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inigeom.f90 @ 5348

Last change on this file since 5348 was 5285, checked in by abarral, 5 weeks ago
As discussed internally, remove generic ONLY: ... for new _mod_h modules
Property copyright set to Name of program: LMDZ Creation date: 1984 Version: LMDZ5 License: CeCILL version 2 Holder: Laboratoire de m\'et\'eorologie dynamique, CNRS, UMR 8539 See the license file in the root directory Property svn:eol-style set to `native` Property svn:keywords set to `Author Date Id Revision`
File size: 20.6 KB

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1	!
2	! $Id: inigeom.f90 5285 2024-10-28 13:33:29Z fhourdin $
3	!
4	!
5	!
6	SUBROUTINE inigeom
7	!
8	! Auteur : P. Le Van
9	!
10	! ............ Version du 01/04/2001 ........................
11	!
12	! Calcul des elongations cuij1,.cuij4 , cvij1,..cvij4 aux memes en-
13	! endroits que les aires aireij1,..aireij4 .
14
15	! Choix entre f(y) a derivee sinusoid. ou a derivee tangente hyperbol.
16	!
17	!
18	USE comgeom2_mod_h
19	USE comdissnew_mod_h
20	use fxhyp_m, only: fxhyp
21	use fyhyp_m, only: fyhyp
22	USE comconst_mod, ONLY: pi, g, omeg, rad
23	USE logic_mod, ONLY: fxyhypb, ysinus
24	USE serre_mod, ONLY: clon,clat,grossismx,grossismy,dzoomx,dzoomy, &
25	alphax,alphay,taux,tauy,transx,transy,pxo,pyo
26	USE dimensions_mod, ONLY: iim, jjm, llm, ndm
27	USE paramet_mod_h
28	IMPLICIT NONE
29	!
30
31
32
33	!-----------------------------------------------------------------------
34	! .... Variables locales ....
35	!
36	INTEGER :: i,j,itmax,itmay,iter
37	REAL :: cvu(iip1,jjp1),cuv(iip1,jjm)
38	REAL :: ai14,ai23,airez,rlatp,rlatm,xprm,xprp,un4rad2,yprp,yprm
39	REAL :: eps,x1,xo1,f,df,xdm,y1,yo1,ydm
40	REAL :: coslatm,coslatp,radclatm,radclatp
41	REAL :: cuij1(iip1,jjp1),cuij2(iip1,jjp1),cuij3(iip1,jjp1), &
42	cuij4(iip1,jjp1)
43	REAL :: cvij1(iip1,jjp1),cvij2(iip1,jjp1),cvij3(iip1,jjp1), &
44	cvij4(iip1,jjp1)
45	REAL :: rlonvv(iip1),rlatuu(jjp1)
46	REAL :: rlatu1(jjm),yprimu1(jjm),rlatu2(jjm),yprimu2(jjm) , &
47	yprimv(jjm),yprimu(jjp1)
48	REAL :: gamdi_gdiv, gamdi_grot, gamdi_h
49
50	REAL :: rlonm025(iip1),xprimm025(iip1), rlonp025(iip1), &
51	xprimp025(iip1)
52	SAVE rlatu1,yprimu1,rlatu2,yprimu2,yprimv,yprimu
53	SAVE rlonm025,xprimm025,rlonp025,xprimp025
54
55	REAL :: SSUM
56	!
57	!
58	! ------------------------------------------------------------------
59	! - -
60	! - calcul des coeff. ( cu, cv , 1./cu2, 1./cv2 ) -
61	! - -
62	! ------------------------------------------------------------------
63	!
64	! les coef. ( cu, cv ) permettent de passer des vitesses naturelles
65	! aux vitesses covariantes et contravariantes , ou vice-versa ...
66	!
67	!
68	! on a : u (covariant) = cu * u (naturel) , u(contrav)= u(nat)/cu
69	! v (covariant) = cv * v (naturel) , v(contrav)= v(nat)/cv
70	!
