c c $Header$ c SUBROUTINE grid_noro(imdep, jmdep, xdata, ydata, zdata, . imar, jmar, x, y, . zphi,zmea,zstd,zsig,zgam,zthe, . zpic,zval,mask) c======================================================================= c (F. Lott) (voir aussi z.x. Li, A. Harzallah et L. Fairhead) c c Compute the Parameters of the SSO scheme as described in c LOTT & MILLER (1997) and LOTT(1999). c Target points are on a rectangular grid: c iim+1 latitudes including North and South Poles; c jjm+1 longitudes, with periodicity jjm+1=1. c aux poles. At the poles the fields value is repeated c jjm+1 time. c The parameters a,b,c,d represent the limite of the target c gridpoint region. The means over this region are calculated c from USN data, ponderated by a weight proportional to the c surface occupated by the data inside the model gridpoint area. c In most circumstances, this weight is the ratio between the c surface of the USN gridpoint area and the surface of the c model gridpoint area. c c (c) c ----d----- c | . . . .| c | | c (b)a . * . .b(a) c | | c | . . . .| c ----c----- c (d) C======================================================================= c INPUT: c imdep, jmdep: dimensions X and Y input field c xdata, ydata: coordinates X and Y input field c zdata: Input field c In this version it is assumed that the entry data come from c the USNavy dataset: imdep=iusn=2160, jmdep=jusn=1080. c OUTPUT: c imar, jmar: dimensions X and Y Output field c x, y: ccordinates X and Y Output field. c zmea: Mean orographie c zstd: Standard deviation c zsig: Slope c zgam: Anisotropy c zthe: Orientation of the small axis c zpic: Maximum altitude c zval: Minimum altitude C======================================================================= IMPLICIT INTEGER (I,J) IMPLICIT REAL(X,Z) parameter(iusn=2160,jusn=1080,iext=216, epsfra = 1.e-5) #include "dimensions.h" REAL xusn(iusn+2*iext),yusn(jusn+2) REAL zusn(iusn+2*iext,jusn+2) INTEGER imdep, jmdep REAL xdata(imdep),ydata(jmdep) REAL zdata(imdep,jmdep) c INTEGER imar, jmar C INTERMEDIATE FIELDS (CORRELATIONS OF OROGRAPHY GRADIENT) REAL ztz(iim+1,jjm+1),zxtzx(iim+1,jjm+1) REAL zytzy(iim+1,jjm+1),zxtzy(iim+1,jjm+1) REAL weight(iim+1,jjm+1) C CORRELATIONS OF USN OROGRAPHY GRADIENTS REAL zxtzxusn(iusn+2*iext,jusn+2),zytzyusn(iusn+2*iext,jusn+2) REAL zxtzyusn(iusn+2*iext,jusn+2) REAL x(imar+1),y(jmar),zphi(imar+1,jmar) REAL zmea(imar+1,jmar),zstd(imar+1,jmar) REAL