C $Header: /home/ubuntu/mnt/e9_copy/MITgcm/model/src/solve_uv_tridiago.F,v 1.1 2012/12/16 19:11:53 jmc Exp $ C $Name: $ #include "CPP_OPTIONS.h" CBOP C !ROUTINE: SOLVE_UV_TRIDIAGO C !INTERFACE: SUBROUTINE SOLVE_UV_TRIDIAGO( I kSize, ols, solve4u, solve4v, I aU, bU, cU, rhsU, I aV, bV, cV, rhsV, O uFld, vFld, O errCode, I subIter, myIter, myThid ) C !DESCRIPTION: \bv C *==========================================================* C | S/R SOLVE_UV_TRIDIAGO C | o Solve a pair of tri-diagonal system along X and Y lines C | (in X-dir for uFld and in Y-dir for vFld) C *==========================================================* C | o Used, e.g., in linear part of seaice LSR solver C *==========================================================* C \ev C !USES: IMPLICIT NONE C == Global data == #include "SIZE.h" #include "EEPARAMS.h" C !INPUT/OUTPUT PARAMETERS: C == Routine Arguments == C kSize :: size in 3rd dimension C ols :: size of overlap (of input arg array) C solve4u :: logical flag, do solve for u-component if true C solve4v :: logical flag, do solve for v-component if true C aU,bU,cU :: u-matrix (lower diagonal, main diagonal & upper diagonal) C rhsU :: RHS vector (u-component) C aV,bV,cV :: v-matrix (lower diagonal, main diagonal & upper diagonal) C rhsV :: RHS vector (v-component) C uFld :: X = solution of: A_u * X = rhsU C vFld :: X = solution of: A_v * X = rhsV C errCode :: > 0 if singular matrix C subIter :: current sub-iteration number C myIter :: current iteration number C myThid :: my Thread Id number INTEGER kSize, ols LOGICAL solve4u, solve4v _RL aU (1-ols:sNx+ols,1-ols:sNy+ols,kSize,nSx,nSy) _RL bU (1-ols:sNx+ols,1-ols:sNy+ols,kSize,nSx,nSy) _RL cU (1-ols:sNx+ols,1-ols:sNy+ols,kSize,nSx,nSy) _RL rhsU(1-ols:sNx+ols,1-ols:sNy+ols,kSize,nSx,nSy) _RL aV (1-ols:sNx+ols,1-ols:sNy+ols,kSize,nSx,nSy) _RL bV (1-ols:sNx+ols,1-ols:sNy+ols,kSize,nSx,nSy) _RL cV (1-ols:sNx+ols,1-ols:sNy+ols,kSize,nSx,nSy) _RL rhsV(1-ols:sNx+ols,1-ols:sNy+ols,kSize,nSx,nSy) _RL uFld(1-OLx:sNx+OLx,1-OLy:sNy+OLy,kSize,nSx,nSy) _RL vFld(1-OLx:sNx+OLx,1-OLy:sNy+OLy,kSize,nSx,nSy) INTEGER errCode INTEGER subIter, myIter, myThid C !SHARED LOCAL VARIABLES: C aTu, cTu, yTu :: tile edges coeff and RHS for u-component C aTv, cTv, yTv :: tile edges coeff and RHS for v-component COMMON /SOLVE_UV_3DIAG_LOCAL/ & aTu, cTu, yTu, aTv, cTv, yTv _RL aTu(2,1:sNy,nSx,nSy) _RL cTu(2,1:sNy,nSx,nSy) _RL