71	! on en tire : u(covariant) = cu * cu * u(contravariant)
72	! v(covariant) = cv * cv * v(contravariant)
73	!
74	!
75	! on a l'application ( x(X) , y(Y) ) avec - im/2 +1 < X < im/2
76	! = =
77	! et - jm/2 < Y < jm/2
78	! = =
79	!
80	! ...................................................
81	! ...................................................
82	! . x est la longitude du point en radians .
83	! . y est la latitude du point en radians .
84	! . .
85	! . on a : cu(i,j) = rad * COS(y) * dx/dX .
86	! . cv( j ) = rad * dy/dY .
87	! . aire(i,j) = cu(i,j) * cv(j) .
88	! . .
89	! . y, dx/dX, dy/dY calcules aux points concernes .
90	! . .
91	! ...................................................
92	! ...................................................
93	!
94	!
95	!
96	! ,
97	! cv , bien que dependant de j uniquement,sera ici indice aussi en i
98	! pour un adressage plus facile en ij .
99	!
100	!
101	!
102	! ************ aux points u et v , ***************
103	! xprimu et xprimv sont respectivement les valeurs de dx/dX
104	! yprimu et yprimv . . . . . . . . . . . dy/dY
105	! rlatu et rlatv . . . . . . . . . . .la latitude
106	! cvu et cv . . . . . . . . . . . cv
107	!
108	! ************ aux points u, v, scalaires, et z **************
109	! cu, cuv, cuscal, cuz sont respectiv. les valeurs de cu
110	!
111	!
112	!
113	! Exemple de distribution de variables sur la grille dans le
114	! domaine de travail ( X,Y ) .
115	! ................................................................
116	! DX=DY= 1
117	!
118	!
119	! + represente un point scalaire ( p.exp la pression )
120	! > represente la composante zonale du vent
121	! V represente la composante meridienne du vent
122	! o represente la vorticite
123	!
124	! ---- , car aux poles , les comp.zonales covariantes sont nulles
125	!
126	!
127	!
128	! i ->
129	!
130	! 1 2 3 4 5 6 7 8
131	! j
132	! v 1 + ---- + ---- + ---- + ---- + ---- + ---- + ---- + --
133	!
134	! V o V o V o V o V o V o V o V o
135	!
136	! 2 + > + > + > + > + > + > + > + >
137	!
138	! V o V o V o V o V o V o V o V o
139	!
140	! 3 + > + > + > + > + > + > + > + >
141	!
142	! V o V o V o V o V o V o V o V o
143	!
144	! 4 + > + > + > + > + > + > + > + >
145	!
146	! V o V o V o V o V o V o V o V o
147	!
148	! 5 + ---- + ---- + ---- + ---- + ---- + ---- + ---- + --
149	!
150	!
151	! Ci-dessus, on voit que le nombre de pts.en longitude est egal
152	! a IM = 8
153	! De meme , le nombre d'intervalles entre les 2 poles est egal
154	! a JM = 4
155	!
156	! Les points scalaires ( + ) correspondent donc a des valeurs
157	! entieres de i ( 1 a IM ) et de j ( 1 a JM +1 ) .
158	!
159	! Les vents U ( > ) correspondent a des valeurs semi-
160	! entieres de i ( 1+ 0.5 a IM+ 0.5) et entieres de j ( 1 a JM+1)
161	!
162	! Les vents V ( V ) correspondent a des valeurs entieres
163	! de i ( 1 a IM ) et semi-entieres de j ( 1 +0.5 a JM +0.5)
164	!
165	!
166	!
167	WRITE(6,3)
168	3 FORMAT( // 10x,' .... INIGEOM date du 01/06/98 ..... ', &
169	//5x,' Calcul des elongations cu et cv comme sommes des 4 ' / &
170	5 x,' elong. cuij1, .. 4 , cvij1,.. 4 qui les entourent , aux&
171	& '/ 5x,' memes endroits que les aires aireij1,...j4 . ' / )
172	!
