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source: palm/trunk/SOURCE/lpm_advec.f90 @ 1320

Last change on this file since 1320 was 1320, checked in by raasch, 11 years ago
ONLY-attribute added to USE-statements, kind-parameters added to all INTEGER and REAL declaration statements, kinds are defined in new module kinds, old module precision_kind is removed, revision history before 2012 removed, comment fields (!:) to be used for variable explanations added to all variable declaration statements
Property svn:keywords set to `Id`
File size: 55.2 KB

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1	SUBROUTINE lpm_advec
2
3	!--------------------------------------------------------------------------------!
4	! This file is part of PALM.
5	!
6	! PALM is free software: you can redistribute it and/or modify it under the terms
7	! of the GNU General Public License as published by the Free Software Foundation,
8	! either version 3 of the License, or (at your option) any later version.
9	!
10	! PALM is distributed in the hope that it will be useful, but WITHOUT ANY
11	! WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR
12	! A PARTICULAR PURPOSE. See the GNU General Public License for more details.
13	!
14	! You should have received a copy of the GNU General Public License along with
15	! PALM. If not, see <http://www.gnu.org/licenses/>.
16	!
17	! Copyright 1997-2014 Leibniz Universitaet Hannover
18	!--------------------------------------------------------------------------------!
19	!
20	! Current revisions:
21	! ------------------
22	! ONLY-attribute added to USE-statements,
23	! kind-parameters added to all INTEGER and REAL declaration statements,
24	! kinds are defined in new module kinds,
25	! revision history before 2012 removed,
26	! comment fields (!:) to be used for variable explanations added to
27	! all variable declaration statements
28	!
29	! Former revisions:
30	! -----------------
31	! $Id: lpm_advec.f90 1320 2014-03-20 08:40:49Z raasch $
32	!
33	! 1314 2014-03-14 18:25:17Z suehring
34	! Vertical logarithmic interpolation of horizontal particle speed for particles
35	! between roughness height and first vertical grid level.
36	!
37	! 1036 2012-10-22 13:43:42Z raasch
38	! code put under GPL (PALM 3.9)
39	!
40	! 849 2012-03-15 10:35:09Z raasch
41	! initial revision (former part of advec_particles)
42	!
43	!
44	! Description:
45	! ------------
46	! Calculation of new particle positions due to advection using a simple Euler
47	! scheme. Particles may feel inertia effects. SGS transport can be included
48	! using the stochastic model of Weil et al. (2004, JAS, 61, 2877-2887).
49	!------------------------------------------------------------------------------!
50
51	USE arrays_3d, &
52	ONLY: de_dx, de_dy, de_dz, diss, e, u, us, usws, v, vsws, w, z0, zu, zw
53
54	USE control_parameters, &
55	ONLY: atmos_ocean_sign, cloud_droplets, dt_3d, dt_3d_reached_l, dz, &
56	g, kappa, molecular_viscosity, prandtl_layer, topography, &
57	u_gtrans, v_gtrans
58
59	USE grid_variables, &
60	ONLY: ddx, dx, ddy, dy
61
62	USE indices, &
63	ONLY: nzb, nzb_s_inner, nzt
64
65	USE kinds
66
67	USE particle_attributes, &
68	ONLY: c_0, density_ratio, dt_min_part, iran_part, log_z_z0, &
69	number_of_particles, number_of_sublayers, particles, &
70	particle_groups, offset_ocean_nzt, offset_ocean_nzt_m1, &
71	sgs_wfu_part, sgs_wfv_part, sgs_wfw_part, use_sgs_for_particles,&
72	vertical_particle_advection, z0_av_global
73
74	USE statistics, &
75	ONLY: hom
76
77
78	IMPLICIT NONE
79
80	INTEGER(iwp) :: agp !:
81	INTEGER(iwp) :: gp_outside_of_building(1:8) !:
82	INTEGER(iwp) :: i !:
83	INTEGER(iwp) :: j !:
84	INTEGER(iwp) :: k !:
85	INTEGER(iwp) :: kw !:
86	INTEGER(iwp) :: n !:
87	INTEGER(iwp) :: num_gp !:
88
89	REAL(wp) :: aa !:
90	REAL(wp) :: bb !:
91	REAL(wp) :: cc !:
92	REAL(wp) :: d_sum !:
93	REAL(wp) :: d_z_p_z0 !:
94	REAL(wp) :: dd !:
95	REAL(wp) :: de_dx_int !:
96	REAL(wp) :: de_dx_int_l !:
97	REAL(wp) :: de_dx_int_u !:
98	REAL(wp) :: de_dy_int !:
99	REAL(wp) :: de_dy_int_l !:
100	REAL(wp) :: de_dy_int_u !:
101	REAL(wp) :: de_dt !:
102	REAL(wp) :: de_dt_min !:
103	REAL(wp) :: de_dz_int !:
104	REAL(wp) :: de_dz_int_l !:
105	REAL(wp) :: de_dz_int_u !:
106	REAL(wp) :: dens_ratio !:
107	REAL(wp) :: diss_int !:
108	REAL(wp) :: diss_int_l !:
109	REAL(wp) :: diss_int_u !:
110	REAL(wp) :: dt_gap !:
111	REAL(wp) :: dt_particle !:
112	REAL(wp) :: dt_particle_m !:
113	REAL(wp) :: e_int !:
114	REAL(wp) :: e_int_l !:
115	REAL(wp) :: e_int_u !:
116	REAL(wp) :: e_mean_int !:
117	REAL(wp) :: exp_arg !:
118	REAL(wp) :: exp_term !:
119	REAL(wp) :: fs_int !:
120	REAL(wp) :: gg !:
121	REAL(wp) :: height_int !:
122	REAL(wp) :: height_p !:
123	REAL(wp) :: lagr_timescale !:
124	REAL(wp) :: location(1:30,1:3) !:
125	REAL(wp) :: log_z_z0_int !:
126	REAL(wp) :: random_gauss !:
127	REAL(wp) :: u_int !:
128	REAL(wp) :: u_int_l !:
129	REAL(wp) :: u_int_u !:
130	REAL(wp) :: us_int !:
131	REAL(wp) :: v_int !:
132	REAL(wp) :: v_int_l !:
133	REAL(wp) :: v_int_u !:
134	REAL(wp) :: vv_int !:
135	REAL(wp) :: w_int !:
136	REAL(wp) :: w_int_l !:
137	REAL(wp) :: w_int_u !:
138	REAL(wp) :: x !:
139	REAL(wp) :: y !:
140	REAL(wp) :: z_p !:
141
142	REAL(wp), DIMENSION(1:30) :: d_gp_pl !:
143	REAL(wp), DIMENSION(1:30) :: de_dxi !:
144	REAL(wp), DIMENSION(1:30) :: de_dyi !:
145	REAL(wp), DIMENSION(1:30) :: de_dzi !:
146	REAL(wp), DIMENSION(1:30) :: dissi !:
147	REAL(wp), DIMENSION(1:30) :: ei !:
148
149	!
150	!-- Determine height of Prandtl layer and distance between Prandtl-layer
151	!-- height and horizontal mean roughness height, which are required for
152	!-- vertical logarithmic interpolation of horizontal particle speeds
153	!-- (for particles below first vertical grid level).
154	z_p = zu(nzb+1) - zw(nzb)
155	d_z_p_z0 = 1.0 / ( z_p - z0_av_global )
156
157	DO n = 1, number_of_particles
158
159	!
160	!-- Move particle only if the LES timestep has not (approximately) been
161	!-- reached
162	IF ( ( dt_3d - particles(n)%dt_sum ) < 1E-8 ) CYCLE
163	!
164	!-- Determine bottom index
165	k = ( particles(n)%z + 0.5 * dz * atmos_ocean_sign ) / dz &
166	+ offset_ocean_nzt ! only exact if equidistant
167	!
168	!-- Interpolation of the u velocity component onto particle position.