zsig(imar+1,jmar),zgam(imar+1,jmar),zthe(imar+1,jmar) REAL zpic(imar+1,jmar),zval(imar+1,jmar) c$$$ PB integer mask(imar+1,jmar) real mask(imar+1,jmar), mask_tmp(imar+1,jmar) real num_tot(2200,1100),num_lan(2200,1100) c REAL a(2200),b(2200),c(1100),d(1100) logical masque_lu c print *,' parametres de l orographie a l echelle sous maille' xpi=acos(-1.) rad = 6 371 229. zdeltay=2.*xpi/float(jusn)*rad c c utilise-t'on un masque lu? c masque_lu = .true. if (maxval(mask) == -99999 .and. minval(mask) == -99999) then masque_lu= .false. masque = 0.0 endif write(*,*)'Masque lu', masque_lu c c quelques tests de dimensions: c c if(iim.ne.imar) STOP 'Problem dim. x' if(jjm.ne.jmar-1) STOP 'Problem dim. y' IF (imar.GT.2200 .OR. jmar.GT.1100) THEN PRINT*, 'imar or jmar too big', imar, jmar CALL ABORT ENDIF IF(imdep.ne.iusn.or.jmdep.ne.jusn)then print *,' imdep or jmdep bad dimensions:',imdep,jmdep call abort ENDIF IF(imar+1.ne.iim+1.or.jmar.ne.jjm+1)THEN print *,' imar or jmar bad dimensions:',imar,jmar call abort ENDIF c print *,'xdata:',xdata c print *,'ydata:',ydata c print *,'x:',x c print *,'y:',y c C EXTENSION OF THE USN DATABASE TO POCEED COMPUTATIONS AT C BOUNDARIES: c DO j=1,jusn yusn(j+1)=ydata(j) DO i=1,iusn zusn(i+iext,j+1)=zdata(i,j) xusn(i+iext)=xdata(i) ENDDO DO i=1,iext zusn(i,j+1)=zdata(iusn-iext+i,j) xusn(i)=xdata(iusn-iext+i)-2.*xpi zusn(iusn+iext+i,j+1)=zdata(i,j) xusn(iusn+iext+i)=xdata(i)+2.*xpi ENDDO ENDDO yusn(1)=ydata(1)+(ydata(1)-ydata(2)) yusn(jusn+2)=ydata(jusn)+(ydata(jusn)-ydata(jusn-1)) DO i=1,iusn/2+iext zusn(i,1)=zusn(i+iusn/2,2) zusn(i+iusn/2+iext,1)=zusn(i,2) zusn(i,jusn+2)=zusn(i+iusn/2,jusn+1) zusn(i+iusn/2+iext,jusn+2)=zusn(i,jusn+1) ENDDO c c COMPUTE LIMITS OF MODEL GRIDPOINT AREA C ( REGULAR GRID) c a(1) = x(1) - (x(2)-x(1))/2.0 b(1) = (x(1)+x(2))/2.0 DO i = 2, imar a(i) = b(i-1) b(i) = (x(i)+x(i+1))/2.0 ENDDO a(imar+1) = b(imar) b(imar+1) = x(imar+1) + (x(imar+1)-x(imar))/2.0 c(1) = y(1) - (y(2)-y(1))/2.0 d(1) = (y(1)+y(2))/2.0 DO j = 2, jmar-1 c(j) = d(j-1) d(j) = (y(j)+y(j+1))/2.0 ENDDO c(jmar) = d(jmar-1) d(jmar) = y(jmar) + (y(jmar)-y(jmar-1))/2.0 c c initialisations: c DO i = 1, imar+1 DO j = 1, jmar weight(i,j) = 0.0 zxtzx(i,j) = 0.0 zytzy(i,j) = 0.0 zxtzy(i,j) = 0.0 ztz(i,j) = 0.0 zmea(i,j) = 0.0 zpic(i,j) =-1.E+10 zval(i,j) = 1.E+10 ENDDO ENDDO c c COMPUTE SLOPES CORRELATIONS ON USN GRID c DO j = 1,jusn+2 DO i = 1, iusn+2*iext zytzyusn(i,j)=0.0 zxtzxusn(i,j)=0.0 