173	!
174	IF( nitergdiv.NE.2 ) THEN
175	gamdi_gdiv = coefdis/ ( REAL(nitergdiv) -2. )
176	ELSE
177	gamdi_gdiv = 0.
178	ENDIF
179	IF( nitergrot.NE.2 ) THEN
180	gamdi_grot = coefdis/ ( REAL(nitergrot) -2. )
181	ELSE
182	gamdi_grot = 0.
183	ENDIF
184	IF( niterh.NE.2 ) THEN
185	gamdi_h = coefdis/ ( REAL(niterh) -2. )
186	ELSE
187	gamdi_h = 0.
188	ENDIF
189
190	WRITE(6,*) ' gamdi_gd ',gamdi_gdiv,gamdi_grot,gamdi_h,coefdis, &
191	nitergdiv,nitergrot,niterh
192	!
193	pi = 2.* ASIN(1.)
194	!
195	WRITE(6,990)
196
197	! ----------------------------------------------------------------
198	!
199	IF( .NOT.fxyhypb ) THEN
200	!
201	!
202	IF( ysinus ) THEN
203	!
204	WRITE(6,) ' Inigeom , Y = Sinus ( Latitude ) * '
205	!
206	! .... utilisation de f(x,y ) avec y = sinus de la latitude .....
207
208	CALL fxysinus (rlatu,yprimu,rlatv,yprimv,rlatu1,yprimu1, &
209	rlatu2,yprimu2, &
210	rlonu,xprimu,rlonv,xprimv,rlonm025,xprimm025,rlonp025,xprimp025)
211
212	ELSE
213	!
214	WRITE(6,) ' Inigeom , Y = Latitude , der. sinusoid . *'
215
216	! .... utilisation de f(x,y) a tangente sinusoidale , y etant la latit. ...
217	!
218
219	pxo = clon *pi /180.
220	pyo = 2.* clat* pi /180.
221	!
222	! .... determination de transx ( pour le zoom ) par Newton-Raphson ...
223	!
224	itmax = 10
225	eps = .1e-7
226	!
227	xo1 = 0.
228	DO iter = 1, itmax
229	x1 = xo1
230	f = x1+ alphax *SIN(x1-pxo)
231	df = 1.+ alphax *COS(x1-pxo)
232	x1 = x1 - f/df
233	xdm = ABS( x1- xo1 )
234	IF( xdm.LE.eps )GO TO 11
235	xo1 = x1
236	END DO
237	11 CONTINUE
238	!
239	transx = xo1
240
241	itmay = 10
242	eps = .1e-7
243	!
244	yo1 = 0.
245	DO iter = 1,itmay
246	y1 = yo1
247	f = y1 + alphay* SIN(y1-pyo)
248	df = 1. + alphay* COS(y1-pyo)
249	y1 = y1 -f/df
250	ydm = ABS(y1-yo1)
251	IF(ydm.LE.eps) GO TO 17
252	yo1 = y1
253	END DO
254	!
255	17 CONTINUE
256	transy = yo1
257
258	CALL fxy ( rlatu,yprimu,rlatv,yprimv,rlatu1,yprimu1, &
259	rlatu2,yprimu2, &
260	rlonu,xprimu,rlonv,xprimv,rlonm025,xprimm025,rlonp025,xprimp025)
261
262	ENDIF
263	!
264	ELSE
265	!
266	! .... Utilisation de fxyhyper , f(x,y) a derivee tangente hyperbol.
267	! .....................................................................
268
269	WRITE(6,)' Inigeom , Y = Latitude , der.tg. hyperbolique *'
270
271	CALL fyhyp(rlatu, yprimu, rlatv, rlatu2, yprimu2, rlatu1, yprimu1)
272	CALL fxhyp(xprimm025, rlonv, xprimv, rlonu, xprimu, xprimp025)
273
274	ENDIF
275	!