169	!-- Particles are interpolation bi-linearly in the horizontal and a
170	!-- linearly in the vertical. An exception is made for particles below
171	!-- the first vertical grid level in case of a prandtl layer. In this
172	!-- case the horizontal particle velocity components are determined using
173	!-- Monin-Obukhov relations (if branch).
174	!-- First, check if particle is located below first vertical grid level
175	!-- (Prandtl-layer height)
176	IF ( prandtl_layer .AND. particles(n)%z < z_p ) THEN
177	!
178	!-- Resolved-scale horizontal particle velocity is zero below z0.
179	IF ( particles(n)%z < z0_av_global ) THEN
180
181	u_int = 0.0
182
183	ELSE
184	!
185	!-- Determine the sublayer. Further used as index.
186	height_p = ( particles(n)%z - z0_av_global ) &
187	* REAL( number_of_sublayers ) &
188	* d_z_p_z0
189	!
190	!-- Calculate LOG(z/z0) for exact particle height. Therefore,
191	!-- interpolate linearly between precalculated logarithm.
192	log_z_z0_int = log_z_z0(INT(height_p)) &
193	+ ( height_p - INT(height_p) ) &
194	* ( log_z_z0(INT(height_p)+1) &
195	- log_z_z0(INT(height_p)) &
196	)
197	!
198	!-- Neutral solution is applied for all situations, e.g. also for
199	!-- unstable and stable situations. Even though this is not exact
200	!-- this saves a lot of CPU time since several calls of intrinsic
201	!-- FORTRAN procedures (LOG, ATAN) are avoided, This is justified
202	!-- as sensitivity studies revealed no significant effect of
203	!-- using the neutral solution also for un/stable situations.
204	!-- Calculated left and bottom index on u grid.
205	i = ( particles(n)%x + 0.5 * dx ) * ddx
206	j = particles(n)%y * ddy
207
208	us_int = 0.5 * ( us(j,i) + us(j,i-1) )
209
210	u_int = -usws(j,i) / ( us_int * kappa + 1E-10 ) &
211	* log_z_z0_int
212
213	ENDIF
214	!
215	!-- Particle above the first grid level. Bi-linear interpolation in the
216	!-- horizontal and linear interpolation in the vertical direction.
217	ELSE
218	!
219	!-- Interpolate u velocity-component, determine left, front, bottom
220	!-- index of u-array. Adopt k index from above
221	i = ( particles(n)%x + 0.5 * dx ) * ddx
222	j = particles(n)%y * ddy
223	!
224	!-- Interpolation of the velocity components in the xy-plane
225	x = particles(n)%x + ( 0.5 - i ) * dx
226	y = particles(n)%y - j * dy
227	aa = x2 + y2
228	bb = ( dx - x )2 + y2
229	cc = x2 + ( dy - y )2
230	dd = ( dx - x )2 + ( dy - y )2
231	gg = aa + bb + cc + dd
232
233	u_int_l = ( ( gg - aa ) * u(k,j,i) + ( gg - bb ) * u(k,j,i+1) &
234	+ ( gg - cc ) * u(k,j+1,i) + ( gg - dd ) * u(k,j+1,i+1)&
235	) / ( 3.0 * gg ) - u_gtrans
236
237	IF ( k+1 == nzt+1 ) THEN
238
239	u_int = u_int_l
240
241	ELSE
242
243	u_int_u = ( ( gg-aa ) * u(k+1,j,i) + ( gg-bb ) * u(k+1,j,i+1) &
244	+ ( gg-cc ) * u(k+1,j+1,i) + ( gg-dd ) * u(k+1,j+1,i+1) &
245	) / ( 3.0 * gg ) - u_gtrans
246
247	u_int = u_int_l + ( particles(n)%z - zu(k) ) / dz * &
248	( u_int_u - u_int_l )
249
250	ENDIF
251
252	ENDIF
253
254	!
255	!-- Same procedure for interpolation of the v velocity-component.
256	IF ( prandtl_layer .AND. particles(n)%z < z_p ) THEN
257	!
258	!-- Resolved-scale horizontal particle velocity is zero below z0.
259	IF ( particles(n)%z < z0_av_global ) THEN
260
261	v_int = 0.0
262
263	ELSE
264	!
265	!-- Neutral solution is applied for all situations, e.g. also for
266	!-- unstable and stable situations. Even though this is not exact
267	!-- this saves a lot of CPU time since several calls of intrinsic
268	!-- FORTRAN procedures (LOG, ATAN) are avoided, This is justified
269	!-- as sensitivity studies revealed no significant effect of
270	!-- using the neutral solution also for un/stable situations.
271	!-- Calculated left and bottom index on v grid.
272	i = particles(n)%x * ddx
273	j = ( particles(n)%y + 0.5 * dy ) * ddy
274
275	us_int = 0.5 * ( us(j,i) + us(j-1,i) )
276
277	v_int = -vsws(j,i) / ( us_int * kappa + 1E-10 ) &
278	* log_z_z0_int
279
280	ENDIF
281	!
282	!-- Particle above the first grid level. Bi-linear interpolation in the
283	!-- horizontal and linear interpolation in the vertical direction.
284	ELSE
285	i = particles(n)%x * ddx
286	j = ( particles(n)%y + 0.5 * dy ) * ddy
287	x = particles(n)%x - i * dx
288	y = particles(n)%y + ( 0.5 - j ) * dy
289	aa = x2 + y2
290	bb = ( dx - x )2 + y2
291	cc = x2 + ( dy - y )2
292	dd = ( dx - x )2 + ( dy - y )2
293	gg = aa + bb + cc + dd
294
295	v_int_l = ( ( gg - aa ) * v(k,j,i) + ( gg - bb ) * v(k,j,i+1) &
296	+ ( gg - cc ) * v(k,j+1,i) + ( gg - dd ) * v(k,j+1,i+1)&
297	) / ( 3.0 * gg ) - v_gtrans
298	IF ( k+1 == nzt+1 ) THEN
299	v_int = v_int_l
300	ELSE
301	v_int_u = ( ( gg-aa ) * v(k+1,j,i) + ( gg-bb ) * v(k+1,j,i+1) &
302	+ ( gg-cc ) * v(k+1,j+1,i) + ( gg-dd ) * v(k+1,j+1,i+1) &
303	) / ( 3.0 * gg ) - v_gtrans
304	v_int = v_int_l + ( particles(n)%z - zu(k) ) / dz * &
305	( v_int_u - v_int_l )
306	ENDIF
307
308	ENDIF
309
310	!
311	!-- Same procedure for interpolation of the w velocity-component
312	IF ( vertical_particle_advection(particles(n)%group) ) THEN
313	i = particles(n)%x * ddx
314	j = particles(n)%y * ddy
315	k = particles(n)%z / dz + offset_ocean_nzt_m1
316
317	x = particles(n)%x - i * dx
318	y = particles(n)%y - j * dy
319	aa = x2 + y2
320	bb = ( dx - x )2 + y2
321	cc = x2 + ( dy - y )2
322	dd = ( dx - x )2 + ( dy - y )2
323	gg = aa + bb + cc + dd
324
325	w_int_l = ( ( gg - aa ) * w(k,j,i) + ( gg - bb ) * w(k,j,i+1) &
326	+ ( gg - cc ) * w(k,j+1,i) + ( gg - dd ) * w(k,j+1,i+1) &
327	) / ( 3.0 * gg )
328	IF ( k+1 == nzt+1 ) THEN
329	w_int = w_int_l
330	ELSE
331	w_int_u = ( ( gg-aa ) * w(k+1,j,i) + &
332	( gg-bb ) * w(k+1,j,i+1) + &
333	( gg-cc ) * w(k+1,j+1,i) + &
334	( gg-dd ) * w(k+1,j+1,i+1) &
335	) / ( 3.0 * gg )
336	w_int = w_int_l + ( particles(n)%z - zw(k) ) / dz * &
337	( w_int_u - w_int_l )
338	ENDIF
339	ELSE
340	w_int = 0.0
341	ENDIF
342
343	!
