1 // Copyright (C) 2007-2021 CEA/DEN, EDF R&D
3 // This library is free software; you can redistribute it and/or
4 // modify it under the terms of the GNU Lesser General Public
5 // License as published by the Free Software Foundation; either
6 // version 2.1 of the License, or (at your option) any later version.
8 // This library is distributed in the hope that it will be useful,
9 // but WITHOUT ANY WARRANTY; without even the implied warranty of
10 // MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
11 // Lesser General Public License for more details.
13 // You should have received a copy of the GNU Lesser General Public
14 // License along with this library; if not, write to the Free Software
15 // Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA 02111-1307 USA
17 // See http://www.salome-platform.org/ or email : webmaster.salome@opencascade.com
19 // Author : Anthony Geay (EDF R&D)
21 #include "CellModel.hxx"
23 #include "InterpKernelException.hxx"
24 #include "DiameterCalculator.hxx"
25 #include "OrientationInverter.hxx"
32 unsigned char MEDCOUPLING2VTKTYPETRADUCER[INTERP_KERNEL::NORM_MAXTYPE+1]={1,3,21,5,9,7,22,34,23,28,35,MEDCOUPLING2VTKTYPETRADUCER_NONE,MEDCOUPLING2VTKTYPETRADUCER_NONE,MEDCOUPLING2VTKTYPETRADUCER_NONE,10,14,13,MEDCOUPLING2VTKTYPETRADUCER_NONE,12,MEDCOUPLING2VTKTYPETRADUCER_NONE,24,MEDCOUPLING2VTKTYPETRADUCER_NONE,16,27,MEDCOUPLING2VTKTYPETRADUCER_NONE,26,MEDCOUPLING2VTKTYPETRADUCER_NONE,29,32,MEDCOUPLING2VTKTYPETRADUCER_NONE,25,42,36,4};
34 namespace INTERP_KERNEL
36 const char *CellModel::CELL_TYPES_REPR[]={"NORM_POINT1", "NORM_SEG2", "NORM_SEG3", "NORM_TRI3", "NORM_QUAD4",// 0->4
37 "NORM_POLYGON", "NORM_TRI6", "NORM_TRI7" , "NORM_QUAD8", "NORM_QUAD9",//5->9
38 "NORM_SEG4", "", "", "", "NORM_TETRA4",//10->14
39 "NORM_PYRA5", "NORM_PENTA6", "", "NORM_HEXA8", "",//15->19
40 "NORM_TETRA10", "", "NORM_HEXGP12", "NORM_PYRA13", "",//20->24
41 "NORM_PENTA15", "", "NORM_HEXA27", "NORM_PENTA18", "",//25->29
42 "NORM_HEXA20", "NORM_POLYHED", "NORM_QPOLYG", "NORM_POLYL", "",//30->34
43 "", "", "", "", "",//35->39
46 std::map<NormalizedCellType,CellModel> CellModel::_map_of_unique_instance;
48 const CellModel& CellModel::GetCellModel(NormalizedCellType type)
50 if(_map_of_unique_instance.empty())
51 buildUniqueInstance();
52 const std::map<NormalizedCellType,CellModel>::iterator iter=_map_of_unique_instance.find(type);
53 if(iter==_map_of_unique_instance.end())
55 std::ostringstream stream; stream << "no cellmodel for normalized type " << type;
56 throw Exception(stream.str().c_str());
58 return (*iter).second;
61 const char *CellModel::getRepr() const
63 return CELL_TYPES_REPR[(int)_type];
67 * This method is compatible with all types including dynamic one.