zxtzyusn(i,j)=0.0 ENDDO ENDDO DO j = 2,jusn+1 zdeltax=zdeltay*cos(yusn(j)) DO i = 2, iusn+2*iext-1 zytzyusn(i,j)=(zusn(i,j+1)-zusn(i,j-1))**2/zdeltay**2 zxtzxusn(i,j)=(zusn(i+1,j)-zusn(i-1,j))**2/zdeltax**2 zxtzyusn(i,j)=(zusn(i,j+1)-zusn(i,j-1))/zdeltay * *(zusn(i+1,j)-zusn(i-1,j))/zdeltax ENDDO ENDDO c c SUMMATION OVER GRIDPOINT AREA c zleny=xpi/float(jusn)*rad xincr=xpi/2./float(jusn) DO ii = 1, imar+1 DO jj = 1, jmar num_tot(ii,jj)=0. num_lan(ii,jj)=0. c PRINT *,' iteration ii jj:',ii,jj DO j = 2,jusn+1 c DO j = 3,jusn zlenx=zleny*cos(yusn(j)) zdeltax=zdeltay*cos(yusn(j)) zbordnor=(c(jj)-yusn(j)+xincr)*rad zbordsud=(yusn(j)-d(jj)+xincr)*rad weighy=AMAX1(0., * amin1(zbordnor,zbordsud,zleny)) IF(weighy.ne.0)THEN DO i = 2, iusn+2*iext-1 zbordest=(xusn(i)-a(ii)+xincr)*rad*cos(yusn(j)) zbordoue=(b(ii)+xincr-xusn(i))*rad*cos(yusn(j)) weighx=AMAX1(0., * amin1(zbordest,zbordoue,zlenx)) IF(weighx.ne.0)THEN num_tot(ii,jj)=num_tot(ii,jj)+1.0 if(zusn(i,j).ge.1.)num_lan(ii,jj)=num_lan(ii,jj)+1.0 weight(ii,jj)=weight(ii,jj)+weighx*weighy zxtzx(ii,jj)=zxtzx(ii,jj)+zxtzxusn(i,j)*weighx*weighy zytzy(ii,jj)=zytzy(ii,jj)+zytzyusn(i,j)*weighx*weighy zxtzy(ii,jj)=zxtzy(ii,jj)+zxtzyusn(i,j)*weighx*weighy ztz(ii,jj) =ztz(ii,jj) +zusn(i,j)*zusn(i,j)*weighx*weighy c mean zmea(ii,jj) =zmea(ii,jj)+zusn(i,j)*weighx*weighy c peacks zpic(ii,jj)=amax1(zpic(ii,jj),zusn(i,j)) c valleys zval(ii,jj)=amin1(zval(ii,jj),zusn(i,j)) ENDIF ENDDO ENDIF ENDDO ENDDO ENDDO c c COMPUTE PARAMETERS NEEDED BY THE LOTT & MILLER (1997) AND C LOTT (1999) SSO SCHEME. c zllmmea=0. zllmstd=0. zllmsig=0. zllmgam=0. zllmpic=0. zllmval=0. zllmthe=0. zminthe=0. c print 100,' ' c100 format(1X,A1,'II JJ',4X,'H',8X,'SD',8X,'SI',3X,'GA',3X,'TH') DO ii = 1, imar+1 DO jj = 1, jmar IF (weight(ii,jj) .NE. 0.0) THEN c Mask c$$$ if(num_lan(ii,jj)/num_tot(ii,jj).ge.0.5)then c$$$ mask(ii,jj)=1 c$$$ else c$$$ mask(ii,jj)=0 c$$$ ENDIF if (.not. masque_lu) then mask(ii,jj) = num_lan(ii,jj)/num_tot(ii,jj) endif c Mean Orography: zmea (ii,jj)=zmea (ii,jj)/weight(ii,jj) zxtzx(ii,jj)=zxtzx(ii,jj)/weight(ii,jj) zytzy(ii,jj)=zytzy(ii,jj)/weight(ii,jj) zxtzy(ii,jj)=zxtzy(ii,jj)/weight(ii,jj) ztz(ii,jj) =ztz(ii,jj)/weight(ii,jj) c Standard deviation: zstd(ii,jj)=sqrt(AMAX1(0.,ztz(ii,jj)-zmea(ii,jj)**2)) ELSE PRINT*, 'probleme,ii,jj=', ii,jj ENDIF ENDDO ENDDO C CORRECT VALUES OF HORIZONTAL SLOPE NEAR THE POLES: DO ii = 1, imar+1 