1 |
|
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SUBROUTINE cv3_mixing(nloc,ncum,nd,na,ntra,icb,nk,inb & |
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,ph,t,rr,rs,u,v,tra,h,lv,qnk & |
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,hp,tv,tvp,ep,clw,m,sig & |
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,ment,qent,uent,vent, nent, sij,elij,ments,qents,traent) |
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use cvparam3 |
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use cvthermo |
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implicit none |
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|
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!--------------------------------------------------------------------- |
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! a faire: |
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! - changer rr(il,1) -> qnk(il) |
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! - vectorisation de la partie normalisation des flux (do 789...) |
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!--------------------------------------------------------------------- |
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|
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|
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! inputs: |
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integer ncum, nd, na, ntra, nloc |
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integer icb(nloc), inb(nloc), nk(nloc) |
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real sig(nloc,nd) |
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real qnk(nloc) |
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real ph(nloc,nd+1) |
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real t(nloc,nd), rr(nloc,nd), rs(nloc,nd) |
24 |
real u(nloc,nd), v(nloc,nd) |
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real tra(nloc,nd,ntra) ! input of convect3 |
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real lv(nloc,na), h(nloc,na), hp(nloc,na) |
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real tv(nloc,na), tvp(nloc,na), ep(nloc,na), clw(nloc,na) |
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real m(nloc,na) ! input of convect3 |
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|
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! outputs: |
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real ment(nloc,na,na), qent(nloc,na,na) |
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real uent(nloc,na,na), vent(nloc,na,na) |
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real sij(nloc,na,na), elij(nloc,na,na) |
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real traent(nloc,nd,nd,ntra) |
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real ments(nloc,nd,nd), qents(nloc,nd,nd) |
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real sigij(nloc,nd,nd) |
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integer nent(nloc,nd) |
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|
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! local variables: |
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integer i, j, k, il, im, jm |
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integer num1, num2 |
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real rti, bf2, anum, denom, dei, altem, cwat, stemp, qp |
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real alt, smid, sjmin, sjmax, delp, delm |
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real asij(nloc), smax(nloc), scrit(nloc) |
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real asum(nloc,nd),bsum(nloc,nd),csum(nloc,nd) |
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real wgh |
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real zm(nloc,na) |
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logical lwork(nloc) |
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|
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!===================================================================== |
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! --- INITIALIZE VARIOUS ARRAYS USED IN THE COMPUTATIONS |
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!===================================================================== |
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|
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! ori do 360 i=1,ncum*nlp |
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do 361 j=1,nl |
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do 360 i=1,ncum |
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nent(i,j)=0 |
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! in convect3, m is computed in cv3_closure |
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! ori m(i,1)=0.0 |
60 |
360 continue |
61 |
361 continue |
62 |
|
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! ori do 400 k=1,nlp |
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! ori do 390 j=1,nlp |
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do 400 j=1,nl |
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do 390 k=1,nl |
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do 385 i=1,ncum |
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qent(i,k,j)=rr(i,j) |
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uent(i,k,j)=u(i,j) |
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vent(i,k,j)=v(i,j) |