69 bool CellModel::isCompatibleWith(NormalizedCellType type) const
73 const CellModel& other=GetCellModel(type);
74 if(_dim!=other.getDimension())
76 bool b1=isQuadratic();
77 bool b2=other.isQuadratic();
78 if((b1 && !b2) || (!b1 && b2))
85 void CellModel::buildUniqueInstance()
87 _map_of_unique_instance.insert(std::make_pair(NORM_POINT1,CellModel(NORM_POINT1)));
88 _map_of_unique_instance.insert(std::make_pair(NORM_SEG2,CellModel(NORM_SEG2)));
89 _map_of_unique_instance.insert(std::make_pair(NORM_SEG3,CellModel(NORM_SEG3)));
90 _map_of_unique_instance.insert(std::make_pair(NORM_SEG4,CellModel(NORM_SEG4)));
91 _map_of_unique_instance.insert(std::make_pair(NORM_TRI3,CellModel(NORM_TRI3)));
92 _map_of_unique_instance.insert(std::make_pair(NORM_QUAD4,CellModel(NORM_QUAD4)));
93 _map_of_unique_instance.insert(std::make_pair(NORM_TRI6,CellModel(NORM_TRI6)));
94 _map_of_unique_instance.insert(std::make_pair(NORM_TRI7,CellModel(NORM_TRI7)));
95 _map_of_unique_instance.insert(std::make_pair(NORM_QUAD8,CellModel(NORM_QUAD8)));
96 _map_of_unique_instance.insert(std::make_pair(NORM_QUAD9,CellModel(NORM_QUAD9)));
97 _map_of_unique_instance.insert(std::make_pair(NORM_TETRA4,CellModel(NORM_TETRA4)));
98 _map_of_unique_instance.insert(std::make_pair(NORM_HEXA8,CellModel(NORM_HEXA8)));
99 _map_of_unique_instance.insert(std::make_pair(NORM_PYRA5,CellModel(NORM_PYRA5)));
100 _map_of_unique_instance.insert(std::make_pair(NORM_PENTA6,CellModel(NORM_PENTA6)));
101 _map_of_unique_instance.insert(std::make_pair(NORM_TETRA10,CellModel(NORM_TETRA10)));
102 _map_of_unique_instance.insert(std::make_pair(NORM_HEXGP12,CellModel(NORM_HEXGP12)));
103 _map_of_unique_instance.insert(std::make_pair(NORM_PYRA13,CellModel(NORM_PYRA13)));
104 _map_of_unique_instance.insert(std::make_pair(NORM_PENTA15,CellModel(NORM_PENTA15)));
105 _map_of_unique_instance.insert(std::make_pair(NORM_PENTA18,CellModel(NORM_PENTA18)));
106 _map_of_unique_instance.insert(std::make_pair(NORM_HEXA20,CellModel(NORM_HEXA20)));
107 _map_of_unique_instance.insert(std::make_pair(NORM_HEXA27,CellModel(NORM_HEXA27)));
108 _map_of_unique_instance.insert(std::make_pair(NORM_POLYGON,CellModel(NORM_POLYGON)));
109 _map_of_unique_instance.insert(std::make_pair(NORM_POLYHED,CellModel(NORM_POLYHED)));
110 _map_of_unique_instance.insert(std::make_pair(NORM_QPOLYG,CellModel(NORM_QPOLYG)));
111 _map_of_unique_instance.insert(std::make_pair(NORM_POLYL,CellModel(NORM_POLYL)));
112 _map_of_unique_instance.insert(std::make_pair(NORM_ERROR,CellModel(NORM_ERROR)));
115 CellModel::CellModel(NormalizedCellType type):_type(type)
120 _extruded_type=NORM_ERROR;
121 _reverse_extruded_type=NORM_ERROR;
122 _linear_type=NORM_ERROR;
123 _quadratic_type=NORM_ERROR;
