Newer
Older
// $Id: MElement.cpp,v 1.33 2007-03-16 10:03:40 remacle Exp $
//
// This program is free software; you can redistribute it and/or modify
// it under the terms of the GNU General Public License as published by
// the Free Software Foundation; either version 2 of the License, or
// (at your option) any later version.
//
// This program is distributed in the hope that it will be useful,
// but WITHOUT ANY WARRANTY; without even the implied warranty of
// MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
// GNU General Public License for more details.
//
// You should have received a copy of the GNU General Public License
// along with this program; if not, write to the Free Software
// Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA 02111-1307
// USA.
//
// Please report all bugs and problems to <gmsh@geuz.org>.
#include <math.h>
#include "MElement.h"
#include "GEntity.h"
double MElement::minEdge()
{
double m = 1.e25;
for(int i = 0; i < getNumEdges(); i++){
}
return m;
}
double MElement::maxEdge()
{
double m = 0.;
for(int i = 0; i < getNumEdges(); i++){
}
return m;
}
double MElement::rhoShapeMeasure()
{
double min = minEdge();
double max = maxEdge();
if(max)
return min / max;
else
return 0.;
}
double MTetrahedron::gammaShapeMeasure()
{
double p0[3] = { _v[0]->x(), _v[0]->y(), _v[0]->z() };
double p1[3] = { _v[1]->x(), _v[1]->y(), _v[1]->z() };
double p2[3] = { _v[2]->x(), _v[2]->y(), _v[2]->z() };
double p3[3] = { _v[3]->x(), _v[3]->y(), _v[3]->z() };
double s1 = fabs(triangle_area(p0, p1, p2));
double s2 = fabs(triangle_area(p0, p2, p3));
double s3 = fabs(triangle_area(p0, p1, p3));
double s4 = fabs(triangle_area(p1, p2, p3));
double rhoin = 3. * fabs(getVolume()) / (s1 + s2 + s3 + s4);
return 12. * rhoin / (sqrt(6.) * maxEdge());
}
double MTetrahedron::etaShapeMeasure()
{
double lij2 = 0.;
for(int i = 0; i <= 3; i++) {
for(int j = i + 1; j <= 3; j++) {
lij2 += lij * lij;
}
}
double v = fabs(getVolume());
return 12. * pow(0.9 * v * v, 1./3.) / lij2;
}
int n = getNumVertices();
for(int i = 0; i < n; i++) {
MVertex *v = getVertex(i);
p[0] += v->x();
p[1] += v->y();
p[2] += v->z();
p[0] /= (double)n;
p[1] /= (double)n;
p[2] /= (double)n;
return p;
std::string MElement::getInfoString()
{
char tmp[256];
sprintf(tmp, "Element %d", getNum());
return std::string(tmp);
}
void MElement::writeMSH(FILE *fp, double version, bool binary, int num,
int elementary, int physical)
// if necessary, change the ordering of the vertices to get positive
// volume
setVolumePositive();
if(!binary){
fprintf(fp, "%d %d", num ? num : _num, type);
if(version < 2.0)
fprintf(fp, " 3 %d %d %d", abs(physical), elementary, _partition);
int tags[4] = {num ? num : _num, abs(physical), elementary, _partition};
int verts[30];
for(int i = 0; i < n; i++)