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elij(i,k,j)=0.0 |
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!ym ment(i,k,j)=0.0 |
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!ym sij(i,k,j)=0.0 |
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385 continue |
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390 continue |
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400 continue |
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|
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!ym |
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ment(1:ncum,1:nd,1:nd)=0.0 |
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sij(1:ncum,1:nd,1:nd)=0.0 |
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|
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! do k=1,ntra |
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! do j=1,nd ! instead nlp |
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! do i=1,nd ! instead nlp |
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! do il=1,ncum |
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! traent(il,i,j,k)=tra(il,j,k) |
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! enddo |
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! enddo |
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! enddo |
90 |
! enddo |
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zm(:,:)=0. |
92 |
|
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!===================================================================== |
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! --- CALCULATE ENTRAINED AIR MASS FLUX (ment), TOTAL WATER MIXING |
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! --- RATIO (QENT), TOTAL CONDENSED WATER (elij), AND MIXING |
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! --- FRACTION (sij) |
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!===================================================================== |
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|
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do 750 i=minorig+1, nl |
100 |
|
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do 710 j=minorig,nl |
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do 700 il=1,ncum |
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if( (i.ge.icb(il)).and.(i.le.inb(il)).and. & |
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(j.ge.(icb(il)-1)).and.(j.le.inb(il)))then |
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|
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rti=rr(il,1)-ep(il,i)*clw(il,i) |
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bf2=1.+lv(il,j)*lv(il,j)*rs(il,j)/(rrv*t(il,j)*t(il,j)*cpd) |
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anum=h(il,j)-hp(il,i)+(cpv-cpd)*t(il,j)*(rti-rr(il,j)) |
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denom=h(il,i)-hp(il,i)+(cpd-cpv)*(rr(il,i)-rti)*t(il,j) |
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dei=denom |
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if(abs(dei).lt.0.01)dei=0.01 |
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sij(il,i,j)=anum/dei |
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sij(il,i,i)=1.0 |
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altem=sij(il,i,j)*rr(il,i)+(1.-sij(il,i,j))*rti-rs(il,j) |
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altem=altem/bf2 |
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cwat=clw(il,j)*(1.-ep(il,j)) |
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stemp=sij(il,i,j) |
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if((stemp.lt.0.0.or.stemp.gt.1.0.or.altem.gt.cwat) & |
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.and.j.gt.i)then |
120 |
anum=anum-lv(il,j)*(rti-rs(il,j)-cwat*bf2) |
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denom=denom+lv(il,j)*(rr(il,i)-rti) |
122 |
if(abs(denom).lt.0.01)denom=0.01 |
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sij(il,i,j)=anum/denom |
124 |
altem=sij(il,i,j)*rr(il,i)+(1.-sij(il,i,j))*rti-rs(il,j) |
125 |
altem=altem-(bf2-1.)*cwat |
126 |
end if |
127 |
if(sij(il,i,j).gt.0.0.and.sij(il,i,j).lt.0.95)then |
128 |
qent(il,i,j)=sij(il,i,j)*rr(il,i)+(1.-sij(il,i,j))*rti |
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uent(il,i,j)=sij(il,i,j)*u(il,i)+(1.-sij(il,i,j))*u(il,nk(il)) |
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vent(il,i,j)=sij(il,i,j)*v(il,i)+(1.-sij(il,i,j))*v(il,nk(il)) |
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!!!! do k=1,ntra |
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!!!! traent(il,i,j,k)=sij(il,i,j)*tra(il,i,k) |
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!!!! : +(1.-sij(il,i,j))*tra(il,nk(il),k) |
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!!!! end do |
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elij(il,i,j)=altem |
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elij(il,i,j)=amax1(0.0,elij(il,i,j)) |
137 |
ment(il,i,j)=m(il,i)/(1.-sij(il,i,j)) |
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nent(il,i)=nent(il,i)+1 |
139 |
end if |
140 |
sij(il,i,j)=amax1(0.0,sij(il,i,j)) |
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sij(il,i,j)=amin1(1.0,sij(il,i,j)) |
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endif ! new |
143 |
700 continue |
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710 continue |