124 _quadratic_type2=NORM_ERROR;
125 _nb_of_little_sons=std::numeric_limits<unsigned>::max();
130 _nb_of_pts=1; _nb_of_sons=0; _dim=0; _extruded_type=NORM_SEG2; _is_simplex=true;
135 _nb_of_pts=2; _nb_of_sons=2; _dim=1; _extruded_type=NORM_QUAD4; _quadratic_type=NORM_SEG3; _quadratic_type2=NORM_SEG3; _is_simplex=true; _is_extruded=true; _reverse_extruded_type=NORM_POINT1;
136 _sons_type[0]=NORM_POINT1; _sons_type[1]=NORM_POINT1;
137 _sons_con[0][0]=0; _nb_of_sons_con[0]=1;
138 _sons_con[1][0]=1; _nb_of_sons_con[1]=1;
143 _nb_of_pts=3; _nb_of_sons=3; _dim=1; _extruded_type=NORM_QUAD8; _linear_type=NORM_SEG2; _quadratic=true; _is_simplex=false;
144 _sons_type[0]=NORM_POINT1; _sons_type[1]=NORM_POINT1; _sons_type[2]=NORM_POINT1;
145 _sons_con[0][0]=0; _nb_of_sons_con[0]=1;
146 _sons_con[1][0]=1; _nb_of_sons_con[1]=1;
147 _sons_con[2][0]=2; _nb_of_sons_con[2]=1;
152 _nb_of_pts=4; _nb_of_sons=4; _dim=1; _linear_type=NORM_SEG2; _quadratic=true; _is_simplex=false; // no _extruded_type because no cubic 2D cell
153 _sons_type[0]=NORM_POINT1; _sons_type[1]=NORM_POINT1; _sons_type[2]=NORM_POINT1; _sons_type[3]=NORM_POINT1;
154 _sons_con[0][0]=0; _nb_of_sons_con[0]=1;
155 _sons_con[1][0]=1; _nb_of_sons_con[1]=1;
156 _sons_con[2][0]=2; _nb_of_sons_con[2]=1;
157 _sons_con[3][0]=3; _nb_of_sons_con[3]=1;
162 _nb_of_pts=4; _nb_of_sons=4; _dim=3; _quadratic_type=NORM_TETRA10; _is_simplex=true;
163 _sons_type[0]=NORM_TRI3; _sons_type[1]=NORM_TRI3; _sons_type[2]=NORM_TRI3; _sons_type[3]=NORM_TRI3;
164 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=2; _nb_of_sons_con[0]=3;
165 _sons_con[1][0]=0; _sons_con[1][1]=3; _sons_con[1][2]=1; _nb_of_sons_con[1]=3;
166 _sons_con[2][0]=1; _sons_con[2][1]=3; _sons_con[2][2]=2; _nb_of_sons_con[2]=3;
167 _sons_con[3][0]=2; _sons_con[3][1]=3; _sons_con[3][2]=0; _nb_of_sons_con[3]=3;
168 _little_sons_con[0][0]=0; _little_sons_con[0][1]=1; _nb_of_little_sons=6;
169 _little_sons_con[1][0]=1; _little_sons_con[1][1]=2;
170 _little_sons_con[2][0]=2; _little_sons_con[2][1]=0;
171 _little_sons_con[3][0]=0; _little_sons_con[3][1]=3;
172 _little_sons_con[4][0]=1; _little_sons_con[4][1]=3;
173 _little_sons_con[5][0]=2; _little_sons_con[5][1]=3;
178 _nb_of_pts=8; _nb_of_sons=6; _dim=3; _quadratic_type=NORM_HEXA20; _quadratic_type2=NORM_HEXA27; _is_simplex=false; _is_extruded=true; _reverse_extruded_type=NORM_QUAD4;
179 _sons_type[0]=NORM_QUAD4; _sons_type[1]=NORM_QUAD4; _sons_type[2]=NORM_QUAD4; _sons_type[3]=NORM_QUAD4; _sons_type[4]=NORM_QUAD4; _sons_type[5]=NORM_QUAD4;
180 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=2; _sons_con[0][3]=3; _nb_of_sons_con[0]=4;
181 _sons_con[1][0]=4; _sons_con[1][1]=7; _sons_con[1][2]=6; _sons_con[1][3]=5; _nb_of_sons_con[1]=4;