verts[i] = getVertex(i)->getNum();
if(!binary){
for(int i = 0; i < n; i++)
fprintf(fp, " %d", verts[i]);
fprintf(fp, "\n");
}
else{
fwrite(verts, sizeof(int), n, fp);
}
void MElement::writePOS(FILE *fp, double scalingFactor, int elementary)
156
157
158
159
160
161
162
163
164
165
166
167
168
169
170
171
172
173
174
175
176
177
178
179
180
181
if(!str) return;
int n = getNumVertices();
double gamma = gammaShapeMeasure();
double eta = etaShapeMeasure();
double rho = rhoShapeMeasure();
fprintf(fp, "%s(", str);
for(int i = 0; i < n; i++){
if(i) fprintf(fp, ",");
fprintf(fp, "%g,%g,%g", getVertex(i)->x() * scalingFactor,
getVertex(i)->y() * scalingFactor, getVertex(i)->z() * scalingFactor);
}
fprintf(fp, "){");
for(int i = 0; i < n; i++)
fprintf(fp, "%d,", elementary);
for(int i = 0; i < n; i++)
fprintf(fp, "%d,", getNum());
for(int i = 0; i < n; i++)
fprintf(fp, "%g,", gamma);
for(int i = 0; i < n; i++)
fprintf(fp, "%g,", eta);
for(int i = 0; i < n; i++){
if(i == n - 1)
fprintf(fp, "%g", rho);
else
fprintf(fp, "%g,", rho);
void MElement::writeSTL(FILE *fp, bool binary, double scalingFactor)
if(getNumEdges() != 3 && getNumEdges() != 4) return;
int qid[3] = {0, 2, 3};
SVector3 n = getFace(0).normal();
if(!binary){
fprintf(fp, "facet normal %g %g %g\n", n[0], n[1], n[2]);
for(int j = 0; j < 3; j++)
fprintf(fp, " vertex %g %g %g\n",
getVertex(j)->x() * scalingFactor,
getVertex(j)->y() * scalingFactor,
getVertex(j)->z() * scalingFactor);
fprintf(fp, " endloop\n");
fprintf(fp, "endfacet\n");
if(getNumVertices() == 4){
fprintf(fp, "facet normal %g %g %g\n", n[0], n[1], n[2]);
fprintf(fp, " outer loop\n");
for(int j = 0; j < 3; j++)
fprintf(fp, " vertex %g %g %g\n",
getVertex(qid[j])->x() * scalingFactor,
getVertex(qid[j])->y() * scalingFactor,
getVertex(qid[j])->z() * scalingFactor);
fprintf(fp, " endloop\n");
fprintf(fp, "endfacet\n");
}
}
else{
char data[50];
float *coords = (float*)data;
coords[0] = n[0];
coords[1] = n[1];
coords[2] = n[2];
for(int j = 0; j < 3; j++){
coords[3 + 3 * j] = getVertex(j)->x() * scalingFactor;
coords[3 + 3 * j + 1] = getVertex(j)->y() * scalingFactor;
coords[3 + 3 * j + 2] = getVertex(j)->z() * scalingFactor;
}
fwrite(data, sizeof(char), 50, fp);
if(getNumVertices() == 4){
for(int j = 0; j < 3; j++){
coords[3 + 3 * j] = getVertex(qid[j])->x() * scalingFactor;
coords[3 + 3 * j + 1] = getVertex(qid[j])->y() * scalingFactor;
coords[3 + 3 * j + 2] = getVertex(qid[j])->z() * scalingFactor;
}
fwrite(data, sizeof(char), 50, fp);
}
}
}
void MElement::writeVRML(FILE *fp)
{
for(int i = 0; i < getNumVertices(); i++)
fprintf(fp, "%d,", getVertex(i)->getNum() - 1);
fprintf(fp, "-1,\n");
}
void MElement::writeUNV(FILE *fp, int num, int elementary, int physical)
if(!type) return;
setVolumePositive();
int n = getNumVertices();
