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fxhyp_m.F90 @ 2228

Last change on this file since 2228 was 2228, checked in by lguez, 9 years ago

Correcting a problem from revision 2218. The type double precision
with option "-fdefault-real-8" of gfortran is promoted to 16-byte
precision and there is no specific procedure in arth with this
precision. Could not add a specific procedure in arth with double
precision because, with ifort, the option "-real-size 64" does not
promote the double precision, so that would make two identical
specific procedures in arth.

In module nrtype, replaced double precision by a parameterized real
kind so that the effective precision does not depend on a compiler
option.

In coefpoly, fxhyp, fyhyp and invert_zoom_x, use the parameterized
real kind defined in nrtype, instead of double precision.

Also, in module nrtype, removed unused derived types sprs2_sp and
sprs2_dp.

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: 7.4 KB

Line
1	module fxhyp_m
2
3	IMPLICIT NONE
4
5	contains
6
7	SUBROUTINE fxhyp(xprimm025, rlonv, xprimv, rlonu, xprimu, xprimp025)
8
9	! From LMDZ4/libf/dyn3d/fxhyp.F, version 1.2, 2005/06/03 09:11:32
10	! Author: P. Le Van, from formulas by R. Sadourny
11
12	! Calcule les longitudes et dérivées dans la grille du GCM pour
13	! une fonction f(x) à dérivée tangente hyperbolique.
14
15	! Il vaut mieux avoir : grossismx \times dzoom < pi
16
17	! Le premier point scalaire pour une grille regulière (grossismx =
18	! 1., taux=0., clon=0.) est à - 180 degrés.
19
20	use arth_m, only: arth
21	use invert_zoom_x_m, only: invert_zoom_x, nmax
22	use nrtype, only: pi, pi_d, twopi, twopi_d, k8
23	use principal_cshift_m, only: principal_cshift
24
25	include "dimensions.h"
26	! for iim
27
28	include "serre.h"
29	! for clon, grossismx, dzoomx, taux
30
31	REAL, intent(out):: xprimm025(:), rlonv(:), xprimv(:) ! (iim + 1)
32	real, intent(out):: rlonu(:), xprimu(:), xprimp025(:) ! (iim + 1)
33
34	! Local:
35	real rlonm025(iim + 1), rlonp025(iim + 1)
36	REAL dzoom, step
37	real d_rlonv(iim)
38	REAL(K8) xtild(0:2 * nmax)
39	REAL(K8) fhyp(nmax:2 * nmax), ffdx, beta, Xprimt(0:2 * nmax)
40	REAL(K8) Xf(0:2 * nmax), xxpr(2 * nmax)
41	REAL(K8) fa, fb
42	INTEGER i, is2
43	REAL(K8) xmoy, fxm
44
45	!----------------------------------------------------------------------
46
47	print *, "Call sequence information: fxhyp"
48
49	test_iim: if (iim==1) then
50	rlonv(1)=0.
51	rlonu(1)=pi
52	rlonv(2)=rlonv(1)+twopi
53	rlonu(2)=rlonu(1)+twopi
54
55	xprimm025(:)=1.
56	xprimv(:)=1.
57	xprimu(:)=1.
58	xprimp025(:)=1.
59	else test_iim
60	test_grossismx: if (grossismx == 1.) then
61	step = twopi / iim
62
63	xprimm025(:iim) = step
64	xprimp025(:iim) = step
65	xprimv(:iim) = step
66	xprimu(:iim) = step
67
68	rlonv(:iim) = arth(- pi + clon / 180. * pi, step, iim)
69	rlonm025(:iim) = rlonv(:iim) - 0.25 * step
70	rlonp025(:iim) = rlonv(:iim) + 0.25 * step
71	rlonu(:iim) = rlonv(:iim) + 0.5 * step
72	else test_grossismx
73	dzoom = dzoomx * twopi_d
74	xtild = arth(- pi_d, pi_d / nmax, 2 * nmax + 1)
75
76	! Compute fhyp:
77	DO i = nmax, 2 * nmax
78	fa = taux * (dzoom / 2. - xtild(i))
79	fb = xtild(i) * (pi_d - xtild(i))
80
81	IF (200. * fb < - fa) THEN
82	fhyp(i) = - 1.
83	ELSE IF (200. * fb < fa) THEN
84	fhyp(i) = 1.
85	ELSE
86	IF (ABS(fa) < 1e-13 .AND. ABS(fb) < 1e-13) THEN
87	IF (200. * fb + fa < 1e-10) THEN
88	fhyp(i) = - 1.
89	ELSE IF (200. * fb - fa < 1e-10) THEN
90	fhyp(i) = 1.
91	END IF
92	ELSE
93	fhyp(i) = TANH(fa / fb)
94	END IF
95	END IF
96
97	IF (xtild(i) == 0.) fhyp(i) = 1.
98	IF (xtild(i) == pi_d) fhyp(i) = -1.
99	END DO
100
101	! Calcul de beta
102
103	ffdx = 0.
104
105	DO i = nmax + 1, 2 * nmax