182 _sons_con[2][0]=0; _sons_con[2][1]=4; _sons_con[2][2]=5; _sons_con[2][3]=1; _nb_of_sons_con[2]=4;
183 _sons_con[3][0]=1; _sons_con[3][1]=5; _sons_con[3][2]=6; _sons_con[3][3]=2; _nb_of_sons_con[3]=4;
184 _sons_con[4][0]=2; _sons_con[4][1]=6; _sons_con[4][2]=7; _sons_con[4][3]=3; _nb_of_sons_con[4]=4;
185 _sons_con[5][0]=3; _sons_con[5][1]=7; _sons_con[5][2]=4; _sons_con[5][3]=0; _nb_of_sons_con[5]=4;
186 _little_sons_con[0][0]=0; _little_sons_con[0][1]=1; _nb_of_little_sons=12;
187 _little_sons_con[1][0]=1; _little_sons_con[1][1]=2;
188 _little_sons_con[2][0]=2; _little_sons_con[2][1]=3;
189 _little_sons_con[3][0]=3; _little_sons_con[3][1]=0;
190 _little_sons_con[4][0]=4; _little_sons_con[4][1]=5;
191 _little_sons_con[5][0]=5; _little_sons_con[5][1]=6;
192 _little_sons_con[6][0]=6; _little_sons_con[6][1]=7;
193 _little_sons_con[7][0]=7; _little_sons_con[7][1]=4;
194 _little_sons_con[8][0]=0; _little_sons_con[8][1]=4;
195 _little_sons_con[9][0]=1; _little_sons_con[9][1]=5;
196 _little_sons_con[10][0]=2; _little_sons_con[10][1]=6;
197 _little_sons_con[11][0]=3; _little_sons_con[11][1]=7;
202 _nb_of_pts=4; _nb_of_sons=4; _dim=2; _quadratic_type=NORM_QUAD8; _quadratic_type2=NORM_QUAD9; _is_simplex=false; _is_extruded=true;
203 _sons_type[0]=NORM_SEG2; _sons_type[1]=NORM_SEG2; _sons_type[2]=NORM_SEG2; _sons_type[3]=NORM_SEG2;
204 _sons_con[0][0]=0; _sons_con[0][1]=1; _nb_of_sons_con[0]=2;
205 _sons_con[1][0]=1; _sons_con[1][1]=2; _nb_of_sons_con[1]=2;
206 _sons_con[2][0]=2; _sons_con[2][1]=3; _nb_of_sons_con[2]=2;
207 _sons_con[3][0]=3; _sons_con[3][1]=0; _nb_of_sons_con[3]=2; _extruded_type=NORM_HEXA8;
212 _nb_of_pts=3; _nb_of_sons=3; _dim=2; _quadratic_type=NORM_TRI6; _quadratic_type2=NORM_TRI7; _is_simplex=true;
213 _sons_type[0]=NORM_SEG2; _sons_type[1]=NORM_SEG2; _sons_type[2]=NORM_SEG2;
214 _sons_con[0][0]=0; _sons_con[0][1]=1; _nb_of_sons_con[0]=2;
215 _sons_con[1][0]=1; _sons_con[1][1]=2; _nb_of_sons_con[1]=2;
216 _sons_con[2][0]=2; _sons_con[2][1]=0; _nb_of_sons_con[2]=2; _extruded_type=NORM_PENTA6;
221 _nb_of_pts=6; _nb_of_sons=3; _dim=2; _linear_type=NORM_TRI3; _is_simplex=false;
222 _sons_type[0]=NORM_SEG3; _sons_type[1]=NORM_SEG3; _sons_type[2]=NORM_SEG3;
223 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=3; _nb_of_sons_con[0]=3;
224 _sons_con[1][0]=1; _sons_con[1][1]=2; _sons_con[1][2]=4; _nb_of_sons_con[1]=3;
225 _sons_con[2][0]=2; _sons_con[2][1]=0; _sons_con[2][2]=5; _nb_of_sons_con[2]=3; _quadratic=true; _extruded_type=NORM_PENTA15;
230 _nb_of_pts=7; _nb_of_sons=3; _dim=2; _linear_type=NORM_TRI3; _is_simplex=false;
231 _sons_type[0]=NORM_SEG3; _sons_type[1]=NORM_SEG3; _sons_type[2]=NORM_SEG3;