zxtzx(ii,1)=zxtzx(ii,2) zxtzx(ii,jmar)=zxtzx(ii,jmar-1) zxtzy(ii,1)=zxtzy(ii,2) zxtzy(ii,jmar)=zxtzy(ii,jmar-1) zytzy(ii,1)=zytzy(ii,2) zytzy(ii,jmar)=zytzy(ii,jmar-1) ENDDO C FILTERS TO SMOOTH OUT FIELDS FOR INPUT INTO SSO SCHEME. C FIRST FILTER, MOVING AVERAGE OVER 9 POINTS. CALL MVA9(zmea,iim+1,jjm+1) CALL MVA9(zstd,iim+1,jjm+1) CALL MVA9(zpic,iim+1,jjm+1) CALL MVA9(zval,iim+1,jjm+1) CALL MVA9(zxtzx,iim+1,jjm+1) CALL MVA9(zxtzy,iim+1,jjm+1) CALL MVA9(zytzy,iim+1,jjm+1) C$$$ Masque prenant en compte maximum de terre C$$$ On seuil a 10% de terre de terre car en dessous les parametres de surface n'on C$$$ pas de sens (PB) mask_tmp= 0.0 WHERE(mask .GE. 0.1) mask_tmp = 1. DO ii = 1, imar DO jj = 1, jmar IF (weight(ii,jj) .NE. 0.0) THEN c Coefficients K, L et M: xk=(zxtzx(ii,jj)+zytzy(ii,jj))/2. xl=(zxtzx(ii,jj)-zytzy(ii,jj))/2. xm=zxtzy(ii,jj) xp=xk-sqrt(xl**2+xm**2) xq=xk+sqrt(xl**2+xm**2) xw=1.e-8 if(xp.le.xw) xp=0. if(xq.le.xw) xq=xw if(abs(xm).le.xw) xm=xw*sign(1.,xm) c slope: c$$$ zsig(ii,jj)=sqrt(xq)*mask(ii,jj) c$$$c isotropy: c$$$ zgam(ii,jj)=xp/xq*mask(ii,jj) c$$$c angle theta: c$$$ zthe(ii,jj)=57.29577951*atan2(xm,xl)/2.*mask(ii,jj) c$$$ zphi(ii,jj)=zmea(ii,jj)*mask(ii,jj) c$$$ zmea(ii,jj)=zmea(ii,jj)*mask(ii,jj) c$$$ zpic(ii,jj)=zpic(ii,jj)*mask(ii,jj) c$$$ zval(ii,jj)=zval(ii,jj)*mask(ii,jj) c$$$ zstd(ii,jj)=zstd(ii,jj)*mask(ii,jj) C$$* PB modif pour maque de terre fractionnaire c slope: zsig(ii,jj)=sqrt(xq)*mask_tmp(ii,jj) c isotropy: zgam(ii,jj)=xp/xq*mask_tmp(ii,jj) c angle theta: zthe(ii,jj)=57.29577951*atan2(xm,xl)/2.*mask_tmp(ii,jj) zphi(ii,jj)=zmea(ii,jj)*mask_tmp(ii,jj) zmea(ii,jj)=zmea(ii,jj)*mask_tmp(ii,jj) zpic(ii,jj)=zpic(ii,jj)*mask_tmp(ii,jj) zval(ii,jj)=zval(ii,jj)*mask_tmp(ii,jj) zstd(ii,jj)=zstd(ii,jj)*mask_tmp(ii,jj) c print 101,ii,jj, c * zmea(ii,jj),zstd(ii,jj),zsig(ii,jj),zgam(ii,jj), c * zthe(ii,jj) c101 format(1x,2(1x,i2),2(1x,f7.1),1x,f7.4,2x,f4.2,1x,f5.1) ELSE c PRINT*, 'probleme,ii,jj=', ii,jj ENDIF zllmmea=AMAX1(zmea(ii,jj),zllmmea) zllmstd=AMAX1(zstd(ii,jj),zllmstd) zllmsig=AMAX1(zsig(ii,jj),zllmsig) zllmgam=AMAX1(zgam(ii,jj),zllmgam) zllmthe=AMAX1(zthe(ii,jj),zllmthe) zminthe=amin1(zthe(ii,jj),zminthe) zllmpic=AMAX1(zpic(ii,jj),zllmpic) zllmval=AMAX1(zval(ii,jj),zllmval) ENDDO ENDDO print *,' MEAN ORO:',zllmmea print *,' ST. DEV.:',zllmstd print *,' PENTE:',zllmsig print *,' ANISOTROP:',zllmgam print *,' ANGLE:',zminthe,zllmthe print *,' pic:',zllmpic print *,' val:',zllmval