yTu(2,1:sNy,nSx,nSy) _RL aTv(2,1:sNx,nSx,nSy) _RL cTv(2,1:sNx,nSx,nSy) _RL yTv(2,1:sNx,nSx,nSy) C !LOCAL VARIABLES: C == Local variables == INTEGER bi, bj, bm, bp INTEGER i,j,k INTEGER ii, im, ip INTEGER jj, jm, jp _RL tmpVar _RL uTmp1, uTmp2, vTmp1, vTmp2 _RL alpU(1:sNx,1:sNy,nSx,nSy) _RL gamU(1:sNx,1:sNy,nSx,nSy) _RL yy_U(1:sNx,1:sNy,nSx,nSy) _RL alpV(1:sNx,1:sNy,nSx,nSy) _RL gamV(1:sNx,1:sNy,nSx,nSy) _RL yy_V(1:sNx,1:sNy,nSx,nSy) CEOP errCode = 0 IF ( .NOT.solve4u .AND. .NOT.solve4v ) RETURN C-- outside loop on level number k DO k = 1,kSize IF ( solve4u ) THEN DO bj=myByLo(myThid),myByHi(myThid) DO bi=myBxLo(myThid),myBxHi(myThid) C-- work on local copy: DO j= 1,sNy DO i= 1,sNx alpU(i,j,bi,bj) = aU(i,j,k,bi,bj) gamU(i,j,bi,bj) = cU(i,j,k,bi,bj) yy_U(i,j,bi,bj) = rhsU(i,j,k,bi,bj) ENDDO ENDDO C-- Beginning of forward sweep (i=1) i = 1 DO j= 1,sNy C- normalise row [1] ( 1 on main diagonal) tmpVar = bU(i,j,k,bi,bj) IF ( tmpVar.NE.0. _d 0 ) THEN tmpVar = 1. _d 0 / tmpVar ELSE tmpVar = 0. _d 0 errCode = 1 ENDIF gamU(i,j,bi,bj) = gamU(i,j,bi,bj)*tmpVar alpU(i,j,bi,bj) = alpU(i,j,bi,bj)*tmpVar yy_U(i,j,bi,bj) = yy_U(i,j,bi,bj)*tmpVar ENDDO C-- Middle of forward sweep (i=2:sNx) DO j= 1,sNy DO i= 2,sNx im = i-1 C- update row [i] <-- [i] - alp_i * [i-1] and normalise (main diagonal = 1) tmpVar = bU(i,j,k,bi,bj) - alpU(i,j,bi,bj)*gamU(im,j,bi,bj) IF ( tmpVar.NE.0. _d 0 ) THEN tmpVar = 1. _d 0 / tmpVar ELSE tmpVar = 0. _d 0 errCode = 1 ENDIF yy_U(i,j,bi,bj) = ( yy_U(i,j,bi,bj) & - alpU(i,j,bi,bj)*yy_U(im,j,bi,bj) & )*tmpVar gamU(i,j,bi,bj) = gamU(i,j,bi,bj)*tmpVar alpU(i,j,bi,bj) = - alpU(i,j,bi,bj)*alpU(im,j,bi,bj)*tmpVar ENDDO ENDDO C-- Backward sweep (i=sNx-1:-1:1) DO j= 1,sNy DO ii= 1,sNx-1 i = sNx - ii ip = i+1 C- update row [i] <-- [i] - gam_i * [i+1] yy_U(i,j,bi,bj) = yy_U(i,j,bi,bj) & - gamU(i,j,bi,bj)*yy_U(ip,j,bi,bj) alpU(i,j,bi,bj) = alpU(i,j,bi,bj) & - gamU(i,j,bi,bj)*alpU(ip,j,bi,bj) gamU(i,j,bi,bj) = -gamU(i,j,bi,bj)*gamU(ip,j,bi,bj) ENDDO ENDDO C-- At this stage, the 3-diagonal system is reduced to Identity with two C more columns (alp & gam) corresponding to unknow X(i=0) and X(i=sNx+1): C X_0 C alp 1 0 ... 0 0 gam X_1 Y_1 C alp 0 1 ... 0 0 gam X_2 Y_2 C C . . . ... . . . . . C ( . . . ... . . . )( . ) = ( . ) C . . . ... . . . . . C C alp 0 0 ... 1 0 gam X_n-1 Y_n-1 C alp 0 0 ... 