int physical_property = elementary;
int color = 7;
fprintf(fp, "%10d%10d%10d%10d%10d%10d\n",
num ? num : _num, type, physical_property, material_property, color, n);
if(type == 21 || type == 24) // linear beam or parabolic beam
fprintf(fp, "%10d%10d%10d\n", 0, 0, 0);
for(int k = 0; k < n; k++) {
fprintf(fp, "%10d", getVertexUNV(k)->getNum());
if(k % 8 == 7)
void MElement::writeMESH(FILE *fp, int elementary)
{
for(int i = 0; i < getNumVertices(); i++)
fprintf(fp, " %d", getVertex(i)->getNum());
fprintf(fp, " %d\n", elementary);
}
if(!str) return;
setVolumePositive();
int n = getNumVertices();
const char *cont[4] = {"E", "F", "G", "H"};
int ncont = 0;
if(format == 0){ // free field format
fprintf(fp, "%s,%d,%d", str, _num, elementary);
for(int i = 0; i < n; i++){
fprintf(fp, ",%d", getVertex(i)->getNum());
if(i != n - 1 && !((i + 3) % 8)){
fprintf(fp, ",+%s%d\n+%s%d", cont[ncont], _num, cont[ncont], _num);
ncont++;
if(n == 2) // CBAR
fprintf(fp, ",0.,0.,0.");
fprintf(fp, "\n");
}
else{ // small or large field format
fprintf(fp, "%-8s%-8d%-8d", str, _num, elementary);
for(int i = 0; i < n; i++){
fprintf(fp, "%-8d", getVertex(i)->getNum());
if(i != n - 1 && !((i + 3) % 8)){
fprintf(fp, "+%s%-6d\n+%s%-6d", cont[ncont], _num, cont[ncont], _num);
ncont++;
if(n == 2) // CBAR
fprintf(fp, "%-8s%-8s%-8s", "0.", "0.", "0.");
fprintf(fp, "\n");
bool MTriangle::invertmappingXY(double *p, double *uv, double tol)
{
double mat[2][2];
getMat(mat);
b[0] = p[0] - getVertex(0)->x();
b[1] = p[1] - getVertex(0)->y();
sys2x2(mat, b, uv);
if(uv[0] >= -tol &&
uv[1] >= -tol &&
uv[0] <= 1. + tol &&
uv[1] <= 1. + tol &&
1. - uv[0] - uv[1] > -tol) {
return true;
}
return false;
}
double MTriangle::getSurfaceXY() const
{
const double x1 = _v[0]->x();
const double x2 = _v[1]->x();
const double x3 = _v[2]->x();
const double y1 = _v[0]->y();
const double y2 = _v[1]->y();
const double y3 = _v[2]->y();
const double v1 [2] = {x2 - x1, y2 - y1};
const double v2 [2] = {x3 - x1, y3 - y1};
double s = v1[0] * v2[1] - v1[1] * v2[0];
return s * 0.5;
}
void MTriangle::circumcenterXY(double *res) const
{
double d, a1, a2, a3;
const double x1 = _v[0]->x();
const double x2 = _v[1]->x();
const double x3 = _v[2]->x();
const double y1 = _v[0]->y();
const double y2 = _v[1]->y();
const double y3 = _v[2]->y();
d = 2. * (double)(y1 * (x2 - x3) + y2 * (x3 - x1) + y3 * (x1 - x2));
if(d == 0.0) {
res[0] = res[1] = -99999.;
return ;
}
a1 = x1 * x1 + y1 * y1;
a2 = x2 * x2 + y2 * y2;
a3 = x3 * x3 + y3 * y3;
res[0] = (double)((a1 * (y3 - y2) + a2 * (y1 - y3) + a3 * (y2 - y1)) / d);
res[1] = (double)((a1 * (x2 - x3) + a2 * (x3 - x1) + a3 * (x1 - x2)) / d);
}
int MTriangleN::getNumFacesRep(){ return 1; }
MFace MTriangleN::getFaceRep(int num)
{
return MFace(_v[0],_v[1],_v[2]);
}
int MTriangleN::getNumFaceVertices(){