344	!-- Interpolate and calculate quantities needed for calculating the SGS
345	!-- velocities
346	IF ( use_sgs_for_particles ) THEN
347	!
348	!-- Interpolate TKE
349	i = particles(n)%x * ddx
350	j = particles(n)%y * ddy
351	k = ( particles(n)%z + 0.5 * dz * atmos_ocean_sign ) / dz &
352	+ offset_ocean_nzt ! only exact if eq.dist
353
354	IF ( topography == 'flat' ) THEN
355
356	x = particles(n)%x - i * dx
357	y = particles(n)%y - j * dy
358	aa = x2 + y2
359	bb = ( dx - x )2 + y2
360	cc = x2 + ( dy - y )2
361	dd = ( dx - x )2 + ( dy - y )2
362	gg = aa + bb + cc + dd
363
364	e_int_l = ( ( gg-aa ) * e(k,j,i) + ( gg-bb ) * e(k,j,i+1) &
365	+ ( gg-cc ) * e(k,j+1,i) + ( gg-dd ) * e(k,j+1,i+1) &
366	) / ( 3.0 * gg )
367
368	IF ( k+1 == nzt+1 ) THEN
369	e_int = e_int_l
370	ELSE
371	e_int_u = ( ( gg - aa ) * e(k+1,j,i) + &
372	( gg - bb ) * e(k+1,j,i+1) + &
373	( gg - cc ) * e(k+1,j+1,i) + &
374	( gg - dd ) * e(k+1,j+1,i+1) &
375	) / ( 3.0 * gg )
376	e_int = e_int_l + ( particles(n)%z - zu(k) ) / dz * &
377	( e_int_u - e_int_l )
378	ENDIF
379
380	!
381	!-- Interpolate the TKE gradient along x (adopt incides i,j,k and
382	!-- all position variables from above (TKE))
383	de_dx_int_l = ( ( gg - aa ) * de_dx(k,j,i) + &
384	( gg - bb ) * de_dx(k,j,i+1) + &
385	( gg - cc ) * de_dx(k,j+1,i) + &
386	( gg - dd ) * de_dx(k,j+1,i+1) &
387	) / ( 3.0 * gg )
388
389	IF ( ( k+1 == nzt+1 ) .OR. ( k == nzb ) ) THEN
390	de_dx_int = de_dx_int_l
391	ELSE
392	de_dx_int_u = ( ( gg - aa ) * de_dx(k+1,j,i) + &
393	( gg - bb ) * de_dx(k+1,j,i+1) + &
394	( gg - cc ) * de_dx(k+1,j+1,i) + &
395	( gg - dd ) * de_dx(k+1,j+1,i+1) &
396	) / ( 3.0 * gg )
397	de_dx_int = de_dx_int_l + ( particles(n)%z - zu(k) ) / dz * &
398	( de_dx_int_u - de_dx_int_l )
399	ENDIF
400
401	!
402	!-- Interpolate the TKE gradient along y
403	de_dy_int_l = ( ( gg - aa ) * de_dy(k,j,i) + &
404	( gg - bb ) * de_dy(k,j,i+1) + &
405	( gg - cc ) * de_dy(k,j+1,i) + &
406	( gg - dd ) * de_dy(k,j+1,i+1) &
407	) / ( 3.0 * gg )
408	IF ( ( k+1 == nzt+1 ) .OR. ( k == nzb ) ) THEN
409	de_dy_int = de_dy_int_l
410	ELSE
411	de_dy_int_u = ( ( gg - aa ) * de_dy(k+1,j,i) + &
412	( gg - bb ) * de_dy(k+1,j,i+1) + &
413	( gg - cc ) * de_dy(k+1,j+1,i) + &
414	( gg - dd ) * de_dy(k+1,j+1,i+1) &
415	) / ( 3.0 * gg )
416	de_dy_int = de_dy_int_l + ( particles(n)%z - zu(k) ) / dz * &
417	( de_dy_int_u - de_dy_int_l )
418	ENDIF
419
420	!
421	!-- Interpolate the TKE gradient along z
422	IF ( particles(n)%z < 0.5 * dz ) THEN
423	de_dz_int = 0.0
424	ELSE
425	de_dz_int_l = ( ( gg - aa ) * de_dz(k,j,i) + &
426	( gg - bb ) * de_dz(k,j,i+1) + &
427	( gg - cc ) * de_dz(k,j+1,i) + &
428	( gg - dd ) * de_dz(k,j+1,i+1) &
429	) / ( 3.0 * gg )
430
431	IF ( ( k+1 == nzt+1 ) .OR. ( k == nzb ) ) THEN
432	de_dz_int = de_dz_int_l
433	ELSE
434	de_dz_int_u = ( ( gg - aa ) * de_dz(k+1,j,i) + &
435	( gg - bb ) * de_dz(k+1,j,i+1) + &
436	( gg - cc ) * de_dz(k+1,j+1,i) + &
437	( gg - dd ) * de_dz(k+1,j+1,i+1) &
438	) / ( 3.0 * gg )
439	de_dz_int = de_dz_int_l + ( particles(n)%z - zu(k) ) / dz * &
440	( de_dz_int_u - de_dz_int_l )
441	ENDIF
442	ENDIF
443
444	!
445	!-- Interpolate the dissipation of TKE
446	diss_int_l = ( ( gg - aa ) * diss(k,j,i) + &
447	( gg - bb ) * diss(k,j,i+1) + &
448	( gg - cc ) * diss(k,j+1,i) + &
449	( gg - dd ) * diss(k,j+1,i+1) &
450	) / ( 3.0 * gg )
451
452	IF ( k+1 == nzt+1 ) THEN
453	diss_int = diss_int_l
454	ELSE
455	diss_int_u = ( ( gg - aa ) * diss(k+1,j,i) + &
456	( gg - bb ) * diss(k+1,j,i+1) + &
457	( gg - cc ) * diss(k+1,j+1,i) + &
458	( gg - dd ) * diss(k+1,j+1,i+1) &
459	) / ( 3.0 * gg )
460	diss_int = diss_int_l + ( particles(n)%z - zu(k) ) / dz * &
461	( diss_int_u - diss_int_l )
462	ENDIF
463
464	ELSE
465
466	!
