 |
|
|
|
665 |
|
|
ELSE |
666 |
|
|
C Do not ignore beta |
667 |
|
|
DO k=1,Nr |
668 |
|
|
DO j=1-Oly+1,sNy+Oly |
669 |
|
|
DO i=1-Olx+1,sNx+Olx |
670 |
|
|
gradqx(i,j,k) = maskW(i,j,k,bi,bj)*(dfdx(i,j)+tfluxX(i,j,k)) |
671 |
|
|
gradqy(i,j,k) = maskS(i,j,k,bi,bj)*(dfdy(i,j)+tfluxY(i,j,k)) |
672 |
|
|
ENDDO |
673 |
|
|
ENDDO |
674 |
m_bates |
1.1 |
ENDDO |
675 |
m_bates |
1.2 |
ENDIF |
676 |
m_bates |
1.1 |
|
677 |
|
|
C ====================================== |
678 |
|
|
C Find Xi and the eddy induced velocities |
679 |
|
|
C ====================================== |
680 |
|
|
C Find the buoyancy frequency at the west and south faces of a cell |
681 |
|
|
C This is necessary to find the eigenvectors at those points |
682 |
|
|
DO k=1,Nr |
683 |
|
|
DO j=1-Oly+1,sNy+Oly |
684 |
|
|
DO i=1-Olx+1,sNx+Olx |
685 |
|
|
N2W(i,j,k) = maskW(i,j,k,bi,bj) |
686 |
|
|
& *( N2(i,j,k)+N2(i-1,j,k) ) |
687 |
|
|
N2S(i,j,k) = maskS(i,j,k,bi,bj) |
688 |
|
|
& *( N2(i,j,k)+N2(i,j-1,k) ) |
689 |
|
|
ENDDO |
690 |
|
|
ENDDO |
691 |
|
|
C This fudge is necessary to avoid division by zero in gmredi_calc_eigs. |
692 |
jmc |
1.7 |
C It does not affect the end result since it is in the overlap region. |
693 |
m_bates |
1.1 |
j=1-Oly |
694 |
|
|
DO i=1-Olx,sNx+Olx |
695 |
|
|
N2W(i,j,k) = GM_K3D_minN2 |
696 |
|
|
N2S(i,j,k) = GM_K3D_minN2 |
697 |
|
|
ENDDO |
698 |
|
|
i=1-Olx |
699 |
|
|
DO j=1-Oly,sNy+Oly |
700 |
|
|
N2W(i,j,k) = GM_K3D_minN2 |
701 |
|
|
N2S(i,j,k) = GM_K3D_minN2 |
702 |
|
|
ENDDO |
703 |
|
|
ENDDO |
704 |
|
|
|
705 |
m_bates |
1.2 |
IF(GM_K3D_likeGM) THEN |
706 |
m_bates |
1.3 |
DO k=1,Nr |
707 |
|
|
DO j=1-Oly,sNy+Oly |
708 |
|
|
DO i=1-Olx,sNx+Olx |
709 |
|
|
KPV(i,j,k) = GM_K3D_constK |
710 |
|
|
ENDDO |
711 |
m_bates |
1.2 |
ENDDO |
712 |
|
|
ENDDO |
713 |
m_bates |
1.3 |
ELSE |
714 |
m_bates |
1.2 |
DO k=1,Nr |
715 |
|
|
DO j=1-Oly,sNy+Oly |
716 |
|
|
DO i=1-Olx,sNx+Olx |
717 |
m_bates |
1.3 |
KPV(i,j,k) = K3D(i,j,k,bi,bj) |
718 |
m_bates |
1.2 |
ENDDO |
719 |
|
|
ENDDO |
720 |
|
|
ENDDO |
721 |
m_bates |
1.3 |