276	! -------------------------------------------------------------------
277
278	!
279	rlatu(1) = ASIN(1.)
280	rlatu(jjp1) = - rlatu(1)
281	!
282	!
283	! .... calcul aux poles ....
284	!
285	yprimu(1) = 0.
286	yprimu(jjp1) = 0.
287	!
288	!
289	un4rad2 = 0.25 * rad * rad
290	!
291	! --------------------------------------------------------------------
292	! --------------------------------------------------------------------
293	! - -
294	! - calcul des aires ( aire,aireu,airev, 1./aire, 1./airez ) -
295	! - et de fext , force de coriolis extensive . -
296	! - -
297	! --------------------------------------------------------------------
298	! --------------------------------------------------------------------
299	!
300	!
301	!
302	! A 1 point scalaire P (i,j) de la grille, reguliere en (X,Y) , sont
303	! affectees 4 aires entourant P , calculees respectivement aux points
304	! ( i + 1/4, j - 1/4 ) : aireij1 (i,j)
305	! ( i + 1/4, j + 1/4 ) : aireij2 (i,j)
306	! ( i - 1/4, j + 1/4 ) : aireij3 (i,j)
307	! ( i - 1/4, j - 1/4 ) : aireij4 (i,j)
308	!
309	! ,
310	! Les cotes de chacun de ces 4 carres etant egaux a 1/2 suivant (X,Y).
311	! Chaque aire centree en 1 point scalaire P(i,j) est egale a la somme
312	! des 4 aires aireij1,aireij2,aireij3,aireij4 qui sont affectees au
313	! point (i,j) .
314	! On definit en outre les coefficients alpha comme etant egaux a
315	! (aireij / aire), c.a.d par exp. alpha1(i,j)=aireij1(i,j)/aire(i,j)
316	!
317	! De meme, toute aire centree en 1 point U est egale a la somme des
318	! 4 aires aireij1,aireij2,aireij3,aireij4 entourant le point U .
319	! Idem pour airev, airez .
320	!
321	! On a ,pour chaque maille : dX = dY = 1
322	!
323	!
324	! . V
325	!
326	! aireij4 . . aireij1
327	!
328	! U . . P . U
329	!
330	! aireij3 . . aireij2
331	!
332	! . V
333	!
334	!
335	!
336	!
337	!
338	! ....................................................................
339	!
340	! Calcul des 4 aires elementaires aireij1,aireij2,aireij3,aireij4
341	! qui entourent chaque aire(i,j) , ainsi que les 4 elongations elemen
342	! taires cuij et les 4 elongat. cvij qui sont calculees aux memes
343	! endroits que les aireij .
344	!
345	! ....................................................................
346	!
347	! ....... do 35 : boucle sur les jjm + 1 latitudes .....
348	!
349	!
350	DO j = 1, jjp1
351	!
352	IF ( j.EQ. 1 ) THEN
353	!
354	yprm = yprimu1(j)
355	rlatm = rlatu1(j)
356	!
357	coslatm = COS( rlatm )
358	radclatm = 0.5* rad * coslatm
359	!
360	DO i = 1, iim
361	xprp = xprimp025( i )
362	xprm = xprimm025( i )
363	aireij2( i,1 ) = un4rad2 * coslatm * xprp * yprm
364	aireij3( i,1 ) = un4rad2 * coslatm * xprm * yprm
365	cuij2 ( i,1 ) = radclatm * xprp
366	cuij3 ( i,1 ) = radclatm * xprm
367	cvij2 ( i,1 ) = 0.5* rad * yprm
368	cvij3 ( i,1 ) = cvij2(i,1)
369	END DO
370	!
371	DO i = 1, iim
372	aireij1( i,1 ) = 0.
373	aireij4( i,1 ) = 0.