467	!-- In case that there are buildings it has to be determined
468	!-- how many of the gridpoints defining the particle box are
469	!-- situated within a building
470	!-- gp_outside_of_building(1): i,j,k
471	!-- gp_outside_of_building(2): i,j+1,k
472	!-- gp_outside_of_building(3): i,j,k+1
473	!-- gp_outside_of_building(4): i,j+1,k+1
474	!-- gp_outside_of_building(5): i+1,j,k
475	!-- gp_outside_of_building(6): i+1,j+1,k
476	!-- gp_outside_of_building(7): i+1,j,k+1
477	!-- gp_outside_of_building(8): i+1,j+1,k+1
478
479	gp_outside_of_building = 0
480	location = 0.0
481	num_gp = 0
482
483	IF ( k > nzb_s_inner(j,i) .OR. nzb_s_inner(j,i) == 0 ) THEN
484	num_gp = num_gp + 1
485	gp_outside_of_building(1) = 1
486	location(num_gp,1) = i * dx
487	location(num_gp,2) = j * dy
488	location(num_gp,3) = k * dz - 0.5 * dz
489	ei(num_gp) = e(k,j,i)
490	dissi(num_gp) = diss(k,j,i)
491	de_dxi(num_gp) = de_dx(k,j,i)
492	de_dyi(num_gp) = de_dy(k,j,i)
493	de_dzi(num_gp) = de_dz(k,j,i)
494	ENDIF
495
496	IF ( k > nzb_s_inner(j+1,i) .OR. nzb_s_inner(j+1,i) == 0 ) &
497	THEN
498	num_gp = num_gp + 1
499	gp_outside_of_building(2) = 1
500	location(num_gp,1) = i * dx
501	location(num_gp,2) = (j+1) * dy
502	location(num_gp,3) = k * dz - 0.5 * dz
503	ei(num_gp) = e(k,j+1,i)
504	dissi(num_gp) = diss(k,j+1,i)
505	de_dxi(num_gp) = de_dx(k,j+1,i)
506	de_dyi(num_gp) = de_dy(k,j+1,i)
507	de_dzi(num_gp) = de_dz(k,j+1,i)
508	ENDIF
509
510	IF ( k+1 > nzb_s_inner(j,i) .OR. nzb_s_inner(j,i) == 0 ) THEN
511	num_gp = num_gp + 1
512	gp_outside_of_building(3) = 1
513	location(num_gp,1) = i * dx
514	location(num_gp,2) = j * dy
515	location(num_gp,3) = (k+1) * dz - 0.5 * dz
516	ei(num_gp) = e(k+1,j,i)
517	dissi(num_gp) = diss(k+1,j,i)
518	de_dxi(num_gp) = de_dx(k+1,j,i)
519	de_dyi(num_gp) = de_dy(k+1,j,i)
520	de_dzi(num_gp) = de_dz(k+1,j,i)
521	ENDIF
522
523	IF ( k+1 > nzb_s_inner(j+1,i) .OR. nzb_s_inner(j+1,i) == 0 ) &
524	THEN
525	num_gp = num_gp + 1
526	gp_outside_of_building(4) = 1
527	location(num_gp,1) = i * dx
528	location(num_gp,2) = (j+1) * dy
529	location(num_gp,3) = (k+1) * dz - 0.5 * dz
530	ei(num_gp) = e(k+1,j+1,i)
531	dissi(num_gp) = diss(k+1,j+1,i)
532	de_dxi(num_gp) = de_dx(k+1,j+1,i)
533	de_dyi(num_gp) = de_dy(k+1,j+1,i)
534	de_dzi(num_gp) = de_dz(k+1,j+1,i)
535	ENDIF
536
537	IF ( k > nzb_s_inner(j,i+1) .OR. nzb_s_inner(j,i+1) == 0 ) &
538	THEN
539	num_gp = num_gp + 1
540	gp_outside_of_building(5) = 1
541	location(num_gp,1) = (i+1) * dx
542	location(num_gp,2) = j * dy
543	location(num_gp,3) = k * dz - 0.5 * dz
544	ei(num_gp) = e(k,j,i+1)
545	dissi(num_gp) = diss(k,j,i+1)
546	de_dxi(num_gp) = de_dx(k,j,i+1)
547	de_dyi(num_gp) = de_dy(k,j,i+1)
548	de_dzi(num_gp) = de_dz(k,j,i+1)
549	ENDIF
550
551	IF ( k > nzb_s_inner(j+1,i+1) .OR. nzb_s_inner(j+1,i+1) == 0 ) &
552	THEN
553	num_gp = num_gp + 1
554	gp_outside_of_building(6) = 1
555	location(num_gp,1) = (i+1) * dx
556	location(num_gp,2) = (j+1) * dy
557	location(num_gp,3) = k * dz - 0.5 * dz
558	ei(num_gp) = e(k,j+1,i+1)
559	dissi(num_gp) = diss(k,j+1,i+1)
560	de_dxi(num_gp) = de_dx(k,j+1,i+1)
561	de_dyi(num_gp) = de_dy(k,j+1,i+1)
562	de_dzi(num_gp) = de_dz(k,j+1,i+1)
563	ENDIF
564
565	IF ( k+1 > nzb_s_inner(j,i+1) .OR. nzb_s_inner(j,i+1) == 0 ) &
566	THEN
567	num_gp = num_gp + 1
568	gp_outside_of_building(7) = 1
569	location(num_gp,1) = (i+1) * dx
570	location(num_gp,2) = j * dy
571	location(num_gp,3) = (k+1) * dz - 0.5 * dz
572	ei(num_gp) = e(k+1,j,i+1)
573	dissi(num_gp) = diss(k+1,j,i+1)
574	de_dxi(num_gp) = de_dx(k+1,j,i+1)
575	de_dyi(num_gp) = de_dy(k+1,j,i+1)
576	de_dzi(num_gp) = de_dz(k+1,j,i+1)
577	ENDIF
578
579	IF ( k+1 > nzb_s_inner(j+1,i+1) .OR. nzb_s_inner(j+1,i+1) == 0)&
580	THEN
581	num_gp = num_gp + 1
582	gp_outside_of_building(8) = 1
583	location(num_gp,1) = (i+1) * dx
584	location(num_gp,2) = (j+1) * dy
585	location(num_gp,3) = (k+1) * dz - 0.5 * dz
586	ei(num_gp) = e(k+1,j+1,i+1)
587	dissi(num_gp) = diss(k+1,j+1,i+1)
588	de_dxi(num_gp) = de_dx(k+1,j+1,i+1)
589	de_dyi(num_gp) = de_dy(k+1,j+1,i+1)
590	de_dzi(num_gp) = de_dz(k+1,j+1,i+1)
591	ENDIF
592
593	!
594	!-- If all gridpoints are situated outside of a building, then the
595	!-- ordinary interpolation scheme can be used.
596	IF ( num_gp == 8 ) THEN
597
598	x = particles(n)%x - i * dx
599	y = particles(n)%y - j * dy
600	aa = x2 + y2
601	bb = ( dx - x )2 + y2
602	cc = x2 + ( dy - y )2
603	dd = ( dx - x )2 + ( dy - y )2
604	gg = aa + bb + cc + dd
605
606	e_int_l = (( gg-aa ) * e(k,j,i) + ( gg-bb ) * e(k,j,i+1) &
607	+ ( gg-cc ) * e(k,j+1,i) + ( gg-dd ) * e(k,j+1,i+1)&
608	) / ( 3.0 * gg )
609
610	IF ( k+1 == nzt+1 ) THEN
611	e_int = e_int_l
612	ELSE
613	e_int_u = ( ( gg - aa ) * e(k+1,j,i) + &
614	( gg - bb ) * e(k+1,j,i+1) + &
615	( gg - cc ) * e(k+1,j+1,i) + &
616	( gg - dd ) * e(k+1,j+1,i+1) &
617	) / ( 3.0 * gg )
618	e_int = e_int_l + ( particles(n)%z - zu(k) ) / dz * &
619	( e_int_u - e_int_l )
620	ENDIF
621
622	!
623	!-- Interpolate the TKE gradient along x (adopt incides i,j,k
624	!-- and all position variables from above (TKE))
625	de_dx_int_l = ( ( gg - aa ) * de_dx(k,j,i) + &
626	( gg - bb ) * de_dx(k,j,i+1) + &
627	( gg - cc ) * de_dx(k,j+1,i) + &
628	( gg - dd ) * de_dx(k,j+1,i+1) &
629	) / ( 3.0 * gg )
630
631	IF ( ( k+1 == nzt+1 ) .OR. ( k == nzb ) ) THEN
632	de_dx_int = de_dx_int_l
633	ELSE
634	de_dx_int_u = ( ( gg - aa ) * de_dx(k+1,j,i) + &
635	( gg - bb ) * de_dx(k+1,j,i+1) + &
636	( gg - cc ) * de_dx(k+1,j+1,i) + &
637	( gg - dd ) * de_dx(k+1,j+1,i+1) &
638	) / ( 3.0 * gg )
639	de_dx_int = de_dx_int_l + ( particles(n)%z - zu(k) ) / &
640	dz * ( de_dx_int_u - de_dx_int_l )
641	ENDIF
642
643	!