0 1 gam X_n Y_n C X_n+1 C----- C-- Store tile edges coeff: (1) <--> i=1 ; (2) <--> i=sNx DO j= 1,sNy aTu(1,j,bi,bj) = alpU( 1, j,bi,bj) cTu(1,j,bi,bj) = gamU( 1, j,bi,bj) yTu(1,j,bi,bj) = yy_U( 1, j,bi,bj) aTu(2,j,bi,bj) = alpU(sNx,j,bi,bj) cTu(2,j,bi,bj) = gamU(sNx,j,bi,bj) yTu(2,j,bi,bj) = yy_U(sNx,j,bi,bj) ENDDO C end bi,bj-loops ENDDO ENDDO C-- Solve for tile edges values IF ( nPx*nPy.GT.1 .OR. useCubedSphereExchange ) THEN STOP 'ABNORMAL END: S/R SOLVE_UV_TRIDIAGO: missing code' ENDIF _BARRIER _BEGIN_MASTER(myThid) DO bj=1,nSy DO j=1,sNy DO bi=2,nSx bm = bi-1 C- update row [1,bi] <- [1,bi] - a(1,bi)*[2,bi-1] (& normalise diag) tmpVar = oneRL - aTu(1,j,bi,bj)*cTu(2,j,bm,bj) IF ( tmpVar.NE.0. _d 0 ) THEN tmpVar = 1. _d 0 / tmpVar ELSE tmpVar = 0. _d 0 errCode = 1 ENDIF yTu(1,j,bi,bj) = ( yTu(1,j,bi,bj) & - aTu(1,j,bi,bj)*yTu(2,j,bm,bj) & )*tmpVar cTu(1,j,bi,bj) = cTu(1,j,bi,bj)*tmpVar aTu(1,j,bi,bj) = - aTu(1,j,bi,bj)*aTu(2,j,bm,bj)*tmpVar C- update row [2,bi] <- [2,bi] - a(2,bi)*[2,bi-1] + a(2,bi)*c(2,bi-1)*[1,bi] tmpVar = aTu(2,j,bi,bj)*cTu(2,j,bm,bj) yTu(2,j,bi,bj) = yTu(2,j,bi,bj) & - aTu(2,j,bi,bj)*yTu(2,j,bm,bj) & + tmpVar*yTu(1,j,bi,bj) cTu(2,j,bi,bj) = cTu(2,j,bi,bj) & + tmpVar*cTu(1,j,bi,bj) aTu(2,j,bi,bj) = -aTu(2,j,bi,bj)*aTu(2,j,bm,bj) & + tmpVar*aTu(1,j,bi,bj) ENDDO DO bi=nSx-1,1,-1 bp = bi+1 DO i=1,2 C- update row [1,bi] <- [1,bi] - c(1,bi)*[1,bi+1] C- update row [2,bi] <- [2,bi] - c(2,bi)*[1,bi+1] aTu(i,j,bi,bj) = aTu(i,j,bi,bj) & - cTu(i,j,bi,bj)*aTu(1,j,bp,bj) yTu(i,j,bi,bj) = yTu(i,j,bi,bj) & - cTu(i,j,bi,bj)*yTu(1,j,bp,bj) cTu(i,j,bi,bj) = -cTu(i,j,bi,bj)*cTu(1,j,bp,bj) ENDDO ENDDO C-- periodic in X: X_0 <=> X_Nx and X_(N+1) <=> X_1 ; C find the value at the 2 opposite location (i=1 and i=Nx) bm = 1 bp = nSx cTu(1,j,bm,bj) = oneRL + cTu(1,j,bm,bj) aTu(2,j,bp,bj) = oneRL + aTu(2,j,bp,bj) tmpVar = cTu(1,j,bm,bj) * aTu(2,j,bp,bj) & - aTu(1,j,bm,bj) * cTu(2,j,bp,bj) IF ( tmpVar.NE.0. _d 0 ) THEN tmpVar = 1. _d 0 / tmpVar ELSE tmpVar = 0. _d 0 errCode = 1 ENDIF uTmp1 = ( aTu(2,j,bp,bj) * yTu(1,j,bm,bj) & - aTu(1,j,bm,bj) * yTu(2,j,bp,bj) & )*tmpVar uTmp2 = ( cTu(1,j,bm,bj) * yTu(2,j,bp,bj) & - cTu(2,j,bp,bj) * yTu(1,j,bm,bj) & )*tmpVar C- finalise tile-edges solution (put into RHS "yTu"): DO bi=1,nSx DO i=1,2 IF ( bi+i .EQ.2 ) THEN yTu(i,j,bi,bj) = uTmp1 ELSEIF ( bi+i .EQ. nSx+2 ) THEN yTu(i,j,bi,bj) = uTmp2 ELSE yTu(i,j,bi,bj) = yTu(i,j,bi,bj) & - aTu(i,j,bi,bj) * uTmp2 & - cTu(i,j,bi,bj) * uTmp1 