374	cuij1 ( i,1 ) = 0.
375	cuij4 ( i,1 ) = 0.
376	cvij1 ( i,1 ) = 0.
377	cvij4 ( i,1 ) = 0.
378	ENDDO
379	!
380	END IF
381	!
382	IF ( j.EQ. jjp1 ) THEN
383	yprp = yprimu2(j-1)
384	rlatp = rlatu2 (j-1)
385	!cc yprp = fyprim( REAL(j) - 0.25 )
386	!cc rlatp = fy ( REAL(j) - 0.25 )
387	!
388	coslatp = COS( rlatp )
389	radclatp = 0.5* rad * coslatp
390	!
391	DO i = 1,iim
392	xprp = xprimp025( i )
393	xprm = xprimm025( i )
394	aireij1( i,jjp1 ) = un4rad2 * coslatp * xprp * yprp
395	aireij4( i,jjp1 ) = un4rad2 * coslatp * xprm * yprp
396	cuij1(i,jjp1) = radclatp * xprp
397	cuij4(i,jjp1) = radclatp * xprm
398	cvij1(i,jjp1) = 0.5 * rad* yprp
399	cvij4(i,jjp1) = cvij1(i,jjp1)
400	END DO
401	!
402	DO i = 1, iim
403	aireij2( i,jjp1 ) = 0.
404	aireij3( i,jjp1 ) = 0.
405	cvij2 ( i,jjp1 ) = 0.
406	cvij3 ( i,jjp1 ) = 0.
407	cuij2 ( i,jjp1 ) = 0.
408	cuij3 ( i,jjp1 ) = 0.
409	ENDDO
410	!
411	END IF
412	!
413
414	IF ( j .gt. 1 .AND. j .lt. jjp1 ) THEN
415	!
416	rlatp = rlatu2 ( j-1 )
417	yprp = yprimu2( j-1 )
418	rlatm = rlatu1 ( j )
419	yprm = yprimu1( j )
420	!c rlatp = fy ( REAL(j) - 0.25 )
421	!c yprp = fyprim( REAL(j) - 0.25 )
422	!c rlatm = fy ( REAL(j) + 0.25 )
423	!c yprm = fyprim( REAL(j) + 0.25 )
424
425	coslatm = COS( rlatm )
426	coslatp = COS( rlatp )
427	radclatp = 0.5* rad * coslatp
428	radclatm = 0.5* rad * coslatm
429	!
430	ai14 = un4rad2 * coslatp * yprp
431	ai23 = un4rad2 * coslatm * yprm
432	DO i = 1,iim
433	xprp = xprimp025( i )
434	xprm = xprimm025( i )
435
436	aireij1 ( i,j ) = ai14 * xprp
437	aireij2 ( i,j ) = ai23 * xprp
438	aireij3 ( i,j ) = ai23 * xprm
439	aireij4 ( i,j ) = ai14 * xprm
440	cuij1 ( i,j ) = radclatp * xprp
441	cuij2 ( i,j ) = radclatm * xprp
442	cuij3 ( i,j ) = radclatm * xprm
443	cuij4 ( i,j ) = radclatp * xprm
444	cvij1 ( i,j ) = 0.5* rad * yprp
445	cvij2 ( i,j ) = 0.5* rad * yprm
446	cvij3 ( i,j ) = cvij2(i,j)
447	cvij4 ( i,j ) = cvij1(i,j)
448	END DO
449	!
450	END IF
451	!
452	! ........ periodicite ............
453	!
454	cvij1 (iip1,j) = cvij1 (1,j)
455	cvij2 (iip1,j) = cvij2 (1,j)
456	cvij3 (iip1,j) = cvij3 (1,j)
457	cvij4 (iip1,j) = cvij4 (1,j)
458	cuij1 (iip1,j) = cuij1 (1,j)
459	cuij2 (iip1,j) = cuij2 (1,j)
460	cuij3 (iip1,j) = cuij3 (1,j)
461	cuij4 (iip1,j) = cuij4 (1,j)
462	aireij1 (iip1,j) = aireij1 (1,j )
463	aireij2 (iip1,j) = aireij2 (1,j )
464	aireij3 (iip1,j) = aireij3 (1,j )
465	aireij4 (iip1,j) = aireij4 (1,j )
466
467	END DO
468	!