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|
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! do k=1,ntra |
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! do j=minorig,nl |
148 |
! do il=1,ncum |
149 |
! if( (i.ge.icb(il)).and.(i.le.inb(il)).and. |
150 |
! : (j.ge.(icb(il)-1)).and.(j.le.inb(il)))then |
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! traent(il,i,j,k)=sij(il,i,j)*tra(il,i,k) |
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! : +(1.-sij(il,i,j))*tra(il,nk(il),k) |
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! endif |
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! enddo |
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! enddo |
156 |
! enddo |
157 |
|
158 |
! |
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! *** if no air can entrain at level i assume that updraft detrains *** |
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! *** at that level and calculate detrained air flux and properties *** |
161 |
! |
162 |
|
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!@ do 170 i=icb(il),inb(il) |
164 |
|
165 |
do 740 il=1,ncum |
166 |
if ((i.ge.icb(il)).and.(i.le.inb(il)).and.(nent(il,i).eq.0)) then |
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!@ if(nent(il,i).eq.0)then |
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ment(il,i,i)=m(il,i) |
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qent(il,i,i)=rr(il,nk(il))-ep(il,i)*clw(il,i) |
170 |
uent(il,i,i)=u(il,nk(il)) |
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vent(il,i,i)=v(il,nk(il)) |
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elij(il,i,i)=clw(il,i) |
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!MAF sij(il,i,i)=1.0 |
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sij(il,i,i)=0.0 |
175 |
end if |
176 |
740 continue |
177 |
750 continue |
178 |
|
179 |
! do j=1,ntra |
180 |
! do i=minorig+1,nl |
181 |
! do il=1,ncum |
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! if (i.ge.icb(il) .and. i.le.inb(il) .and. nent(il,i).eq.0) then |
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! traent(il,i,i,j)=tra(il,nk(il),j) |
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! endif |
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! enddo |
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! enddo |
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! enddo |
188 |
|
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do 100 j=minorig,nl |
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do 101 i=minorig,nl |
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do 102 il=1,ncum |
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if ((j.ge.(icb(il)-1)).and.(j.le.inb(il)) & |
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.and.(i.ge.icb(il)).and.(i.le.inb(il)))then |
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sigij(il,i,j)=sij(il,i,j) |
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endif |
196 |
102 continue |
197 |
101 continue |
198 |
100 continue |
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!@ enddo |
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|
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!@170 continue |
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|
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!===================================================================== |
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! --- NORMALIZE ENTRAINED AIR MASS FLUXES |
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! --- TO REPRESENT EQUAL PROBABILITIES OF MIXING |
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!===================================================================== |
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|
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!ym call zilch(asum,ncum*nd) |
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!ym call zilch(bsum,ncum*nd) |
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!ym call zilch(csum,ncum*nd) |
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call zilch(asum,nloc*nd) |
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call zilch(csum,nloc*nd) |
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call zilch(csum,nloc*nd) |
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|
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do il=1,ncum |
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lwork(il) = .FALSE. |
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enddo |
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|
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DO 789 i=minorig+1,nl |
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|
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num1=0 |
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do il=1,ncum |
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if ( i.ge.icb(il) .and. i.le.inb(il) ) num1=num1+1 |
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enddo |
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if (num1.le.0) goto 789 |
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|
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|
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do 781 il=1,ncum |
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if ( i.ge.icb(il) .and. i.le.inb(il) ) then |
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lwork(il)=(nent(il,i).ne.0) |