ENDIF ENDDO ENDDO ENDDO ENDDO _END_MASTER(myThid) _BARRIER DO bj=myByLo(myThid),myByHi(myThid) DO bi=myBxLo(myThid),myBxHi(myThid) bm = 1 + MOD(bi-2+nSx,nSx) bp = 1 + MOD(bi-0+nSx,nSx) DO j= 1,sNy DO i= 1,sNx uFld(i,j,k,bi,bj) = yy_U(i,j,bi,bj) & - alpU(i,j,bi,bj) * yTu(2,j,bm,bj) & - gamU(i,j,bi,bj) * yTu(1,j,bp,bj) ENDDO ENDDO ENDDO ENDDO C end solve for uFld ENDIF IF ( solve4v ) THEN DO bj=myByLo(myThid),myByHi(myThid) DO bi=myBxLo(myThid),myBxHi(myThid) C-- work on local copy: DO j= 1,sNy DO i= 1,sNx alpV(i,j,bi,bj) = aV(i,j,k,bi,bj) gamV(i,j,bi,bj) = cV(i,j,k,bi,bj) yy_V(i,j,bi,bj) = rhsV(i,j,k,bi,bj) ENDDO ENDDO C-- Beginning of forward sweep (j=1) j = 1 DO i= 1,sNx C- normalise row [1] ( 1 on main diagonal) tmpVar = bV(i,j,k,bi,bj) IF ( tmpVar.NE.0. _d 0 ) THEN tmpVar = 1. _d 0 / tmpVar ELSE tmpVar = 0. _d 0 errCode = 1 ENDIF gamV(i,j,bi,bj) = gamV(i,j,bi,bj)*tmpVar alpV(i,j,bi,bj) = alpV(i,j,bi,bj)*tmpVar yy_V(i,j,bi,bj) = yy_V(i,j,bi,bj)*tmpVar ENDDO C-- Middle of forward sweep (j=2:sNy) DO i= 1,sNx DO j= 2,sNy jm = j-1 C- update row [j] <-- [j] - alp_j * [j-1] and normalise (main diagonal = 1) tmpVar = bV(i,j,k,bi,bj) - alpV(i,j,bi,bj)*gamV(i,jm,bi,bj) IF ( tmpVar.NE.0. _d 0 ) THEN tmpVar = 1. _d 0 / tmpVar ELSE tmpVar = 0. _d 0 errCode = 1 ENDIF yy_V(i,j,bi,bj) = ( yy_V(i,j,bi,bj) & - alpV(i,j,bi,bj)*yy_V(i,jm,bi,bj) & )*tmpVar gamV(i,j,bi,bj) = gamV(i,j,bi,bj)*tmpVar alpV(i,j,bi,bj) = - alpV(i,j,bi,bj)*alpV(i,jm,bi,bj)*tmpVar ENDDO ENDDO C-- Backward sweep (j=sNy-1:-1:1) DO i= 1,sNx DO jj= 1,sNy-1 j = sNy - jj jp = j+1 C- update row [j] <-- [j] - gam_j * [j+1] yy_V(i,j,bi,bj) = yy_V(i,j,bi,bj) & - gamV(i,j,bi,bj)*yy_V(i,jp,bi,bj) alpV(i,j,bi,bj) = alpV(i,j,bi,bj) & - gamV(i,j,bi,bj)*alpV(i,jp,bi,bj) gamV(i,j,bi,bj) = -gamV(i,j,bi,bj)*gamV(i,jp,bi,bj) ENDDO ENDDO C-- At this stage, the 3-diagonal system is reduced to Identity with two C more columns (alp & gam) corresponding to unknow X(j=0) and X(j=sNy+1) C-- Store tile edges coeff: (1) <--> j=1 ; (2) <--> j=sNy DO i= 1,sNx aTv(1,i,bi,bj) = alpV(i, 1, bi,bj) cTv(1,i,bi,bj) = gamV(i, 1, bi,bj) yTv(1,i,bi,bj) = yy_V(i, 1, bi,bj) aTv(2,i,bi,bj) = alpV(i,sNy,bi,bj) cTv(2,i,bi,bj) = gamV(i,sNy,bi,bj) yTv(2,i,bi,bj) = yy_V(i,sNy,bi,bj) ENDDO C end bi,bj-loops ENDDO ENDDO C-- Solve for tile edges values IF ( nPx*nPy.GT.1 .OR. useCubedSphereExchange ) THEN STOP 'ABNORMAL END: S/R