469	! ..............................................................
470	!
471	DO j = 1, jjp1
472	DO i = 1, iim
473	aire ( i,j ) = aireij1(i,j) + aireij2(i,j) + aireij3(i,j) + &
474	aireij4(i,j)
475	alpha1 ( i,j ) = aireij1(i,j) / aire(i,j)
476	alpha2 ( i,j ) = aireij2(i,j) / aire(i,j)
477	alpha3 ( i,j ) = aireij3(i,j) / aire(i,j)
478	alpha4 ( i,j ) = aireij4(i,j) / aire(i,j)
479	alpha1p2( i,j ) = alpha1 (i,j) + alpha2 (i,j)
480	alpha1p4( i,j ) = alpha1 (i,j) + alpha4 (i,j)
481	alpha2p3( i,j ) = alpha2 (i,j) + alpha3 (i,j)
482	alpha3p4( i,j ) = alpha3 (i,j) + alpha4 (i,j)
483	END DO
484	!
485	!
486	aire (iip1,j) = aire (1,j)
487	alpha1 (iip1,j) = alpha1 (1,j)
488	alpha2 (iip1,j) = alpha2 (1,j)
489	alpha3 (iip1,j) = alpha3 (1,j)
490	alpha4 (iip1,j) = alpha4 (1,j)
491	alpha1p2(iip1,j) = alpha1p2(1,j)
492	alpha1p4(iip1,j) = alpha1p4(1,j)
493	alpha2p3(iip1,j) = alpha2p3(1,j)
494	alpha3p4(iip1,j) = alpha3p4(1,j)
495	END DO
496	!
497
498	DO j = 1,jjp1
499	DO i = 1,iim
500	aireu (i,j)= aireij1(i,j) + aireij2(i,j) + aireij4(i+1,j) + &
501	aireij3(i+1,j)
502	unsaire ( i,j)= 1./ aire(i,j)
503	unsair_gam1( i,j)= unsaire(i,j)** ( - gamdi_gdiv )
504	unsair_gam2( i,j)= unsaire(i,j)** ( - gamdi_h )
505	airesurg ( i,j)= aire(i,j)/ g
506	END DO
507	aireu (iip1,j) = aireu (1,j)
508	unsaire (iip1,j) = unsaire(1,j)
509	unsair_gam1(iip1,j) = unsair_gam1(1,j)
510	unsair_gam2(iip1,j) = unsair_gam2(1,j)
511	airesurg (iip1,j) = airesurg(1,j)
512	END DO
513	!
514	!
515	DO j = 1,jjm
516	!
517	DO i=1,iim
518	airev (i,j) = aireij2(i,j)+ aireij3(i,j)+ aireij1(i,j+1) + &
519	aireij4(i,j+1)
520	ENDDO
521	DO i=1,iim
522	airez = aireij2(i,j)+aireij1(i,j+1)+aireij3(i+1,j) + &
523	aireij4(i+1,j+1)
524	unsairez(i,j) = 1./ airez
525	unsairz_gam(i,j)= unsairez(i,j)** ( - gamdi_grot )
526	fext (i,j) = airez * SIN(rlatv(j))* 2.* omeg
527	ENDDO
528	airev (iip1,j) = airev(1,j)
529	unsairez (iip1,j) = unsairez(1,j)
530	fext (iip1,j) = fext(1,j)
531	unsairz_gam(iip1,j) = unsairz_gam(1,j)
532	!
533	END DO
534	!
535	!