ENDIF |
722 |
m_bates |
1.2 |
|
723 |
m_bates |
1.3 |
IF (.NOT. GM_K3D_smooth) THEN |
724 |
|
|
C Do not expand K grad(q) => no smoothing |
725 |
|
|
C May only be done with a constant K, otherwise the |
726 |
|
|
C integral constraint is violated. |
727 |
m_bates |
1.2 |
DO k=1,Nr |
728 |
|
|
DO j=1-Oly,sNy+Oly |
729 |
|
|
DO i=1-Olx,sNx+Olx |
730 |
m_bates |
1.3 |
Xix(i,j,k) = -maskW(i,j,k,bi,bj)*KPV(i,j,k)*gradqx(i,j,k) |
731 |
|
|
Xiy(i,j,k) = -maskS(i,j,k,bi,bj)*KPV(i,j,k)*gradqy(i,j,k) |
732 |
m_bates |
1.2 |
ENDDO |
733 |
|
|
ENDDO |
734 |
|
|
ENDDO |
735 |
|
|
|
736 |
|
|
ELSE |
737 |
m_bates |
1.3 |
C Expand K grad(q) in terms of baroclinic modes to smooth |
738 |
|
|
C and satisfy the integral constraint |
739 |
m_bates |
1.2 |
|
740 |
m_bates |
1.1 |
C Start with the X direction |
741 |
|
|
C ------------------------------ |
742 |
|
|
C Calculate the eigenvectors at the West face of a cell |
743 |
m_bates |
1.4 |
IF (update_modes) THEN |
744 |
|
|
CALL GMREDI_CALC_EIGS( |
745 |
|
|
I iMin,iMax,jMin,jMax,bi,bj,N2W,myThid, |
746 |
|
|
I kLow_U,maskW(:,:,:,bi,bj), |
747 |
|
|
I hfacW(:,:,:,bi,bj),recip_hfacW(:,:,:,bi,bj), |
748 |
|
|
I rLowW(:,:,bi,bj),GM_K3D_NModes,.FALSE., |
749 |
|
|
O dummy,modesW(:,:,:,:,bi,bj)) |
750 |
|
|
ENDIF |
751 |
m_bates |
1.1 |
|
752 |
|
|
C Calculate Xi_m at the west face of a cell |
753 |
|
|
DO j=1-Oly,sNy+Oly |
754 |
|
|
DO i=1-Olx,sNx+Olx |
755 |
|
|
DO m=1,GM_K3D_NModes |
756 |
|
|
XimX(m,i,j) = zeroRL |
757 |
|
|
ENDDO |
758 |
|
|
ENDDO |
759 |
|
|
ENDDO |
760 |
|
|
DO k=1,Nr |
761 |
|
|
DO j=1-Oly,sNy+Oly |
762 |
|
|
DO i=1-Olx,sNx+Olx |
763 |
|
|
DO m=1,GM_K3D_NModes |
764 |
|
|
XimX(m,i,j) = XimX(m,i,j) |
765 |
|
|
& - maskW(i,j,k,bi,bj)*drF(k)*hfacW(i,j,k,bi,bj) |
766 |
m_bates |
1.4 |
& *KPV(i,j,k)*gradqx(i,j,k)*modesW(m,i,j,k,bi,bj) |
767 |
m_bates |
1.1 |
ENDDO |
768 |
|
|
ENDDO |
769 |
|
|
ENDDO |
770 |
|
|
ENDDO |
771 |
|
|
|
772 |
|
|
C Calculate Xi in the X direction at the west face |
773 |
|
|
DO k=1,Nr |
774 |
|
|
DO j=1-Oly,sNy+Oly |
775 |
|
|
DO i=1-Olx,sNx+Olx |