232 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=3; _nb_of_sons_con[0]=3;
233 _sons_con[1][0]=1; _sons_con[1][1]=2; _sons_con[1][2]=4; _nb_of_sons_con[1]=3;
234 _sons_con[2][0]=2; _sons_con[2][1]=0; _sons_con[2][2]=5; _nb_of_sons_con[2]=3; _quadratic=true; //no extruded type because no penta20
239 _nb_of_pts=8; _nb_of_sons=4; _dim=2; _linear_type=NORM_QUAD4; _is_simplex=false;
240 _sons_type[0]=NORM_SEG3; _sons_type[1]=NORM_SEG3; _sons_type[2]=NORM_SEG3; _sons_type[3]=NORM_SEG3;
241 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=4; _nb_of_sons_con[0]=3;
242 _sons_con[1][0]=1; _sons_con[1][1]=2; _sons_con[1][2]=5; _nb_of_sons_con[1]=3;
243 _sons_con[2][0]=2; _sons_con[2][1]=3; _sons_con[2][2]=6; _nb_of_sons_con[2]=3;
244 _sons_con[3][0]=3; _sons_con[3][1]=0; _sons_con[3][2]=7; _nb_of_sons_con[3]=3; _quadratic=true; _extruded_type=NORM_HEXA20;
249 _nb_of_pts=9; _nb_of_sons=4; _dim=2; _linear_type=NORM_QUAD4; _is_simplex=false;
250 _sons_type[0]=NORM_SEG3; _sons_type[1]=NORM_SEG3; _sons_type[2]=NORM_SEG3; _sons_type[3]=NORM_SEG3;
251 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=4; _nb_of_sons_con[0]=3;
252 _sons_con[1][0]=1; _sons_con[1][1]=2; _sons_con[1][2]=5; _nb_of_sons_con[1]=3;
253 _sons_con[2][0]=2; _sons_con[2][1]=3; _sons_con[2][2]=6; _nb_of_sons_con[2]=3;
254 _sons_con[3][0]=3; _sons_con[3][1]=0; _sons_con[3][2]=7; _nb_of_sons_con[3]=3; _quadratic=true; _extruded_type=NORM_HEXA27;
259 _nb_of_pts=5; _nb_of_sons=5; _dim=3; _quadratic_type=NORM_PYRA13; _is_simplex=false;
260 _sons_type[0]=NORM_QUAD4; _sons_type[1]=NORM_TRI3; _sons_type[2]=NORM_TRI3; _sons_type[3]=NORM_TRI3; _sons_type[4]=NORM_TRI3;
261 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=2; _sons_con[0][3]=3; _nb_of_sons_con[0]=4;
262 _sons_con[1][0]=0; _sons_con[1][1]=4; _sons_con[1][2]=1; _nb_of_sons_con[1]=3;
263 _sons_con[2][0]=1; _sons_con[2][1]=4; _sons_con[2][2]=2; _nb_of_sons_con[2]=3;
264 _sons_con[3][0]=2; _sons_con[3][1]=4; _sons_con[3][2]=3; _nb_of_sons_con[3]=3;
265 _sons_con[4][0]=3; _sons_con[4][1]=4; _sons_con[4][2]=0; _nb_of_sons_con[4]=3;
266 _little_sons_con[0][0]=0; _little_sons_con[0][1]=1; _nb_of_little_sons=8;
267 _little_sons_con[1][0]=1; _little_sons_con[1][1]=2;
268 _little_sons_con[2][0]=2; _little_sons_con[2][1]=3;
269 _little_sons_con[3][0]=3; _little_sons_con[3][1]=0;
270 _little_sons_con[4][0]=0; _little_sons_con[4][1]=4;
271 _little_sons_con[5][0]=1; _little_sons_con[5][1]=4;
272 _little_sons_con[6][0]=2; _little_sons_con[6][1]=4;
273 _little_sons_con[7][0]=3; _little_sons_con[7][1]=4;
278 _nb_of_pts=6; _nb_of_sons=5; _dim=3; _quadratic_type=NORM_PENTA15; _is_simplex=false; _is_extruded=true; _reverse_extruded_type=NORM_TRI3;