if (_order == 3 && _vs.size() == 6) return 0;
if (_order == 3 && _vs.size() == 7) return 1;
if (_order == 4 && _vs.size() == 9) return 0;
if (_order == 4 && _vs.size() == 12) return 3;
if (_order == 5 && _vs.size() == 12) return 0;
if (_order == 5 && _vs.size() == 18) return 6;
throw;
}
393
394
395
396
397
398
399
400
401
402
403
404
405
406
407
408
409
410
411
412
413
414
415
416
417
418
419
420
421
422
423
424
425
426
427
428
429
430
431
432
433
434
435
436
437
438
439
440
441
442
443
444
445
446
447
448
449
450
451
452
453
454
455
456
457
458
459
460
461
462
463
464
465
466
467
468
469
470
471
472
473
474
475
476
477
478
479
480
481
482
483
484
485
486
487
488
489
490
491
492
493
494
495
496
497
498
499
500
501
502
503
504
505
506
507
508
509
510
511
512
513
514
515
516
517
518
519
520
521
522
523
524
525
526
527
528
529
530
531
532
533
534
535
536
537
538
539
540
541
542
543
544
545
546
547
548
549
550
int P1[3][2] = {
{0,0},
{1,0},
{0,1}
};
int P2[6][2] = {
{0,0},
{1,0},
{0,1},
{2,0},
{0,2},
{1,1}
};
int P3[9][2] = {
{0,0},
{1,0},
{0,1},
{2,0},
{0,2},
{3,0},
{0,3},
{2,1},
{1,2}
};
int P4[12][2] = {
{0,0},
{1,0},
{0,1},
{2,0},
{0,2},
{3,0},
{0,3},
{4,0},
{0,4},
{3,1},
{1,3},
{2,2}
};
int P5[15][2] = {
{0,0},
{1,0},
{0,1},
{2,0},
{0,2},
{3,0},
{0,3},
{4,0},
{0,4},
{5,0},
{0,5},
{4,1},
{3,2},
{2,3},
{1,4}
};
double coef1[3][3]={
{ 1.00000000, -1.00000000, -1.00000000},
{ 0.00000000, 1.00000000, 0.00000000},
{ 0.00000000, 0.00000000, 1.00000000}
};
double coef2[6][6]={
{ 1.00000000, -3.00000000, -3.00000000, 2.00000000, 2.00000000, 4.00000000},
{ 0.00000000, -1.00000000, 0.00000000, 2.00000000, -0.00000000, -0.00000000},
{ 0.00000000, 0.00000000, -1.00000000, -0.00000000, 2.00000000, -0.00000000},
{ 0.00000000, 4.00000000, 0.00000000, -4.00000000, -0.00000000, -4.00000000},
{ 0.00000000, 0.00000000, 0.00000000, -0.00000000, -0.00000000, 4.00000000},
{ 0.00000000, 0.00000000, 4.00000000, -0.00000000, -4.00000000, -4.00000000}
};
double coef3[9][9]={
{ 1.00000000, -5.50000000, -5.50000000, 9.00000000, 9.00000000, -4.50000000, -4.50000000, 4.50000000, 4.50000000},
{ 0.00000000, 1.00000000, 0.00000000, -4.50000000, -0.00000000, 4.50000000, -0.00000000, -0.00000000, -0.00000000},
{ 0.00000000, 0.00000000, 1.00000000, -0.00000000, -4.50000000, -0.00000000, 4.50000000, -0.00000000, -0.00000000},
{ 0.00000000, 9.00000000, 0.00000000, -22.50000000, -0.00000000, 13.50000000, 0.00000000, 4.50000000, -9.00000000},
{ 0.00000000, -4.50000000, -0.00000000, 18.00000000, 0.00000000, -13.50000000, -0.00000000, -9.00000000, 4.50000000},
{ 0.00000000, 0.00000000, 0.00000000, -0.00000000, -0.00000000, -0.00000000, 0.00000000, 9.00000000, -4.50000000},
{ 0.00000000, 0.00000000, -0.00000000, -0.00000000, 0.00000000, -0.00000000, -0.00000000, -4.50000000, 9.00000000},