106	xmoy = 0.5 * (xtild(i-1) + xtild(i))
107	fa = taux * (dzoom / 2. - xmoy)
108	fb = xmoy * (pi_d - xmoy)
109
110	IF (200. * fb < - fa) THEN
111	fxm = - 1.
112	ELSE IF (200. * fb < fa) THEN
113	fxm = 1.
114	ELSE
115	IF (ABS(fa) < 1e-13 .AND. ABS(fb) < 1e-13) THEN
116	IF (200. * fb + fa < 1e-10) THEN
117	fxm = - 1.
118	ELSE IF (200. * fb - fa < 1e-10) THEN
119	fxm = 1.
120	END IF
121	ELSE
122	fxm = TANH(fa / fb)
123	END IF
124	END IF
125
126	IF (xmoy == 0.) fxm = 1.
127	IF (xmoy == pi_d) fxm = -1.
128
129	ffdx = ffdx + fxm * (xtild(i) - xtild(i-1))
130	END DO
131
132	print *, "ffdx = ", ffdx
133	beta = (grossismx * ffdx - pi_d) / (ffdx - pi_d)
134	print *, "beta = ", beta
135
136	IF (2. * beta - grossismx <= 0.) THEN
137	print *, 'Bad choice of grossismx, taux, dzoomx.'
138	print *, 'Decrease dzoomx or grossismx.'
139	STOP 1
140	END IF
141
142	! calcul de Xprimt
143	Xprimt(nmax:2 * nmax) = beta + (grossismx - beta) * fhyp
144	xprimt(:nmax - 1) = xprimt(2 * nmax:nmax + 1:- 1)
145
146	! Calcul de Xf
147
148	DO i = nmax + 1, 2 * nmax
149	xmoy = 0.5 * (xtild(i-1) + xtild(i))
150	fa = taux * (dzoom / 2. - xmoy)
151	fb = xmoy * (pi_d - xmoy)
152
153	IF (200. * fb < - fa) THEN
154	fxm = - 1.
155	ELSE IF (200. * fb < fa) THEN
156	fxm = 1.
157	ELSE
158	fxm = TANH(fa / fb)
159	END IF
160
161	IF (xmoy == 0.) fxm = 1.
162	IF (xmoy == pi_d) fxm = -1.
163	xxpr(i) = beta + (grossismx - beta) * fxm
164	END DO
165
166	xxpr(:nmax) = xxpr(2 * nmax:nmax + 1:- 1)
167
168	Xf(0) = - pi_d
169
170	DO i=1, 2 * nmax - 1
171	Xf(i) = Xf(i-1) + xxpr(i) * (xtild(i) - xtild(i-1))
172	END DO
173
174	Xf(2 * nmax) = pi_d
175
176	call invert_zoom_x(xf, xtild, Xprimt, rlonm025(:iim), &
177	xprimm025(:iim), xuv = - 0.25_k8)
178	call invert_zoom_x(xf, xtild, Xprimt, rlonv(:iim), xprimv(:iim), &
179	xuv = 0._k8)
180	call invert_zoom_x(xf, xtild, Xprimt, rlonu(:iim), xprimu(:iim), &
181	xuv = 0.5_k8)
182	call invert_zoom_x(xf, xtild, Xprimt, rlonp025(:iim), &
183	xprimp025(:iim), xuv = 0.25_k8)
184	end if test_grossismx
185
186	is2 = 0
187
188	IF (MINval(rlonm025(:iim)) < - pi - 0.1 &
189	.or. MAXval(rlonm025(:iim)) > pi + 0.1) THEN
190	IF (clon <= 0.) THEN
191	is2 = 1
192
193	do while (rlonm025(is2) < - pi .and. is2 < iim)
194	is2 = is2 + 1
195	end do
196
197	if (rlonm025(is2) < - pi) then
198	print *, 'Rlonm025 plus petit que - pi !'
199	STOP 1
200	end if
201	ELSE
202	is2 = iim
203
204	do while (rlonm025(is2) > pi .and. is2 > 1)
205	is2 = is2 - 1
206	end do
207
208	if (rlonm025(is2) > pi) then
209	print *, 'Rlonm025 plus grand que pi !'
210	STOP 1
211	end if
212	END IF
213	END IF
214
215	call principal_cshift(is2, rlonm025, xprimm025)
216	call principal_cshift(is2, rlonv, xprimv)
217	call principal_cshift(is2, rlonu, xprimu)
218	call principal_cshift(is2, rlonp025, xprimp025)
219
220	forall (i = 1: iim) d_rlonv(i) = rlonv(i + 1) - rlonv(i)
221	print , "Minimum longitude step:", MINval(d_rlonv) 180. / pi, &
222	"degrees"
223	print , "Maximum longitude step:", MAXval(d_rlonv) 180. / pi, &
224	"degrees"
225
226	! Check that rlonm025 <= rlonv <= rlonp025 <= rlonu:
227	DO i = 1, iim + 1
228	IF (rlonp025(i) < rlonv(i)) THEN
229	print *, 'rlonp025(', i, ') = ', rlonp025(i)
230	print *, "< rlonv(", i, ") = ", rlonv(i)
231	STOP 1
232	END IF
233
234	IF (rlonv(i) < rlonm025(i)) THEN
235	print *, 'rlonv(', i, ') = ', rlonv(i)
236	print *, "< rlonm025(", i, ") = ", rlonm025(i)
237	STOP 1
238	END IF
239
240	IF (rlonp025(i) > rlonu(i)) THEN
241	print *, 'rlonp025(', i, ') = ', rlonp025(i)
242	print *, "> rlonu(", i, ") = ", rlonu(i)
243	STOP 1
244	END IF
245	END DO
246	end if test_iim
247
248	END SUBROUTINE fxhyp
249
250	end module fxhyp_m

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