279 _sons_type[0]=NORM_TRI3; _sons_type[1]=NORM_TRI3; _sons_type[2]=NORM_QUAD4; _sons_type[3]=NORM_QUAD4; _sons_type[4]=NORM_QUAD4;
280 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=2; _nb_of_sons_con[0]=3;
281 _sons_con[1][0]=3; _sons_con[1][1]=5; _sons_con[1][2]=4; _nb_of_sons_con[1]=3;
282 _sons_con[2][0]=0; _sons_con[2][1]=3; _sons_con[2][2]=4; _sons_con[2][3]=1; _nb_of_sons_con[2]=4;
283 _sons_con[3][0]=1; _sons_con[3][1]=4; _sons_con[3][2]=5; _sons_con[3][3]=2; _nb_of_sons_con[3]=4;
284 _sons_con[4][0]=2; _sons_con[4][1]=5; _sons_con[4][2]=3; _sons_con[4][3]=0; _nb_of_sons_con[4]=4;
285 _little_sons_con[0][0]=0; _little_sons_con[0][1]=1; _nb_of_little_sons=9;
286 _little_sons_con[1][0]=1; _little_sons_con[1][1]=2;
287 _little_sons_con[2][0]=2; _little_sons_con[2][1]=0;
288 _little_sons_con[3][0]=3; _little_sons_con[3][1]=4;
289 _little_sons_con[4][0]=4; _little_sons_con[4][1]=5;
290 _little_sons_con[5][0]=5; _little_sons_con[5][1]=3;
291 _little_sons_con[6][0]=0; _little_sons_con[6][1]=3;
292 _little_sons_con[7][0]=1; _little_sons_con[7][1]=4;
293 _little_sons_con[8][0]=2; _little_sons_con[8][1]=5;
298 _nb_of_pts=10; _nb_of_sons=4; _dim=3; _linear_type=NORM_TETRA4; _is_simplex=false;
299 _sons_type[0]=NORM_TRI6; _sons_type[1]=NORM_TRI6; _sons_type[2]=NORM_TRI6; _sons_type[3]=NORM_TRI6;
300 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=2; _sons_con[0][3]=4; _sons_con[0][4]=5; _sons_con[0][5]=6; _nb_of_sons_con[0]=6;
301 _sons_con[1][0]=0; _sons_con[1][1]=3; _sons_con[1][2]=1; _sons_con[1][3]=7; _sons_con[1][4]=8; _sons_con[1][5]=4; _nb_of_sons_con[1]=6;
302 _sons_con[2][0]=1; _sons_con[2][1]=3; _sons_con[2][2]=2; _sons_con[2][3]=8; _sons_con[2][4]=9; _sons_con[2][5]=5; _nb_of_sons_con[2]=6;
303 _sons_con[3][0]=2; _sons_con[3][1]=3; _sons_con[3][2]=0; _sons_con[3][3]=9; _sons_con[3][4]=7; _sons_con[3][5]=6; _nb_of_sons_con[3]=6; _quadratic=true;
304 _little_sons_con[0][0]=0; _little_sons_con[0][1]=1; _little_sons_con[0][2]=4; _nb_of_little_sons=6;
305 _little_sons_con[1][0]=1; _little_sons_con[1][1]=2; _little_sons_con[1][2]=5;
306 _little_sons_con[2][0]=2; _little_sons_con[2][1]=0; _little_sons_con[2][2]=6;
307 _little_sons_con[3][0]=0; _little_sons_con[3][1]=3; _little_sons_con[3][2]=7;
308 _little_sons_con[4][0]=1; _little_sons_con[4][1]=3; _little_sons_con[4][2]=8;
309 _little_sons_con[5][0]=2; _little_sons_con[5][1]=3; _little_sons_con[5][2]=9;
314 _nb_of_pts=12; _nb_of_sons=8; _dim=3; _is_simplex=false; _is_extruded=true;
315 _sons_type[0]=NORM_POLYGON; _sons_type[1]=NORM_POLYGON; _sons_type[2]=NORM_QUAD4; _sons_type[3]=NORM_QUAD4; _sons_type[4]=NORM_QUAD4; _sons_type[5]=NORM_QUAD4;
316 _sons_type[6]=NORM_QUAD4; _sons_type[7]=NORM_QUAD4;