536	! ..... Calcul des elongations cu,cv, cvu .........
537	!
538	DO j = 1, jjm
539	DO i = 1, iim
540	cv(i,j) = 0.5 *( cvij2(i,j)+cvij3(i,j)+cvij1(i,j+1)+cvij4(i,j+1))
541	cvu(i,j)= 0.5 *( cvij1(i,j)+cvij4(i,j)+cvij2(i,j) +cvij3(i,j) )
542	cuv(i,j)= 0.5 *( cuij2(i,j)+cuij3(i,j)+cuij1(i,j+1)+cuij4(i,j+1))
543	unscv2(i,j) = 1./ ( cv(i,j)*cv(i,j) )
544	ENDDO
545	DO i = 1, iim
546	cuvsurcv (i,j) = airev(i,j) * unscv2(i,j)
547	cvsurcuv (i,j) = 1./cuvsurcv(i,j)
548	cuvscvgam1(i,j) = cuvsurcv (i,j) ** ( - gamdi_gdiv )
549	cuvscvgam2(i,j) = cuvsurcv (i,j) ** ( - gamdi_h )
550	cvscuvgam(i,j) = cvsurcuv (i,j) ** ( - gamdi_grot )
551	ENDDO
552	cv (iip1,j) = cv (1,j)
553	cvu (iip1,j) = cvu (1,j)
554	unscv2 (iip1,j) = unscv2 (1,j)
555	cuv (iip1,j) = cuv (1,j)
556	cuvsurcv (iip1,j) = cuvsurcv (1,j)
557	cvsurcuv (iip1,j) = cvsurcuv (1,j)
558	cuvscvgam1(iip1,j) = cuvscvgam1(1,j)
559	cuvscvgam2(iip1,j) = cuvscvgam2(1,j)
560	cvscuvgam(iip1,j) = cvscuvgam(1,j)
561	ENDDO
562
563	DO j = 2, jjm
564	DO i = 1, iim
565	cu(i,j) = 0.5*(cuij1(i,j)+cuij4(i+1,j)+cuij2(i,j)+cuij3(i+1,j))
566	unscu2 (i,j) = 1./ ( cu(i,j) * cu(i,j) )
567	cvusurcu (i,j) = aireu(i,j) * unscu2(i,j)
568	cusurcvu (i,j) = 1./ cvusurcu(i,j)
569	cvuscugam1 (i,j) = cvusurcu(i,j) ** ( - gamdi_gdiv )
570	cvuscugam2 (i,j) = cvusurcu(i,j) ** ( - gamdi_h )
571	cuscvugam (i,j) = cusurcvu(i,j) ** ( - gamdi_grot )
572	ENDDO
573	cu (iip1,j) = cu(1,j)
574	unscu2 (iip1,j) = unscu2(1,j)
575	cvusurcu (iip1,j) = cvusurcu(1,j)
576	cusurcvu (iip1,j) = cusurcvu(1,j)
577	cvuscugam1(iip1,j) = cvuscugam1(1,j)
578	cvuscugam2(iip1,j) = cvuscugam2(1,j)
579	cuscvugam (iip1,j) = cuscvugam(1,j)
580	ENDDO
581
582	!
583	! .... calcul aux poles ....
584	!
585	DO i = 1, iip1
586	cu ( i, 1 ) = 0.
587	unscu2( i, 1 ) = 0.
588	cvu ( i, 1 ) = 0.
589	!
590	cu (i, jjp1) = 0.
591	unscu2(i, jjp1) = 0.
592	cvu (i, jjp1) = 0.
593	ENDDO
594	!
595	! ..............................................................
596	!