644	!-- Interpolate the TKE gradient along y
645	de_dy_int_l = ( ( gg - aa ) * de_dy(k,j,i) + &
646	( gg - bb ) * de_dy(k,j,i+1) + &
647	( gg - cc ) * de_dy(k,j+1,i) + &
648	( gg - dd ) * de_dy(k,j+1,i+1) &
649	) / ( 3.0 * gg )
650	IF ( ( k+1 == nzt+1 ) .OR. ( k == nzb ) ) THEN
651	de_dy_int = de_dy_int_l
652	ELSE
653	de_dy_int_u = ( ( gg - aa ) * de_dy(k+1,j,i) + &
654	( gg - bb ) * de_dy(k+1,j,i+1) + &
655	( gg - cc ) * de_dy(k+1,j+1,i) + &
656	( gg - dd ) * de_dy(k+1,j+1,i+1) &
657	) / ( 3.0 * gg )
658	de_dy_int = de_dy_int_l + ( particles(n)%z - zu(k) ) / &
659	dz * ( de_dy_int_u - de_dy_int_l )
660	ENDIF
661
662	!
663	!-- Interpolate the TKE gradient along z
664	IF ( particles(n)%z < 0.5 * dz ) THEN
665	de_dz_int = 0.0
666	ELSE
667	de_dz_int_l = ( ( gg - aa ) * de_dz(k,j,i) + &
668	( gg - bb ) * de_dz(k,j,i+1) + &
669	( gg - cc ) * de_dz(k,j+1,i) + &
670	( gg - dd ) * de_dz(k,j+1,i+1) &
671	) / ( 3.0 * gg )
672
673	IF ( ( k+1 == nzt+1 ) .OR. ( k == nzb ) ) THEN
674	de_dz_int = de_dz_int_l
675	ELSE
676	de_dz_int_u = ( ( gg - aa ) * de_dz(k+1,j,i) + &
677	( gg - bb ) * de_dz(k+1,j,i+1) + &
678	( gg - cc ) * de_dz(k+1,j+1,i) + &
679	( gg - dd ) * de_dz(k+1,j+1,i+1) &
680	) / ( 3.0 * gg )
681	de_dz_int = de_dz_int_l + ( particles(n)%z - zu(k) ) /&
682	dz * ( de_dz_int_u - de_dz_int_l )
683	ENDIF
684	ENDIF
685
686	!
687	!-- Interpolate the dissipation of TKE
688	diss_int_l = ( ( gg - aa ) * diss(k,j,i) + &
689	( gg - bb ) * diss(k,j,i+1) + &
690	( gg - cc ) * diss(k,j+1,i) + &
691	( gg - dd ) * diss(k,j+1,i+1) &
692	) / ( 3.0 * gg )
693
694	IF ( k+1 == nzt+1 ) THEN
695	diss_int = diss_int_l
696	ELSE
697	diss_int_u = ( ( gg - aa ) * diss(k+1,j,i) + &
698	( gg - bb ) * diss(k+1,j,i+1) + &
699	( gg - cc ) * diss(k+1,j+1,i) + &
700	( gg - dd ) * diss(k+1,j+1,i+1) &
701	) / ( 3.0 * gg )
702	diss_int = diss_int_l + ( particles(n)%z - zu(k) ) / dz *&
703	( diss_int_u - diss_int_l )
704	ENDIF
705
706	ELSE
707
708	!
709	!-- If wall between gridpoint 1 and gridpoint 5, then
710	!-- Neumann boundary condition has to be applied
711	IF ( gp_outside_of_building(1) == 1 .AND. &
712	gp_outside_of_building(5) == 0 ) THEN
713	num_gp = num_gp + 1
714	location(num_gp,1) = i * dx + 0.5 * dx
715	location(num_gp,2) = j * dy
716	location(num_gp,3) = k * dz - 0.5 * dz
717	ei(num_gp) = e(k,j,i)
718	dissi(num_gp) = diss(k,j,i)
719	de_dxi(num_gp) = 0.0
720	de_dyi(num_gp) = de_dy(k,j,i)
721	de_dzi(num_gp) = de_dz(k,j,i)
722	ENDIF
723
724	IF ( gp_outside_of_building(5) == 1 .AND. &
725	gp_outside_of_building(1) == 0 ) THEN
726	num_gp = num_gp + 1
727	location(num_gp,1) = i * dx + 0.5 * dx
728	location(num_gp,2) = j * dy
729	location(num_gp,3) = k * dz - 0.5 * dz
730	ei(num_gp) = e(k,j,i+1)
731	dissi(num_gp) = diss(k,j,i+1)
732	de_dxi(num_gp) = 0.0
733	de_dyi(num_gp) = de_dy(k,j,i+1)
734	de_dzi(num_gp) = de_dz(k,j,i+1)
735	ENDIF
736
737	!
738	!-- If wall between gridpoint 5 and gridpoint 6, then
739	!-- then Neumann boundary condition has to be applied
740	IF ( gp_outside_of_building(5) == 1 .AND. &
741	gp_outside_of_building(6) == 0 ) THEN
742	num_gp = num_gp + 1
743	location(num_gp,1) = (i+1) * dx
744	location(num_gp,2) = j * dy + 0.5 * dy
745	location(num_gp,3) = k * dz - 0.5 * dz
746	ei(num_gp) = e(k,j,i+1)
747	dissi(num_gp) = diss(k,j,i+1)
748	de_dxi(num_gp) = de_dx(k,j,i+1)
749	de_dyi(num_gp) = 0.0
750	de_dzi(num_gp) = de_dz(k,j,i+1)
751	ENDIF
752
753	IF ( gp_outside_of_building(6) == 1 .AND. &
754	gp_outside_of_building(5) == 0 ) THEN
755	num_gp = num_gp + 1
756	location(num_gp,1) = (i+1) * dx
757	location(num_gp,2) = j * dy + 0.5 * dy
758	location(num_gp,3) = k * dz - 0.5 * dz
759	ei(num_gp) = e(k,j+1,i+1)
760	dissi(num_gp) = diss(k,j+1,i+1)
761	de_dxi(num_gp) = de_dx(k,j+1,i+1)
762	de_dyi(num_gp) = 0.0
763	de_dzi(num_gp) = de_dz(k,j+1,i+1)
764	ENDIF
765
766	!
767	!-- If wall between gridpoint 2 and gridpoint 6, then
768	!-- Neumann boundary condition has to be applied
769	IF ( gp_outside_of_building(2) == 1 .AND. &
770	gp_outside_of_building(6) == 0 ) THEN
771	num_gp = num_gp + 1
772	location(num_gp,1) = i * dx + 0.5 * dx
773	location(num_gp,2) = (j+1) * dy
774	location(num_gp,3) = k * dz - 0.5 * dz
775	ei(num_gp) = e(k,j+1,i)
776	dissi(num_gp) = diss(k,j+1,i)
777	de_dxi(num_gp) = 0.0
778	de_dyi(num_gp) = de_dy(k,j+1,i)
779	de_dzi(num_gp) = de_dz(k,j+1,i)
780	ENDIF
781
782	IF ( gp_outside_of_building(6) == 1 .AND. &
783	gp_outside_of_building(2) == 0 ) THEN
784	num_gp = num_gp + 1
785	location(num_gp,1) = i * dx + 0.5 * dx
786	location(num_gp,2) = (j+1) * dy
787	location(num_gp,3) = k * dz - 0.5 * dz
788	ei(num_gp) = e(k,j+1,i+1)
789	dissi(num_gp) = diss(k,j+1,i+1)
790	de_dxi(num_gp) = 0.0
791	de_dyi(num_gp) = de_dy(k,j+1,i+1)
792	de_dzi(num_gp) = de_dz(k,j+1,i+1)
793	ENDIF
794
795	!