{ 0.00000000, 0.00000000, -4.50000000, -0.00000000, 18.00000000, -0.00000000, -13.50000000, 4.50000000, -9.00000000},
{ 0.00000000, 0.00000000, 9.00000000, -0.00000000, -22.50000000, -0.00000000, 13.50000000, -9.00000000, 4.50000000}
};
double coef4[12][12]={
{ 1.00000000, -8.33333333, -8.33333333, 23.33333333, 23.33333333, -26.66666667, -26.66666667, 10.66666667, 10.66666667, 9.33333333, 9.33333333, -2.66666667},
{ 0.00000000, -1.00000000, 0.00000000, 7.33333333, -0.00000000, -16.00000000, 0.00000000, 10.66666667, -0.00000000, -0.00000000, -0.00000000, -0.00000000},
{ 0.00000000, 0.00000000, -1.00000000, -0.00000000, 7.33333333, -0.00000000, -16.00000000, -0.00000000, 10.66666667, -0.00000000, -0.00000000, -0.00000000},
{ 0.00000000, 16.00000000, -0.00000000, -69.33333333, 0.00000000, 96.00000000, -0.00000000, -42.66666667, 0.00000000, -5.33333333, -16.00000000, 21.33333333},
{ 0.00000000, -12.00000000, 0.00000000, 76.00000000, -0.00000000, -128.00000000, 0.00000000, 64.00000000, -0.00000000, 12.00000000, 12.00000000, -40.00000000},
{ 0.00000000, 5.33333333, -0.00000000, -37.33333333, 0.00000000, 74.66666667, -0.00000000, -42.66666667, 0.00000000, -16.00000000, -5.33333333, 21.33333333},
{ 0.00000000, 0.00000000, 0.00000000, -0.00000000, -0.00000000, -0.00000000, 0.00000000, -0.00000000, -0.00000000, 16.00000000, 5.33333333, -21.33333333},
{ 0.00000000, 0.00000000, -0.00000000, -0.00000000, 0.00000000, -0.00000000, -0.00000000, -0.00000000, 0.00000000, -12.00000000, -12.00000000, 40.00000000},
{ 0.00000000, 0.00000000, 0.00000000, -0.00000000, -0.00000000, -0.00000000, 0.00000000, -0.00000000, -0.00000000, 5.33333333, 16.00000000, -21.33333333},
{ 0.00000000, 0.00000000, 5.33333333, -0.00000000, -37.33333333, -0.00000000, 74.66666667, -0.00000000, -42.66666667, -5.33333333, -16.00000000, 21.33333333},
{ 0.00000000, 0.00000000, -12.00000000, -0.00000000, 76.00000000, -0.00000000, -128.00000000, -0.00000000, 64.00000000, 12.00000000, 12.00000000, -40.00000000},
{ 0.00000000, 0.00000000, 16.00000000, -0.00000000, -69.33333333, -0.00000000, 96.00000000, -0.00000000, -42.66666667, -16.00000000, -5.33333333, 21.33333333}
};
double coef5[15][15]={
{ 1.00000000, -11.41666667, -11.41666667, 46.87500000, 46.87500000, -88.54166667, -88.54166667, 78.12500000, 78.12500000, -26.04166667, -26.04166667, 10.41666667, 5.20833333, 5.20833333, 10.41666667},
{ 0.00000000, 1.00000000, -0.00000000, -10.41666667, 0.00000000, 36.45833333, -0.00000000, -52.08333333, 0.00000000, 26.04166667, 0.00000000, -0.00000000, 0.00000000, -0.00000000, 0.00000000},
{ 0.00000000, 0.00000000, 1.00000000, -0.00000000, -10.41666667, -0.00000000, 36.45833333, -0.00000000, -52.08333333, 0.00000000, 26.04166667, -0.00000000, 0.00000000, -0.00000000, 0.00000000},