776 |
|
|
Xix(i,j,k) = zeroRL |
777 |
|
|
ENDDO |
778 |
|
|
ENDDO |
779 |
|
|
ENDDO |
780 |
|
|
DO k=1,Nr |
781 |
|
|
DO j=1-Oly,sNy+Oly |
782 |
|
|
DO i=1-Olx,sNx+Olx |
783 |
|
|
DO m=1,GM_K3D_NModes |
784 |
|
|
Xix(i,j,k) = Xix(i,j,k) |
785 |
m_bates |
1.4 |
& + maskW(i,j,k,bi,bj)*XimX(m,i,j)*modesW(m,i,j,k,bi,bj) |
786 |
m_bates |
1.1 |
ENDDO |
787 |
|
|
ENDDO |
788 |
|
|
ENDDO |
789 |
|
|
ENDDO |
790 |
|
|
|
791 |
|
|
C Now the Y direction |
792 |
|
|
C ------------------------------ |
793 |
|
|
C Calculate the eigenvectors at the West face of a cell |
794 |
m_bates |
1.4 |
IF (update_modes) THEN |
795 |
|
|
CALL GMREDI_CALC_EIGS( |
796 |
|
|
I iMin,iMax,jMin,jMax,bi,bj,N2S,myThid, |
797 |
|
|
I kLow_V,maskS(:,:,:,bi,bj), |
798 |
|
|
I hfacS(:,:,:,bi,bj),recip_hfacS(:,:,:,bi,bj), |
799 |
|
|
I rLowS(:,:,bi,bj), GM_K3D_NModes, .FALSE., |
800 |
|
|
O dummy,modesS(:,:,:,:,bi,bj)) |
801 |
|
|
ENDIF |
802 |
|
|
|
803 |
m_bates |
1.1 |
DO j=1-Oly,sNy+Oly |
804 |
|
|
DO i=1-Olx,sNx+Olx |
805 |
|
|
DO m=1,GM_K3D_NModes |
806 |
|
|
XimY(m,i,j) = zeroRL |
807 |
|
|
ENDDO |
808 |
|
|
ENDDO |
809 |
|
|
ENDDO |
810 |
|
|
DO k=1,Nr |
811 |
|
|
DO j=1-Oly,sNy+Oly |
812 |
|
|
DO i=1-Olx,sNx+Olx |
813 |
|
|
DO m=1,GM_K3D_NModes |
814 |
m_bates |
1.3 |
XimY(m,i,j) = XimY(m,i,j) |
815 |
|
|
& - drF(k)*hfacS(i,j,k,bi,bj) |
816 |
m_bates |
1.4 |
& *KPV(i,j,k)*gradqy(i,j,k)*modesS(m,i,j,k,bi,bj) |
817 |
m_bates |
1.1 |
ENDDO |
818 |
|
|
ENDDO |
819 |
|
|
ENDDO |
820 |
|
|
ENDDO |
821 |
|
|
|
822 |
|
|
C Calculate Xi for Y direction at the south face |
823 |
|
|
DO k=1,Nr |
824 |
|
|
DO j=1-Oly,sNy+Oly |
825 |
|
|
DO i=1-Olx,sNx+Olx |
826 |
|
|
Xiy(i,j,k) = zeroRL |
827 |
|
|
ENDDO |
828 |
|
|
ENDDO |
829 |
|
|
ENDDO |
830 |
|
|
DO k=1,Nr |
831 |
|
|
DO j=1-Oly,sNy+Oly |
832 |
|
|
DO i=1-Olx,sNx+Olx |
833 |
|
|
DO m=1,GM_K3D_NModes |
834 |
|
|
Xiy(i,j,k) = Xiy(i,j,k) |
835 |
m_bates |
1.4 |
& + maskS(i,j,k,bi,bj)*XimY(m,i,j)*modesS(m,i,j,k,bi,bj) |
836 |
m_bates |
1.1 |
ENDDO |
837 |
|
|
ENDDO |
838 |
|
|
ENDDO |
839 |