796	!-- If wall between gridpoint 1 and gridpoint 2, then
797	!-- Neumann boundary condition has to be applied
798	IF ( gp_outside_of_building(1) == 1 .AND. &
799	gp_outside_of_building(2) == 0 ) THEN
800	num_gp = num_gp + 1
801	location(num_gp,1) = i * dx
802	location(num_gp,2) = j * dy + 0.5 * dy
803	location(num_gp,3) = k * dz - 0.5 * dz
804	ei(num_gp) = e(k,j,i)
805	dissi(num_gp) = diss(k,j,i)
806	de_dxi(num_gp) = de_dx(k,j,i)
807	de_dyi(num_gp) = 0.0
808	de_dzi(num_gp) = de_dz(k,j,i)
809	ENDIF
810
811	IF ( gp_outside_of_building(2) == 1 .AND. &
812	gp_outside_of_building(1) == 0 ) THEN
813	num_gp = num_gp + 1
814	location(num_gp,1) = i * dx
815	location(num_gp,2) = j * dy + 0.5 * dy
816	location(num_gp,3) = k * dz - 0.5 * dz
817	ei(num_gp) = e(k,j+1,i)
818	dissi(num_gp) = diss(k,j+1,i)
819	de_dxi(num_gp) = de_dx(k,j+1,i)
820	de_dyi(num_gp) = 0.0
821	de_dzi(num_gp) = de_dz(k,j+1,i)
822	ENDIF
823
824	!
825	!-- If wall between gridpoint 3 and gridpoint 7, then
826	!-- Neumann boundary condition has to be applied
827	IF ( gp_outside_of_building(3) == 1 .AND. &
828	gp_outside_of_building(7) == 0 ) THEN
829	num_gp = num_gp + 1
830	location(num_gp,1) = i * dx + 0.5 * dx
831	location(num_gp,2) = j * dy
832	location(num_gp,3) = k * dz + 0.5 * dz
833	ei(num_gp) = e(k+1,j,i)
834	dissi(num_gp) = diss(k+1,j,i)
835	de_dxi(num_gp) = 0.0
836	de_dyi(num_gp) = de_dy(k+1,j,i)
837	de_dzi(num_gp) = de_dz(k+1,j,i)
838	ENDIF
839
840	IF ( gp_outside_of_building(7) == 1 .AND. &
841	gp_outside_of_building(3) == 0 ) THEN
842	num_gp = num_gp + 1
843	location(num_gp,1) = i * dx + 0.5 * dx
844	location(num_gp,2) = j * dy
845	location(num_gp,3) = k * dz + 0.5 * dz
846	ei(num_gp) = e(k+1,j,i+1)
847	dissi(num_gp) = diss(k+1,j,i+1)
848	de_dxi(num_gp) = 0.0
849	de_dyi(num_gp) = de_dy(k+1,j,i+1)
850	de_dzi(num_gp) = de_dz(k+1,j,i+1)
851	ENDIF
852
853	!
854	!-- If wall between gridpoint 7 and gridpoint 8, then
855	!-- Neumann boundary condition has to be applied
856	IF ( gp_outside_of_building(7) == 1 .AND. &
857	gp_outside_of_building(8) == 0 ) THEN
858	num_gp = num_gp + 1
859	location(num_gp,1) = (i+1) * dx
860	location(num_gp,2) = j * dy + 0.5 * dy
861	location(num_gp,3) = k * dz + 0.5 * dz
862	ei(num_gp) = e(k+1,j,i+1)
863	dissi(num_gp) = diss(k+1,j,i+1)
864	de_dxi(num_gp) = de_dx(k+1,j,i+1)
865	de_dyi(num_gp) = 0.0
866	de_dzi(num_gp) = de_dz(k+1,j,i+1)
867	ENDIF
868
869	IF ( gp_outside_of_building(8) == 1 .AND. &
870	gp_outside_of_building(7) == 0 ) THEN
871	num_gp = num_gp + 1
872	location(num_gp,1) = (i+1) * dx
873	location(num_gp,2) = j * dy + 0.5 * dy
874	location(num_gp,3) = k * dz + 0.5 * dz
875	ei(num_gp) = e(k+1,j+1,i+1)
876	dissi(num_gp) = diss(k+1,j+1,i+1)
877	de_dxi(num_gp) = de_dx(k+1,j+1,i+1)
878	de_dyi(num_gp) = 0.0
879	de_dzi(num_gp) = de_dz(k+1,j+1,i+1)
880	ENDIF
881
882	!
883	!-- If wall between gridpoint 4 and gridpoint 8, then
884	!-- Neumann boundary condition has to be applied
885	IF ( gp_outside_of_building(4) == 1 .AND. &
886	gp_outside_of_building(8) == 0 ) THEN
887	num_gp = num_gp + 1
888	location(num_gp,1) = i * dx + 0.5 * dx
889	location(num_gp,2) = (j+1) * dy
890	location(num_gp,3) = k * dz + 0.5 * dz
891	ei(num_gp) = e(k+1,j+1,i)
892	dissi(num_gp) = diss(k+1,j+1,i)
893	de_dxi(num_gp) = 0.0
894	de_dyi(num_gp) = de_dy(k+1,j+1,i)
895	de_dzi(num_gp) = de_dz(k+1,j+1,i)
896	ENDIF
897
898	IF ( gp_outside_of_building(8) == 1 .AND. &
899	gp_outside_of_building(4) == 0 ) THEN
900	num_gp = num_gp + 1
901	location(num_gp,1) = i * dx + 0.5 * dx
902	location(num_gp,2) = (j+1) * dy
903	location(num_gp,3) = k * dz + 0.5 * dz
904	ei(num_gp) = e(k+1,j+1,i+1)
905	dissi(num_gp) = diss(k+1,j+1,i+1)
906	de_dxi(num_gp) = 0.0
907	de_dyi(num_gp) = de_dy(k+1,j+1,i+1)
908	de_dzi(num_gp) = de_dz(k+1,j+1,i+1)
909	ENDIF
910
911	!
912	!-- If wall between gridpoint 3 and gridpoint 4, then
913	!-- Neumann boundary condition has to be applied
914	IF ( gp_outside_of_building(3) == 1 .AND. &
915	gp_outside_of_building(4) == 0 ) THEN
916	num_gp = num_gp + 1
917	location(num_gp,1) = i * dx
918	location(num_gp,2) = j * dy + 0.5 * dy
919	location(num_gp,3) = k * dz + 0.5 * dz
920	ei(num_gp) = e(k+1,j,i)
921	dissi(num_gp) = diss(k+1,j,i)
922	de_dxi(num_gp) = de_dx(k+1,j,i)
923	de_dyi(num_gp) = 0.0
924	de_dzi(num_gp) = de_dz(k+1,j,i)
925	ENDIF
926
927	IF ( gp_outside_of_building(4) == 1 .AND. &
928	gp_outside_of_building(3) == 0 ) THEN
929	num_gp = num_gp + 1
930	location(num_gp,1) = i * dx
931	location(num_gp,2) = j * dy + 0.5 * dy
932	location(num_gp,3) = k * dz + 0.5 * dz
933	ei(num_gp) = e(k+1,j+1,i)
934	dissi(num_gp) = diss(k+1,j+1,i)
935	de_dxi(num_gp) = de_dx(k+1,j+1,i)
936	de_dyi(num_gp) = 0.0
937	de_dzi(num_gp) = de_dz(k+1,j+1,i)
938	ENDIF
939
940	!
941	!-- If wall between gridpoint 1 and gridpoint 3, then
942	!-- Neumann boundary condition has to be applied
943	!-- (only one case as only building beneath is possible)
944	IF ( gp_outside_of_building(1) == 0 .AND. &
945	gp_outside_of_building(3) == 1 ) THEN
946	num_gp = num_gp + 1
947	location(num_gp,1) = i * dx
948	location(num_gp,2) = j * dy
949	location(num_gp,3) = k * dz
950	ei(num_gp) = e(k+1,j,i)
951	dissi(num_gp) = diss(k+1,j,i)
952	de_dxi(num_gp) = de_dx(k+1,j,i)
953	de_dyi(num_gp) = de_dy(k+1,j,i)
954	de_dzi(num_gp) = 0.0
955	ENDIF
956
957	!