597	DO j = 1, jjm
598	DO i= 1, iim
599	airvscu2 (i,j) = airev(i,j)/ ( cuv(i,j) * cuv(i,j) )
600	aivscu2gam(i,j) = airvscu2(i,j)** ( - gamdi_grot )
601	ENDDO
602	airvscu2 (iip1,j) = airvscu2(1,j)
603	aivscu2gam(iip1,j) = aivscu2gam(1,j)
604	ENDDO
605
606	DO j=2,jjm
607	DO i=1,iim
608	airuscv2 (i,j) = aireu(i,j)/ ( cvu(i,j) * cvu(i,j) )
609	aiuscv2gam (i,j) = airuscv2(i,j)** ( - gamdi_grot )
610	ENDDO
611	airuscv2 (iip1,j) = airuscv2 (1,j)
612	aiuscv2gam(iip1,j) = aiuscv2gam(1,j)
613	ENDDO
614
615	!
616	! calcul des aires aux poles :
617	! -----------------------------
618	!
619	apoln = SSUM(iim,aire(1,1),1)
620	apols = SSUM(iim,aire(1,jjp1),1)
621	unsapolnga1 = 1./ ( apoln ** ( - gamdi_gdiv ) )
622	unsapolsga1 = 1./ ( apols ** ( - gamdi_gdiv ) )
623	unsapolnga2 = 1./ ( apoln ** ( - gamdi_h ) )
624	unsapolsga2 = 1./ ( apols ** ( - gamdi_h ) )
625	!
626	!-----------------------------------------------------------------------
627	! gtitre='Coriolis version ancienne'
628	! gfichier='fext1'
629	! CALL writestd(fext,iip1*jjm)
630	!
631	! changement F. Hourdin calcul conservatif pour fext
632	! constang contient le produit a * cos ( latitude ) * omega
633	!
634	DO i=1,iim
635	constang(i,1) = 0.
636	ENDDO
637	DO j=1,jjm-1
638	DO i=1,iim
639	constang(i,j+1) = radomegcu(i,j+1)*COS(rlatu(j+1))
640	ENDDO
641	ENDDO
642	DO i=1,iim
643	constang(i,jjp1) = 0.
644	ENDDO
645	!
646	! periodicite en longitude
647	!
648	DO j=1,jjm
649	fext(iip1,j) = fext(1,j)
650	ENDDO
651	DO j=1,jjp1
652	constang(iip1,j) = constang(1,j)
653	ENDDO
654
655	! fin du changement
656
657	!
658	!-----------------------------------------------------------------------
659	!
660	WRITE(6,) ' Coordonnees de la grille * '
661	WRITE(6,995)
662	!
663	WRITE(6,*) ' LONGITUDES aux pts. V ( degres ) '
664	WRITE(6,995)
665	DO i=1,iip1
666	rlonvv(i) = rlonv(i)*180./pi
667	ENDDO
668	WRITE(6,400) rlonvv
669	!
670	WRITE(6,995)
671	WRITE(6,*) ' LATITUDES aux pts. V ( degres ) '
672	WRITE(6,995)
673	DO i=1,jjm
674	rlatuu(i)=rlatv(i)*180./pi
675	ENDDO
676	WRITE(6,400) (rlatuu(i),i=1,jjm)
677	!
678	DO i=1,iip1
679	rlonvv(i)=rlonu(i)*180./pi
680	ENDDO
681	WRITE(6,995)
682	WRITE(6,*) ' LONGITUDES aux pts. U ( degres ) '
683	WRITE(6,995)
684	WRITE(6,400) rlonvv
685	WRITE(6,995)
686
687	WRITE(6,*) ' LATITUDES aux pts. U ( degres ) '
688	WRITE(6,995)
689	DO i=1,jjp1
690	rlatuu(i)=rlatu(i)*180./pi
691	ENDDO
692	WRITE(6,400) (rlatuu(i),i=1,jjp1)
693	WRITE(6,995)
694	!
695	444 format(f10.3,f6.0)
696	400 FORMAT(1x,8f8.2)
697	990 FORMAT(//)
698	995 FORMAT(/)
699	!
700	RETURN
701	END SUBROUTINE inigeom

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