{ 0.00000000, 25.00000000, -0.00000000, -160.41666667, 0.00000000, 369.79166667, -0.00000000, -364.58333333, 0.00000000, 130.20833333, -0.00000000, 6.25000000, -38.54166667, 60.41666667, -25.00000000},
{ 0.00000000, -25.00000000, 0.00000000, 222.91666667, -0.00000000, -614.58333333, 0.00000000, 677.08333333, -0.00000000, -260.41666667, 0.00000000, -16.66666667, 95.83333333, -122.91666667, 25.00000000},
{ 0.00000000, 16.66666667, -0.00000000, -162.50000000, 0.00000000, 510.41666667, -0.00000000, -625.00000000, 0.00000000, 260.41666667, -0.00000000, 25.00000000, -122.91666667, 95.83333333, -16.66666667},
{ 0.00000000, -6.25000000, 0.00000000, 63.54166667, -0.00000000, -213.54166667, 0.00000000, 286.45833333, -0.00000000, -130.20833333, 0.00000000, -25.00000000, 60.41666667, -38.54166667, 6.25000000},
{ 0.00000000, 0.00000000, -0.00000000, -0.00000000, 0.00000000, -0.00000000, -0.00000000, -0.00000000, 0.00000000, 0.00000000, -0.00000000, 25.00000000, -60.41666667, 38.54166667, -6.25000000},
{ 0.00000000, 0.00000000, 0.00000000, -0.00000000, -0.00000000, -0.00000000, 0.00000000, -0.00000000, -0.00000000, 0.00000000, 0.00000000, -25.00000000, 122.91666667, -95.83333333, 16.66666667},
{ 0.00000000, 0.00000000, -0.00000000, -0.00000000, 0.00000000, -0.00000000, -0.00000000, -0.00000000, 0.00000000, 0.00000000, -0.00000000, 16.66666667, -95.83333333, 122.91666667, -25.00000000},
{ 0.00000000, 0.00000000, 0.00000000, -0.00000000, -0.00000000, -0.00000000, 0.00000000, -0.00000000, -0.00000000, 0.00000000, 0.00000000, -6.25000000, 38.54166667, -60.41666667, 25.00000000},
{ 0.00000000, 0.00000000, -6.25000000, -0.00000000, 63.54166667, -0.00000000, -213.54166667, -0.00000000, 286.45833333, 0.00000000, -130.20833333, 6.25000000, -38.54166667, 60.41666667, -25.00000000},
{ 0.00000000, 0.00000000, 16.66666667, -0.00000000, -162.50000000, -0.00000000, 510.41666667, -0.00000000, -625.00000000, 0.00000000, 260.41666667, -16.66666667, 95.83333333, -122.91666667, 25.00000000},
{ 0.00000000, 0.00000000, -25.00000000, -0.00000000, 222.91666667, -0.00000000, -614.58333333, -0.00000000, 677.08333333, 0.00000000, -260.41666667, 25.00000000, -122.91666667, 95.83333333, -16.66666667},
{ 0.00000000, 0.00000000, 25.00000000, -0.00000000, -160.41666667, -0.00000000, 369.79166667, -0.00000000, -364.58333333, 0.00000000, 130.20833333, -25.00000000, 60.41666667, -38.54166667, 6.25000000}
};
void GradGeomShapeFunctionP1 (double u, double v, double grads[6][2])
{
for (int i=0;i<3;i++){
grads[i][0] = 0;
grads[i][1] = 0;
for (int j=0;j<3;j++){
if (P1[j][0] > 0)grads[i][0] += coef1[i][j] * pow(u,P1[j][0] - 1 ) * pow(v,P1[j][1] ) ;
if (P1[j][1] > 0)grads[i][1] += coef1[i][j] * pow(u,P1[j][0] ) * pow(v,P1[j][1] -1 ) ;
}
}
}
void GradGeomShapeFunctionP2 (double u, double v, double grads[6][2])