958	!-- If wall between gridpoint 5 and gridpoint 7, then
959	!-- Neumann boundary condition has to be applied
960	!-- (only one case as only building beneath is possible)
961	IF ( gp_outside_of_building(5) == 0 .AND. &
962	gp_outside_of_building(7) == 1 ) THEN
963	num_gp = num_gp + 1
964	location(num_gp,1) = (i+1) * dx
965	location(num_gp,2) = j * dy
966	location(num_gp,3) = k * dz
967	ei(num_gp) = e(k+1,j,i+1)
968	dissi(num_gp) = diss(k+1,j,i+1)
969	de_dxi(num_gp) = de_dx(k+1,j,i+1)
970	de_dyi(num_gp) = de_dy(k+1,j,i+1)
971	de_dzi(num_gp) = 0.0
972	ENDIF
973
974	!
975	!-- If wall between gridpoint 2 and gridpoint 4, then
976	!-- Neumann boundary condition has to be applied
977	!-- (only one case as only building beneath is possible)
978	IF ( gp_outside_of_building(2) == 0 .AND. &
979	gp_outside_of_building(4) == 1 ) THEN
980	num_gp = num_gp + 1
981	location(num_gp,1) = i * dx
982	location(num_gp,2) = (j+1) * dy
983	location(num_gp,3) = k * dz
984	ei(num_gp) = e(k+1,j+1,i)
985	dissi(num_gp) = diss(k+1,j+1,i)
986	de_dxi(num_gp) = de_dx(k+1,j+1,i)
987	de_dyi(num_gp) = de_dy(k+1,j+1,i)
988	de_dzi(num_gp) = 0.0
989	ENDIF
990
991	!
992	!-- If wall between gridpoint 6 and gridpoint 8, then
993	!-- Neumann boundary condition has to be applied
994	!-- (only one case as only building beneath is possible)
995	IF ( gp_outside_of_building(6) == 0 .AND. &
996	gp_outside_of_building(8) == 1 ) THEN
997	num_gp = num_gp + 1
998	location(num_gp,1) = (i+1) * dx
999	location(num_gp,2) = (j+1) * dy
1000	location(num_gp,3) = k * dz
1001	ei(num_gp) = e(k+1,j+1,i+1)
1002	dissi(num_gp) = diss(k+1,j+1,i+1)
1003	de_dxi(num_gp) = de_dx(k+1,j+1,i+1)
1004	de_dyi(num_gp) = de_dy(k+1,j+1,i+1)
1005	de_dzi(num_gp) = 0.0
1006	ENDIF
1007
1008	!
1009	!-- Carry out the interpolation
1010	IF ( num_gp == 1 ) THEN
1011	!
1012	!-- If only one of the gridpoints is situated outside of the
1013	!-- building, it follows that the values at the particle
1014	!-- location are the same as the gridpoint values
1015	e_int = ei(num_gp)
1016	diss_int = dissi(num_gp)
1017	de_dx_int = de_dxi(num_gp)
1018	de_dy_int = de_dyi(num_gp)
1019	de_dz_int = de_dzi(num_gp)
1020	ELSE IF ( num_gp > 1 ) THEN
1021
1022	d_sum = 0.0
1023	!
1024	!-- Evaluation of the distances between the gridpoints
1025	!-- contributing to the interpolated values, and the particle
1026	!-- location
1027	DO agp = 1, num_gp
1028	d_gp_pl(agp) = ( particles(n)%x-location(agp,1) )**2 &
1029	+ ( particles(n)%y-location(agp,2) )**2 &
1030	+ ( particles(n)%z-location(agp,3) )**2
1031	d_sum = d_sum + d_gp_pl(agp)
1032	ENDDO
1033
1034	!
1035	!-- Finally the interpolation can be carried out
1036	e_int = 0.0
1037	diss_int = 0.0
1038	de_dx_int = 0.0
1039	de_dy_int = 0.0
1040	de_dz_int = 0.0
1041	DO agp = 1, num_gp
1042	e_int = e_int + ( d_sum - d_gp_pl(agp) ) * &
1043	ei(agp) / ( (num_gp-1) * d_sum )
1044	diss_int = diss_int + ( d_sum - d_gp_pl(agp) ) * &
1045	dissi(agp) / ( (num_gp-1) * d_sum )
1046	de_dx_int = de_dx_int + ( d_sum - d_gp_pl(agp) ) * &
1047	de_dxi(agp) / ( (num_gp-1) * d_sum )
1048	de_dy_int = de_dy_int + ( d_sum - d_gp_pl(agp) ) * &
1049	de_dyi(agp) / ( (num_gp-1) * d_sum )
1050	de_dz_int = de_dz_int + ( d_sum - d_gp_pl(agp) ) * &
1051	de_dzi(agp) / ( (num_gp-1) * d_sum )
1052	ENDDO
1053
1054	ENDIF
1055
1056	ENDIF
1057
1058	ENDIF
1059
1060	!
1061	!-- Vertically interpolate the horizontally averaged SGS TKE and
1062	!-- resolved-scale velocity variances and use the interpolated values
1063	!-- to calculate the coefficient fs, which is a measure of the ratio
1064	!-- of the subgrid-scale turbulent kinetic energy to the total amount
1065	!-- of turbulent kinetic energy.
1066	IF ( k == 0 ) THEN
1067	e_mean_int = hom(0,1,8,0)
1068	ELSE
1069	e_mean_int = hom(k,1,8,0) + &
1070	( hom(k+1,1,8,0) - hom(k,1,8,0) ) / &
1071	( zu(k+1) - zu(k) ) * &
1072	( particles(n)%z - zu(k) )
1073	ENDIF
1074
1075	kw = particles(n)%z / dz
1076
1077	IF ( k == 0 ) THEN
1078	aa = hom(k+1,1,30,0) * ( particles(n)%z / &
1079	( 0.5 * ( zu(k+1) - zu(k) ) ) )
1080	bb = hom(k+1,1,31,0) * ( particles(n)%z / &
1081	( 0.5 * ( zu(k+1) - zu(k) ) ) )
1082	cc = hom(kw+1,1,32,0) * ( particles(n)%z / &
1083	( 1.0 * ( zw(kw+1) - zw(kw) ) ) )
1084	ELSE
1085	aa = hom(k,1,30,0) + ( hom(k+1,1,30,0) - hom(k,1,30,0) ) * &
1086	( ( particles(n)%z - zu(k) ) / ( zu(k+1) - zu(k) ) )
1087	bb = hom(k,1,31,0) + ( hom(k+1,1,31,0) - hom(k,1,31,0) ) * &
1088	( ( particles(n)%z - zu(k) ) / ( zu(k+1) - zu(k) ) )
1089	cc = hom(kw,1,32,0) + ( hom(kw+1,1,32,0)-hom(kw,1,32,0) ) *&
1090	( ( particles(n)%z - zw(kw) ) / ( zw(kw+1)-zw(kw) ) )
1091	ENDIF
1092
1093	vv_int = ( 1.0 / 3.0 ) * ( aa + bb + cc )
1094
1095	fs_int = ( 2.0 / 3.0 ) * e_mean_int / &
1096	( vv_int + ( 2.0 / 3.0 ) * e_mean_int )
1097
1098	!
1099	!-- Calculate the Lagrangian timescale according to Weil et al. (2004).
1100	lagr_timescale = ( 4.0 * e_int ) / &
1101	( 3.0 * fs_int * c_0 * diss_int )
1102
1103	!
1104	!-- Calculate the next particle timestep. dt_gap is the time needed to
1105	!-- complete the current LES timestep.
1106	dt_gap = dt_3d - particles(n)%dt_sum
1107	dt_particle = MIN( dt_3d, 0.025 * lagr_timescale, dt_gap )
1108
1109	!
1110	!-- The particle timestep should not be too small in order to prevent
1111	!-- the number of particle timesteps of getting too large
1112	IF ( dt_particle < dt_min_part .AND. dt_min_part < dt_gap ) &
1113	THEN
1114	dt_particle = dt_min_part
1115	ENDIF
1116
1117	!
1118	!-- Calculate the SGS velocity components
1119	IF ( particles(n)%age == 0.0 ) THEN
1120	!