317 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=2; _sons_con[0][3]=3; _sons_con[0][4]=4; _sons_con[0][5]=5; _nb_of_sons_con[0]=6;
318 _sons_con[1][0]=6; _sons_con[1][1]=11; _sons_con[1][2]=10; _sons_con[1][3]=9; _sons_con[1][4]=8; _sons_con[1][5]=7; _nb_of_sons_con[1]=6;
319 _sons_con[2][0]=0; _sons_con[2][1]=6; _sons_con[2][2]=7; _sons_con[2][3]=1; _nb_of_sons_con[2]=4;
320 _sons_con[3][0]=1; _sons_con[3][1]=7; _sons_con[3][2]=8; _sons_con[3][3]=2; _nb_of_sons_con[3]=4;
321 _sons_con[4][0]=2; _sons_con[4][1]=8; _sons_con[4][2]=9; _sons_con[4][3]=3; _nb_of_sons_con[4]=4;
322 _sons_con[5][0]=3; _sons_con[5][1]=9; _sons_con[5][2]=10; _sons_con[5][3]=4; _nb_of_sons_con[5]=4;
323 _sons_con[6][0]=4; _sons_con[6][1]=10; _sons_con[6][2]=11; _sons_con[6][3]=5; _nb_of_sons_con[6]=4;
324 _sons_con[7][0]=5; _sons_con[7][1]=11; _sons_con[7][2]=6; _sons_con[7][3]=0; _nb_of_sons_con[7]=4;
329 _nb_of_pts=13; _nb_of_sons=5; _dim=3; _linear_type=NORM_PYRA5; _is_simplex=false;
330 _sons_type[0]=NORM_QUAD8; _sons_type[1]=NORM_TRI6; _sons_type[2]=NORM_TRI6; _sons_type[3]=NORM_TRI6; _sons_type[4]=NORM_TRI6;
331 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=2; _sons_con[0][3]=3; _sons_con[0][4]=5; _sons_con[0][5]=6; _sons_con[0][6]=7; _sons_con[0][7]=8; _nb_of_sons_con[0]=8;
332 _sons_con[1][0]=0; _sons_con[1][1]=4; _sons_con[1][2]=1; _sons_con[1][3]=9; _sons_con[1][4]=10; _sons_con[1][5]=5; _nb_of_sons_con[1]=6;
333 _sons_con[2][0]=1; _sons_con[2][1]=4; _sons_con[2][2]=2; _sons_con[2][3]=10; _sons_con[2][4]=11; _sons_con[2][5]=6; _nb_of_sons_con[2]=6;
334 _sons_con[3][0]=2; _sons_con[3][1]=4; _sons_con[3][2]=3; _sons_con[3][3]=11; _sons_con[3][4]=12; _sons_con[3][5]=7; _nb_of_sons_con[3]=6;
335 _sons_con[4][0]=3; _sons_con[4][1]=4; _sons_con[4][2]=0; _sons_con[4][3]=12; _sons_con[4][4]=9; _sons_con[4][5]=8; _nb_of_sons_con[4]=6; _quadratic=true;
336 _little_sons_con[0][0]=0; _little_sons_con[0][1]=1; _little_sons_con[0][2]=5; _nb_of_little_sons=8;
337 _little_sons_con[1][0]=1; _little_sons_con[1][1]=2; _little_sons_con[1][2]=6;
338 _little_sons_con[2][0]=2; _little_sons_con[2][1]=3; _little_sons_con[2][2]=7;
339 _little_sons_con[3][0]=3; _little_sons_con[3][1]=0; _little_sons_con[3][2]=8;
340 _little_sons_con[4][0]=0; _little_sons_con[4][1]=4; _little_sons_con[4][2]=9;
341 _little_sons_con[5][0]=1; _little_sons_con[5][1]=4; _little_sons_con[5][2]=10;
342 _little_sons_con[6][0]=2; _little_sons_con[6][1]=4; _little_sons_con[6][2]=11;
343 _little_sons_con[7][0]=3; _little_sons_con[7][1]=4; _little_sons_con[7][2]=12;
348 _nb_of_pts=15; _nb_of_sons=5; _dim=3; _linear_type=NORM_PENTA6; _is_simplex=false;
349 _sons_type[0]=NORM_TRI6; _sons_type[1]=NORM_TRI6; _sons_type[2]=NORM_QUAD8; _sons_type[3]=NORM_QUAD8; _sons_type[4]=NORM_QUAD8;