{
for (int i=0;i<6;i++){
grads[i][0] = 0;
grads[i][1] = 0;
for (int j=0;j<6;j++){
if (P2[j][0] > 0)grads[i][0] += coef2[i][j] * pow(u,P2[j][0] - 1 ) * pow(v,P2[j][1] ) ;
if (P2[j][1] > 0)grads[i][1] += coef2[i][j] * pow(u,P2[j][0] ) * pow(v,P2[j][1] -1 ) ;
}
}
}
void GradGeomShapeFunctionP3 (double u, double v, double grads[9][2])
{
for (int i=0;i<9;i++){
grads[i][0] = 0;
grads[i][1] = 0;
for (int j=0;j<9;j++){
if (P3[j][0] > 0)grads[i][0] += coef3[i][j] * pow(u,P3[j][0] - 1 ) * pow(v,P3[j][1] ) ;
if (P3[j][1] > 0)grads[i][1] += coef3[i][j] * pow(u,P3[j][0] ) * pow(v,P3[j][1] -1 ) ;
}
}
}
void GradGeomShapeFunctionP4 (double u, double v, double grads[12][2])
{
for (int i=0;i<12;i++){
grads[i][0] = 0;
grads[i][1] = 0;
for (int j=0;j<12;j++){
if (P4[j][0] > 0)grads[i][0] += coef4[i][j] * pow(u,P4[j][0] - 1 ) * pow(v,P4[j][1] ) ;
if (P4[j][1] > 0)grads[i][1] += coef4[i][j] * pow(u,P4[j][0] ) * pow(v,P4[j][1] -1 ) ;
}
}
}
void GradGeomShapeFunctionP5 (double u, double v, double grads[15][2])
{
for (int i=0;i<15;i++){
grads[i][0] = 0;
grads[i][1] = 0;
for (int j=0;j<15;j++){
if (P5[j][0] > 0)grads[i][0] += coef5[i][j] * pow(u,P5[j][0] - 1 ) * pow(v,P5[j][1] ) ;
if (P5[j][1] > 0)grads[i][1] += coef5[i][j] * pow(u,P5[j][0] ) * pow(v,P5[j][1] -1 ) ;
565
566
567
568
569
570
571
572
573
574
575
576
577
578
579
580
581
582
583
584
585
586
587
588
589
590
591
592
593
594
595
596
597
598
599
600
601
602
603
604
605
606
607
608
609
610
611
}
}
}
void MTriangle::jac ( int ord, MVertex *vs[] , double uu, double vv , double j[2][2])
{
double grads[256][2];
switch (ord)
{
case 1:
GradGeomShapeFunctionP1 ( uu , vv , grads );break;
case 2:
GradGeomShapeFunctionP2 ( uu , vv , grads );break;
case 3:
GradGeomShapeFunctionP3 ( uu , vv , grads );break;
case 4:
GradGeomShapeFunctionP4 ( uu , vv , grads );break;
case 5:
GradGeomShapeFunctionP5 ( uu , vv , grads );break;
default:
throw;
}
j[0][0] = 0 ; for (int i=0;i<3;i++)j[0][0] += grads [i][0] * _v[i] -> x() ;
j[1][0] = 0 ; for (int i=0;i<3;i++)j[1][0] += grads [i][1] * _v[i] -> x() ;
j[0][1] = 0 ; for (int i=0;i<3;i++)j[0][1] += grads [i][0] * _v[i] -> y() ;
j[1][1] = 0 ; for (int i=0;i<3;i++)j[1][1] += grads [i][1] * _v[i] -> y() ;
for (int i=3;i<3*ord;i++)j[0][0] += grads [i][0] * vs[i-3] -> x() ;
for (int i=3;i<3*ord;i++)j[1][0] += grads [i][1] * vs[i-3] -> x() ;
for (int i=3;i<3*ord;i++)j[0][1] += grads [i][0] * vs[i-3] -> y() ;
for (int i=3;i<3*ord;i++)j[1][1] += grads [i][1] * vs[i-3] -> y() ;
}
void MTriangleN::jac ( double uu, double vv , double j[2][2])
{
MTriangle::jac (_order,&(*(_vs.begin())),uu,vv,j);
}
void MTriangle6::jac ( double uu, double vv , double j[2][2])
{
MTriangle::jac (2,_vs,uu,vv,j);
}
void MTriangle::jac ( double uu, double vv , double j[2][2])
{
jac (1,0,uu,vv,j);
}