1121	!-- For new particles the SGS components are derived from the SGS
1122	!-- TKE. Limit the Gaussian random number to the interval
1123	!-- [-5.0sigma, 5.0sigma] in order to prevent the SGS velocities
1124	!-- from becoming unrealistically large.
1125	particles(n)%rvar1 = SQRT( 2.0 * sgs_wfu_part * e_int ) * &
1126	( random_gauss( iran_part, 5.0 ) - 1.0 )
1127	particles(n)%rvar2 = SQRT( 2.0 * sgs_wfv_part * e_int ) * &
1128	( random_gauss( iran_part, 5.0 ) - 1.0 )
1129	particles(n)%rvar3 = SQRT( 2.0 * sgs_wfw_part * e_int ) * &
1130	( random_gauss( iran_part, 5.0 ) - 1.0 )
1131
1132	ELSE
1133
1134	!
1135	!-- Restriction of the size of the new timestep: compared to the
1136	!-- previous timestep the increase must not exceed 200%
1137
1138	dt_particle_m = particles(n)%age - particles(n)%age_m
1139	IF ( dt_particle > 2.0 * dt_particle_m ) THEN
1140	dt_particle = 2.0 * dt_particle_m
1141	ENDIF
1142
1143	!
1144	!-- For old particles the SGS components are correlated with the
1145	!-- values from the previous timestep. Random numbers have also to
1146	!-- be limited (see above).
1147	!-- As negative values for the subgrid TKE are not allowed, the
1148	!-- change of the subgrid TKE with time cannot be smaller than
1149	!-- -e_int/dt_particle. This value is used as a lower boundary
1150	!-- value for the change of TKE
1151
1152	de_dt_min = - e_int / dt_particle
1153
1154	de_dt = ( e_int - particles(n)%e_m ) / dt_particle_m
1155
1156	IF ( de_dt < de_dt_min ) THEN
1157	de_dt = de_dt_min
1158	ENDIF
1159
1160	particles(n)%rvar1 = particles(n)%rvar1 - fs_int * c_0 * &
1161	diss_int * particles(n)%rvar1 * dt_particle /&
1162	( 4.0 * sgs_wfu_part * e_int ) + &
1163	( 2.0 * sgs_wfu_part * de_dt * &
1164	particles(n)%rvar1 / &
1165	( 2.0 * sgs_wfu_part * e_int ) + de_dx_int &
1166	) * dt_particle / 2.0 + &
1167	SQRT( fs_int * c_0 * diss_int ) * &
1168	( random_gauss( iran_part, 5.0 ) - 1.0 ) * &
1169	SQRT( dt_particle )
1170
1171	particles(n)%rvar2 = particles(n)%rvar2 - fs_int * c_0 * &
1172	diss_int * particles(n)%rvar2 * dt_particle /&
1173	( 4.0 * sgs_wfv_part * e_int ) + &
1174	( 2.0 * sgs_wfv_part * de_dt * &
1175	particles(n)%rvar2 / &
1176	( 2.0 * sgs_wfv_part * e_int ) + de_dy_int &
1177	) * dt_particle / 2.0 + &
1178	SQRT( fs_int * c_0 * diss_int ) * &
1179	( random_gauss( iran_part, 5.0 ) - 1.0 ) * &
1180	SQRT( dt_particle )
1181
1182	particles(n)%rvar3 = particles(n)%rvar3 - fs_int * c_0 * &
1183	diss_int * particles(n)%rvar3 * dt_particle /&
1184	( 4.0 * sgs_wfw_part * e_int ) + &
1185	( 2.0 * sgs_wfw_part * de_dt * &
1186	particles(n)%rvar3 / &
1187	( 2.0 * sgs_wfw_part * e_int ) + de_dz_int &
1188	) * dt_particle / 2.0 + &
1189	SQRT( fs_int * c_0 * diss_int ) * &
1190	( random_gauss( iran_part, 5.0 ) - 1.0 ) * &
1191	SQRT( dt_particle )
1192
1193	ENDIF
1194
1195	u_int = u_int + particles(n)%rvar1
1196	v_int = v_int + particles(n)%rvar2
1197	w_int = w_int + particles(n)%rvar3
1198
1199	!
1200	!-- Store the SGS TKE of the current timelevel which is needed for
1201	!-- for calculating the SGS particle velocities at the next timestep
1202	particles(n)%e_m = e_int
1203
1204	ELSE
1205	!
1206	!-- If no SGS velocities are used, only the particle timestep has to
1207	!-- be set
1208	dt_particle = dt_3d
1209
1210	ENDIF
1211
1212	!
1213	!-- Store the old age of the particle ( needed to prevent that a
1214	!-- particle crosses several PEs during one timestep, and for the
1215	!-- evaluation of the subgrid particle velocity fluctuations )
1216	particles(n)%age_m = particles(n)%age
1217
1218
1219	!
1220	!-- Particle advection
1221	IF ( particle_groups(particles(n)%group)%density_ratio == 0.0 ) THEN
1222	!
1223	!-- Pure passive transport (without particle inertia)
1224	particles(n)%x = particles(n)%x + u_int * dt_particle
1225	particles(n)%y = particles(n)%y + v_int * dt_particle
1226	particles(n)%z = particles(n)%z + w_int * dt_particle
1227
1228	particles(n)%speed_x = u_int
1229	particles(n)%speed_y = v_int
1230	particles(n)%speed_z = w_int
1231
1232	ELSE
1233	!
1234	!-- Transport of particles with inertia
1235	particles(n)%x = particles(n)%x + particles(n)%speed_x * &
1236	dt_particle
1237	particles(n)%y = particles(n)%y + particles(n)%speed_y * &
1238	dt_particle
1239	particles(n)%z = particles(n)%z + particles(n)%speed_z * &
1240	dt_particle
1241
1242	!
1243	!-- Update of the particle velocity
1244	dens_ratio = particle_groups(particles(n)%group)%density_ratio
1245	IF ( cloud_droplets ) THEN
1246	exp_arg = 4.5 * dens_ratio * molecular_viscosity / &
1247	( particles(n)%radius )*2 &
1248	( 1.0 + 0.15 * ( 2.0 * particles(n)%radius * &
1249	SQRT( ( u_int - particles(n)%speed_x )**2 + &
1250	( v_int - particles(n)%speed_y )**2 + &
1251	( w_int - particles(n)%speed_z )**2 ) / &
1252	molecular_viscosity )**0.687 &
1253	)
1254	exp_term = EXP( -exp_arg * dt_particle )
1255	ELSEIF ( use_sgs_for_particles ) THEN
1256	exp_arg = particle_groups(particles(n)%group)%exp_arg
1257	exp_term = EXP( -exp_arg * dt_particle )
1258	ELSE
1259	exp_arg = particle_groups(particles(n)%group)%exp_arg
1260	exp_term = particle_groups(particles(n)%group)%exp_term
1261	ENDIF
1262	particles(n)%speed_x = particles(n)%speed_x * exp_term + &
1263	u_int * ( 1.0 - exp_term )
1264	particles(n)%speed_y = particles(n)%speed_y * exp_term + &
1265	v_int * ( 1.0 - exp_term )
1266	particles(n)%speed_z = particles(n)%speed_z * exp_term + &
1267	( w_int - ( 1.0 - dens_ratio ) * g / exp_arg )&
1268	* ( 1.0 - exp_term )
1269	ENDIF
1270
1271	!
1272	!-- Increment the particle age and the total time that the particle
1273	!-- has advanced within the particle timestep procedure
1274	particles(n)%age = particles(n)%age + dt_particle
1275	particles(n)%dt_sum = particles(n)%dt_sum + dt_particle
1276
1277	!
1278	!-- Check whether there is still a particle that has not yet completed
1279	!-- the total LES timestep
1280	IF ( ( dt_3d - particles(n)%dt_sum ) > 1E-8 ) THEN
1281	dt_3d_reached_l = .FALSE.
1282	ENDIF
1283
1284	ENDDO
1285
1286
1287	END SUBROUTINE lpm_advec

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