SOLVE_UV_TRIDIAGO: missing code' ENDIF _BARRIER _BEGIN_MASTER(myThid) DO bi=1,nSx DO i=1,sNx DO bj=2,nSy bm = bj-1 C- update row [1,bj] <- [1,bj] - a(1,bj)*[2,bj-1] (& normalise diag) tmpVar = oneRL - aTv(1,i,bi,bj)*cTv(2,i,bi,bm) IF ( tmpVar.NE.0. _d 0 ) THEN tmpVar = 1. _d 0 / tmpVar ELSE tmpVar = 0. _d 0 errCode = 1 ENDIF yTv(1,i,bi,bj) = ( yTv(1,i,bi,bj) & - aTv(1,i,bi,bj)*yTv(2,i,bi,bm) & )*tmpVar cTv(1,i,bi,bj) = cTv(1,i,bi,bj)*tmpVar aTv(1,i,bi,bj) = - aTv(1,i,bi,bj)*aTv(2,i,bi,bm)*tmpVar C- update row [2,bj] <- [2,bj] - a(2,bj)*[2,bj-1] + a(2,bj)*c(2,bj-1)*[1,bj] tmpVar = aTv(2,i,bi,bj)*cTv(2,i,bi,bm) yTv(2,i,bi,bj) = yTv(2,i,bi,bj) & - aTv(2,i,bi,bj)*yTv(2,i,bi,bm) & + tmpVar*yTv(1,i,bi,bj) cTv(2,i,bi,bj) = cTv(2,i,bi,bj) & + tmpVar*cTv(1,i,bi,bj) aTv(2,i,bi,bj) = -aTv(2,i,bi,bj)*aTv(2,i,bi,bm) & + tmpVar*aTv(1,i,bi,bj) ENDDO DO bj=nSy-1,1,-1 bp = bj+1 DO j=1,2 C- update row [1,bj] <- [1,bj] - c(1,bj)*[1,bj+1] C- update row [2,bj] <- [2,bj] - c(2,bj)*[1,bj+1] aTv(j,i,bi,bj) = aTv(j,i,bi,bj) & - cTv(j,i,bi,bj)*aTv(1,i,bi,bp) yTv(j,i,bi,bj) = yTv(j,i,bi,bj) & - cTv(j,i,bi,bj)*yTv(1,i,bi,bp) cTv(j,i,bi,bj) = -cTv(j,i,bi,bj)*cTv(1,i,bi,bp) ENDDO ENDDO C-- periodic in Y: X_0 <=> X_Ny and X_(N+1) <=> X_1 ; C find the value at the 2 opposite location (j=1 and j=Ny) bm = 1 bp = nSy cTv(1,i,bi,bm) = oneRL + cTv(1,i,bi,bm) aTv(2,i,bi,bp) = oneRL + aTv(2,i,bi,bp) tmpVar = cTv(1,i,bi,bm) * aTv(2,i,bi,bp) & - aTv(1,i,bi,bm) * cTv(2,i,bi,bp) IF ( tmpVar.NE.0. _d 0 ) THEN tmpVar = 1. _d 0 / tmpVar ELSE tmpVar = 0. _d 0 errCode = 1 ENDIF vTmp1 = ( aTv(2,i,bi,bp) * yTv(1,i,bi,bm) & - aTv(1,i,bi,bm) * yTv(2,i,bi,bp) & )*tmpVar vTmp2 = ( cTv(1,i,bi,bm) * yTv(2,i,bi,bp) & - cTv(2,i,bi,bp) * yTv(1,i,bi,bm) & )*tmpVar C- finalise tile-edges solution (put into RHS "yTv"): DO bj=1,nSy DO j=1,2 IF ( bj+j .EQ.2 ) THEN yTv(j,i,bi,bj) = vTmp1 ELSEIF ( bj+j .EQ. nSy+2 ) THEN yTv(j,i,bi,bj) = vTmp2 ELSE yTv(j,i,bi,bj) = yTv(j,i,bi,bj) & - aTv(j,i,bi,bj) * vTmp2 & - cTv(j,i,bi,bj) * vTmp1 ENDIF ENDDO ENDDO ENDDO ENDDO _END_MASTER(myThid) _BARRIER DO bj=myByLo(myThid),myByHi(myThid) DO bi=myBxLo(myThid),myBxHi(myThid) bm = 1 + MOD(bj-2+nSy,nSy) bp = 1 + MOD(bj-0+nSy,nSy) DO j= 1,sNy DO i= 1,sNx vFld(i,j,k,bi,bj) = yy_V(i,j,bi,bj) & - alpV(i,j,bi,bj) * yTv(2,i,bi,bm) & - gamV(i,j,bi,bj) * yTv(1,i,bi,bp) ENDDO ENDDO ENDDO ENDDO C end solve for vFld ENDIF C end k-loop ENDDO RETURN END