|
|
ENDDO |
840 |
|
|
|
841 |
m_bates |
1.3 |
C ENDIF GM_K3D_likeGM |
842 |
m_bates |
1.1 |
ENDIF |
843 |
|
|
|
844 |
|
|
|
845 |
|
|
C Calculate the eddy induced velocity in the X direction at the west face |
846 |
|
|
DO k=1,Nr |
847 |
|
|
DO j=1-Oly+1,sNy+Oly |
848 |
|
|
DO i=1-Olx+1,sNx+Olx |
849 |
|
|
ustar(i,j,k) = -Xix(i,j,k)/coriU(i,j) |
850 |
|
|
ENDDO |
851 |
|
|
ENDDO |
852 |
|
|
ENDDO |
853 |
|
|
|
854 |
|
|
C Calculate the eddy induced velocity in the Y direction at the south face |
855 |
|
|
DO k=1,Nr |
856 |
|
|
DO j=1-Oly+1,sNy+Oly |
857 |
|
|
DO i=1-Olx+1,sNx+Olx |
858 |
|
|
vstar(i,j,k) = -Xiy(i,j,k)/coriV(i,j) |
859 |
|
|
ENDDO |
860 |
|
|
ENDDO |
861 |
|
|
ENDDO |
862 |
|
|
|
863 |
|
|
C ====================================== |
864 |
|
|
C Calculate the eddy induced overturning streamfunction |
865 |
|
|
C ====================================== |
866 |
|
|
#ifdef GM_K3D_PASSIVE |
867 |
|
|
k=Nr |
868 |
|
|
DO j=1-Oly,sNy+Oly |
869 |
|
|
DO i=1-Olx,sNx+Olx |
870 |
|
|
psistar(i,j,Nr) = -hfacS(i,j,k,bi,bj)*drF(k)*vstar(i,j,k) |
871 |
|
|
ENDDO |
872 |
|
|
ENDDO |
873 |
|
|
DO k=Nr-1,1,-1 |
874 |
|
|
DO j=1-Oly,sNy+Oly |
875 |
|
|
DO i=1-Olx,sNx+Olx |
876 |
|
|
psistar(i,j,k) = psistar(i,j,k+1) |
877 |
|
|
& - hfacS(i,j,k,bi,bj)*drF(k)*vstar(i,j,k) |
878 |
|
|
ENDDO |
879 |
|
|
ENDDO |
880 |
|
|
ENDDO |
881 |
|
|
|
882 |
|
|
#else |
883 |
|
|
|
884 |
|
|
IF (GM_AdvForm) THEN |
885 |
|
|
k=Nr |
886 |
|
|
DO j=1-Oly+1,sNy+1 |
887 |
|
|
DO i=1-Olx+1,sNx+1 |
888 |
|
|
GM_PsiX(i,j,k,bi,bj) = -hfacW(i,j,k,bi,bj)*drF(k)*ustar(i,j,k) |
889 |
|
|
GM_PsiY(i,j,k,bi,bj) = -hfacS(i,j,k,bi,bj)*drF(k)*vstar(i,j,k) |
890 |
|
|
ENDDO |
891 |
|
|
ENDDO |
892 |
|
|
DO k=Nr-1,1,-1 |
893 |
|
|
DO j=1-Oly+1,sNy+1 |
894 |
|
|
DO i=1-Olx+1,sNx+1 |
895 |
|
|
GM_PsiX(i,j,k,bi,bj) = GM_PsiX(i,j,k+1,bi,bj) |
896 |
|
|
& - hfacW(i,j,k,bi,bj)*drF(k)*ustar(i,j,k) |
897 |
|
|
GM_PsiY(i,j,k,bi,bj) = GM_PsiY(i,j,k+1,bi,bj) |
898 |
|
|
& - hfacS(i,j,k,bi,bj)*drF(k)*vstar(i,j,k) |
899 |
|
|
ENDDO |
900 |
|
|
ENDDO |
901 |
|
|
ENDDO |