C c gamma and theta a 1. and 0. at poles c DO jj=1,jmar zmea(imar+1,jj)=zmea(1,jj) zphi(imar+1,jj)=zphi(1,jj) zpic(imar+1,jj)=zpic(1,jj) zval(imar+1,jj)=zval(1,jj) zstd(imar+1,jj)=zstd(1,jj) zsig(imar+1,jj)=zsig(1,jj) zgam(imar+1,jj)=zgam(1,jj) zthe(imar+1,jj)=zthe(1,jj) ENDDO zmeanor=0.0 zmeasud=0.0 zstdnor=0.0 zstdsud=0.0 zsignor=0.0 zsigsud=0.0 zweinor=0.0 zweisud=0.0 zpicnor=0.0 zpicsud=0.0 zvalnor=0.0 zvalsud=0.0 DO ii=1,imar zweinor=zweinor+ weight(ii, 1) zweisud=zweisud+ weight(ii,jmar) zmeanor=zmeanor+zmea(ii, 1)*weight(ii, 1) zmeasud=zmeasud+zmea(ii,jmar)*weight(ii,jmar) zstdnor=zstdnor+zstd(ii, 1)*weight(ii, 1) zstdsud=zstdsud+zstd(ii,jmar)*weight(ii,jmar) zsignor=zsignor+zsig(ii, 1)*weight(ii, 1) zsigsud=zsigsud+zsig(ii,jmar)*weight(ii,jmar) zpicnor=zpicnor+zpic(ii, 1)*weight(ii, 1) zpicsud=zpicsud+zpic(ii,jmar)*weight(ii,jmar) zvalnor=zvalnor+zval(ii, 1)*weight(ii, 1) zvalsud=zvalsud+zval(ii,jmar)*weight(ii,jmar) ENDDO DO ii=1,imar+1 zmea(ii, 1)=zmeanor/zweinor zmea(ii,jmar)=zmeasud/zweisud zphi(ii, 1)=zmeanor/zweinor zphi(ii,jmar)=zmeasud/zweisud zpic(ii, 1)=zpicnor/zweinor zpic(ii,jmar)=zpicsud/zweisud zval(ii, 1)=zvalnor/zweinor zval(ii,jmar)=zvalsud/zweisud zstd(ii, 1)=zstdnor/zweinor zstd(ii,jmar)=zstdsud/zweisud zsig(ii, 1)=zsignor/zweinor zsig(ii,jmar)=zsigsud/zweisud zgam(ii, 1)=1. zgam(ii,jmar)=1. zthe(ii, 1)=0. zthe(ii,jmar)=0. ENDDO RETURN END SUBROUTINE MVA9(X,IMAR,JMAR) C MAKE A MOVING AVERAGE OVER 9 GRIDPOINTS OF THE X FIELDS PARAMETER (ISMo=300,JSMo=200) REAL X(IMAR,JMAR),XF(ISMo,JSMo) real WEIGHTpb(-1:1,-1:1) if(imar.gt.ismo) stop'surdimensionner ismo dans mva9 (grid_noro)' if(jmar.gt.jsmo) stop'surdimensionner jsmo dans mva9 (grid_noro)' SUM=0. DO IS=-1,1 DO JS=-1,1 WEIGHTpb(IS,JS)=1./FLOAT((1+IS**2)*(1+JS**2)) SUM=SUM+WEIGHTpb(IS,JS) ENDDO ENDDO c WRITE(*,*) 'MVA9 ', IMAR, JMAR c WRITE(*,*) 'MVA9 ', WEIGHTpb c WRITE(*,*) 'MVA9 SUM ', SUM DO IS=-1,1 DO JS=-1,1 WEIGHTpb(IS,JS)=WEIGHTpb(IS,JS)/SUM ENDDO ENDDO DO J=2,JMAR-1 DO I=2,IMAR-1 XF(I,J)=0. DO IS=-1,1 DO JS=-1,1 XF(I,J)=XF(I,J)+X(I+IS,J+JS)*WEIGHTpb(IS,JS) ENDDO ENDDO ENDDO ENDDO DO J=2,JMAR-1 XF(1,J)=0. IS=IMAR-1 DO JS=-1,1 XF(1,J)=XF(1,J)+X(IS,J+JS)*WEIGHTpb(-1,JS) ENDDO DO IS=0,1 DO JS=-1,1 XF(1,J)=XF(1,J)+X(1+IS,J+JS)*WEIGHTpb(IS,JS) ENDDO ENDDO XF(IMAR,J)=XF(1,J) ENDDO DO I=1,IMAR XF(I,1)=XF(I,2) XF(I,JMAR)=XF(I,JMAR-1) ENDDO DO I=1,IMAR DO J=1,JMAR X(I,J)=XF(I,J) ENDDO ENDDO RETURN END