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qp=rr(il,1)-ep(il,i)*clw(il,i) |
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anum=h(il,i)-hp(il,i)-lv(il,i)*(qp-rs(il,i)) & |
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+(cpv-cpd)*t(il,i)*(qp-rr(il,i)) |
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denom=h(il,i)-hp(il,i)+lv(il,i)*(rr(il,i)-qp) & |
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+(cpd-cpv)*t(il,i)*(rr(il,i)-qp) |
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if(abs(denom).lt.0.01)denom=0.01 |
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scrit(il)=anum/denom |
238 |
alt=qp-rs(il,i)+scrit(il)*(rr(il,i)-qp) |
239 |
if(scrit(il).le.0.0.or.alt.le.0.0)scrit(il)=1.0 |
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smax(il)=0.0 |
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asij(il)=0.0 |
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endif |
243 |
781 continue |
244 |
|
245 |
do 175 j=nl,minorig,-1 |
246 |
|
247 |
num2=0 |
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do il=1,ncum |
249 |
if ( i.ge.icb(il) .and. i.le.inb(il) .and. & |
250 |
j.ge.(icb(il)-1) .and. j.le.inb(il) & |
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.and. lwork(il) ) num2=num2+1 |
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enddo |
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if (num2.le.0) goto 175 |
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|
255 |
do 782 il=1,ncum |
256 |
if ( i.ge.icb(il) .and. i.le.inb(il) .and. & |
257 |
j.ge.(icb(il)-1) .and. j.le.inb(il) & |
258 |
.and. lwork(il) ) then |
259 |
|
260 |
if(sij(il,i,j).gt.1.0e-16.and.sij(il,i,j).lt.0.95)then |
261 |
wgh=1.0 |
262 |
if(j.gt.i)then |
263 |
sjmax=amax1(sij(il,i,j+1),smax(il)) |
264 |
sjmax=amin1(sjmax,scrit(il)) |
265 |
smax(il)=amax1(sij(il,i,j),smax(il)) |
266 |
sjmin=amax1(sij(il,i,j-1),smax(il)) |
267 |
sjmin=amin1(sjmin,scrit(il)) |
268 |
if(sij(il,i,j).lt.(smax(il)-1.0e-16))wgh=0.0 |
269 |
smid=amin1(sij(il,i,j),scrit(il)) |
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else |
271 |
sjmax=amax1(sij(il,i,j+1),scrit(il)) |
272 |
smid=amax1(sij(il,i,j),scrit(il)) |
273 |
sjmin=0.0 |
274 |
if(j.gt.1)sjmin=sij(il,i,j-1) |
275 |
sjmin=amax1(sjmin,scrit(il)) |
276 |
endif |
277 |
delp=abs(sjmax-smid) |
278 |
delm=abs(sjmin-smid) |
279 |
asij(il)=asij(il)+wgh*(delp+delm) |
280 |
ment(il,i,j)=ment(il,i,j)*(delp+delm)*wgh |
281 |
endif |
282 |
endif |
283 |
782 continue |
284 |
|
285 |
175 continue |
286 |
|
287 |
do il=1,ncum |
288 |
if (i.ge.icb(il).and.i.le.inb(il).and.lwork(il)) then |
289 |
asij(il)=amax1(1.0e-16,asij(il)) |
290 |
asij(il)=1.0/asij(il) |
291 |
asum(il,i)=0.0 |
292 |
bsum(il,i)=0.0 |
293 |
csum(il,i)=0.0 |
294 |
endif |
295 |
enddo |
296 |
|
297 |
do 180 j=minorig,nl |
298 |
do il=1,ncum |
299 |
if ( i.ge.icb(il) .and. i.le.inb(il) .and. lwork(il) & |
300 |
.and. j.ge.(icb(il)-1) .and. j.le.inb(il) ) then |
301 |
ment(il,i,j)=ment(il,i,j)*asij(il) |
302 |
endif |
303 |
enddo |
304 |
180 continue |
305 |
|
306 |
do 190 j=minorig,nl |
307 |
do il=1,ncum |
308 |
if ( i.ge.icb(il) .and. i.le.inb(il) .and. lwork(il) & |
309 |
.and. j.ge.(icb(il)-1) .and. j.le.inb(il) ) then |
310 |
asum(il,i)=asum(il,i)+ment(il,i,j) |
311 |
ment(il,i,j)=ment(il,i,j)*sig(il,j) |
312 |
bsum(il,i)=bsum(il,i)+ment(il,i,j) |
313 |
endif |
314 |
enddo |
315 |
190 continue |
316 |
|
317 |
do il=1,ncum |
318 |
if (i.ge.icb(il).and.i.le.inb(il).and.lwork(il)) then |
319 |
bsum(il,i)=amax1(bsum(il,i),1.0e-16) |
320 |
bsum(il,i)=1.0/bsum(il,i) |
321 |
endif |
322 |
enddo |
323 |
|
324 |
do 195 j=minorig,nl |
325 |
do il=1,ncum |
326 |
if ( i.ge.icb(il) .and. i.le.inb(il) .and. lwork(il) & |
327 |
.and. j.ge.(icb(il)-1) .and. j.le.inb(il) ) then |
328 |
ment(il,i,j)=ment(il,i,j)*asum(il,i)*bsum(il,i) |
329 |
endif |
330 |
enddo |
331 |
195 continue |
332 |
|
333 |
do 197 j=minorig,nl |
334 |
do il=1,ncum |
335 |
if ( i.ge.icb(il) .and. i.le.inb(il) .and. lwork(il) & |
336 |
.and. j.ge.(icb(il)-1) .and. j.le.inb(il) ) then |
337 |
csum(il,i)=csum(il,i)+ment(il,i,j) |
338 |
endif |
339 |
enddo |
340 |
197 continue |
341 |
|
342 |
do il=1,ncum |
343 |
if ( i.ge.icb(il) .and. i.le.inb(il) .and. lwork(il) & |
344 |
.and. csum(il,i).lt.m(il,i) ) then |
345 |
nent(il,i)=0 |
346 |
ment(il,i,i)=m(il,i) |
347 |
qent(il,i,i)=rr(il,1)-ep(il,i)*clw(il,i) |
348 |
uent(il,i,i)=u(il,nk(il)) |
349 |
vent(il,i,i)=v(il,nk(il)) |
350 |
elij(il,i,i)=clw(il,i) |
351 |
!MAF sij(il,i,i)=1.0 |
352 |
sij(il,i,i)=0.0 |
353 |
endif |
354 |
enddo ! il |
355 |
|
356 |
! do j=1,ntra |
357 |
! do il=1,ncum |
358 |
! if ( i.ge.icb(il) .and. i.le.inb(il) .and. lwork(il) |
359 |
! : .and. csum(il,i).lt.m(il,i) ) then |
360 |
! traent(il,i,i,j)=tra(il,nk(il),j) |
361 |
! endif |
362 |
! enddo |
363 |
! enddo |
364 |
789 continue |
365 |
! |
366 |
! MAF: renormalisation de MENT |
367 |
do jm=1,nd |
368 |
do im=1,nd |
369 |
do il=1,ncum |
370 |
zm(il,im)=zm(il,im)+(1.-sij(il,im,jm))*ment(il,im,jm) |
371 |
end do |
372 |
end do |
373 |
end do |
374 |
! |
375 |
do jm=1,nd |
376 |
do im=1,nd |
377 |
do il=1,ncum |
378 |
if(zm(il,im).ne.0.) then |
379 |
ment(il,im,jm)=ment(il,im,jm)*m(il,im)/zm(il,im) |
380 |
endif |
381 |
end do |
382 |
end do |
383 |
end do |
384 |
! |
385 |
do jm=1,nd |
386 |
do im=1,nd |
387 |
do 999 il=1,ncum |
388 |
qents(il,im,jm)=qent(il,im,jm) |
389 |
ments(il,im,jm)=ment(il,im,jm) |
390 |
999 continue |
391 |
enddo |
392 |
enddo |
393 |
|
394 |
return |
395 |
end |