902 |
|
|
|
903 |
|
|
ENDIF |
904 |
|
|
#endif |
905 |
|
|
|
906 |
|
|
#ifdef ALLOW_DIAGNOSTICS |
907 |
|
|
C Diagnostics |
908 |
|
|
IF ( useDiagnostics ) THEN |
909 |
|
|
CALL DIAGNOSTICS_FILL(K3D, 'GM_K3D ',0,Nr,0,1,1,myThid) |
910 |
|
|
CALL DIAGNOSTICS_FILL(urms, 'GM_URMS ',0,Nr,0,1,1,myThid) |
911 |
|
|
CALL DIAGNOSTICS_FILL(Rdef, 'GM_RDEF ',0, 1,0,1,1,myThid) |
912 |
m_bates |
1.8 |
CALL DIAGNOSTICS_FILL(Rurms, 'GM_RURMS',0, 1,0,1,1,myThid) |
913 |
|
|
CALL DIAGNOSTICS_FILL(RRhines,'GM_RRHNS',0, 1,0,1,1,myThid) |
914 |
m_bates |
1.1 |
CALL DIAGNOSTICS_FILL(Rmix, 'GM_RMIX ',0, 1,0,1,1,myThid) |
915 |
|
|
CALL DIAGNOSTICS_FILL(supp, 'GM_SUPP ',0,Nr,0,1,1,myThid) |
916 |
|
|
CALL DIAGNOSTICS_FILL(Xix, 'GM_Xix ',0,Nr,0,1,1,myThid) |
917 |
|
|
CALL DIAGNOSTICS_FILL(Xiy, 'GM_Xiy ',0,Nr,0,1,1,myThid) |
918 |
|
|
CALL DIAGNOSTICS_FILL(cDopp, 'GM_C ',0, 1,0,1,1,myThid) |
919 |
|
|
CALL DIAGNOSTICS_FILL(Ubaro, 'GM_UBARO',0, 1,0,1,1,myThid) |
920 |
|
|
CALL DIAGNOSTICS_FILL(eady, 'GM_EADY ',0, 1,0,1,1,myThid) |
921 |
|
|
CALL DIAGNOSTICS_FILL(SlopeX, 'GM_Sx ',0,Nr,0,1,1,myThid) |
922 |
|
|
CALL DIAGNOSTICS_FILL(SlopeY, 'GM_Sy ',0,Nr,0,1,1,myThid) |
923 |
|
|
CALL DIAGNOSTICS_FILL(tfluxX, 'GM_TFLXX',0,Nr,0,1,1,myThid) |
924 |
|
|
CALL DIAGNOSTICS_FILL(tfluxY, 'GM_TFLXY',0,Nr,0,1,1,myThid) |
925 |
|
|
CALL DIAGNOSTICS_FILL(gradqx, 'GM_dqdx ',0,Nr,0,1,1,myThid) |
926 |
|
|
CALL DIAGNOSTICS_FILL(gradqy, 'GM_dqdy ',0,Nr,0,1,1,myThid) |
927 |
|
|
CALL DIAGNOSTICS_FILL(surfkz, 'GM_SFLYR',0, 1,0,1,1,myThid) |
928 |
|
|
CALL DIAGNOSTICS_FILL(ustar, 'GM_USTAR',0,Nr,0,1,1,myThid) |
929 |
|
|
CALL DIAGNOSTICS_FILL(vstar, 'GM_VSTAR',0,Nr,0,1,1,myThid) |
930 |
|
|
CALL DIAGNOSTICS_FILL(umc, 'GM_UMC ',0,Nr,0,1,1,myThid) |
931 |
|
|
CALL DIAGNOSTICS_FILL(ubar, 'GM_UBAR ',0,Nr,0,1,1,myThid) |
932 |
m_bates |
1.4 |
CALL DIAGNOSTICS_FILL(modesC(1,:,:,:,bi,bj), |
933 |
|
|
& 'GM_MODEC',0,Nr,0,1,1,myThid) |
934 |
m_bates |
1.1 |
ENDIF |
935 |
|
|
#endif |
936 |
|
|
|
937 |
|
|
#endif /* GM_K3D */ |
938 |
|
|
RETURN |
939 |
|
|
END |