350 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=2; _sons_con[0][3]=6; _sons_con[0][4]=7; _sons_con[0][5]=8; _nb_of_sons_con[0]=6;
351 _sons_con[1][0]=3; _sons_con[1][1]=5; _sons_con[1][2]=4; _sons_con[1][3]=11; _sons_con[1][4]=10; _sons_con[1][5]=9; _nb_of_sons_con[1]=6;
352 _sons_con[2][0]=0; _sons_con[2][1]=3; _sons_con[2][2]=4; _sons_con[2][3]=1; _sons_con[2][4]=12; _sons_con[2][5]=9; _sons_con[2][6]=13; _sons_con[2][7]=6; _nb_of_sons_con[2]=8;
353 _sons_con[3][0]=1; _sons_con[3][1]=4; _sons_con[3][2]=5; _sons_con[3][3]=2; _sons_con[3][4]=13; _sons_con[3][5]=10; _sons_con[3][6]=14; _sons_con[3][7]=7; _nb_of_sons_con[3]=8;
354 _sons_con[4][0]=2; _sons_con[4][1]=4; _sons_con[4][2]=5; _sons_con[4][3]=0; _sons_con[4][4]=14; _sons_con[4][5]=11; _sons_con[4][6]=12; _sons_con[4][7]=8; _nb_of_sons_con[4]=8; _quadratic=true;
355 _little_sons_con[0][0]=0; _little_sons_con[0][1]=1; _little_sons_con[0][2]=6; _nb_of_little_sons=9;
356 _little_sons_con[1][0]=1; _little_sons_con[1][1]=2; _little_sons_con[1][2]=7;
357 _little_sons_con[2][0]=2; _little_sons_con[2][1]=0; _little_sons_con[2][2]=8;
358 _little_sons_con[3][0]=3; _little_sons_con[3][1]=4; _little_sons_con[3][2]=9;
359 _little_sons_con[4][0]=4; _little_sons_con[4][1]=5; _little_sons_con[4][2]=10;
360 _little_sons_con[5][0]=5; _little_sons_con[5][1]=3; _little_sons_con[5][2]=11;
361 _little_sons_con[6][0]=0; _little_sons_con[6][1]=3; _little_sons_con[6][2]=12;
362 _little_sons_con[7][0]=1; _little_sons_con[7][1]=4; _little_sons_con[7][2]=13;
363 _little_sons_con[8][0]=2; _little_sons_con[8][1]=5; _little_sons_con[8][2]=14;
368 _nb_of_pts=18; _nb_of_sons=5; _dim=3; _linear_type=NORM_PENTA6; _is_simplex=false;
369 _sons_type[0]=NORM_TRI6; _sons_type[1]=NORM_TRI6; _sons_type[2]=NORM_QUAD9; _sons_type[3]=NORM_QUAD9; _sons_type[4]=NORM_QUAD9;
370 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=2; _sons_con[0][3]=6; _sons_con[0][4]=7; _sons_con[0][5]=8; _nb_of_sons_con[0]=6;
371 _sons_con[1][0]=3; _sons_con[1][1]=5; _sons_con[1][2]=4; _sons_con[1][3]=11; _sons_con[1][4]=10; _sons_con[1][5]=9; _nb_of_sons_con[1]=6;
372 _sons_con[2][0]=0; _sons_con[2][1]=3; _sons_con[2][2]=4; _sons_con[2][3]=1; _sons_con[2][4]=12; _sons_con[2][5]=9; _sons_con[2][6]=13; _sons_con[2][7]=6; _sons_con[2][8]=15; _nb_of_sons_con[2]=9;
373 _sons_con[3][0]=1; _sons_con[3][1]=4; _sons_con[3][2]=5; _sons_con[3][3]=2; _sons_con[3][4]=13; _sons_con[3][5]=10; _sons_con[3][6]=14; _sons_con[3][7]=7; _sons_con[3][8]=16; _nb_of_sons_con[3]=9;
374 _sons_con[4][0]=2; _sons_con[4][1]=4; _sons_con[4][2]=5; _sons_con[4][3]=0; _sons_con[4][4]=14; _sons_con[4][5]=11; _sons_con[4][6]=12; _sons_con[4][7]=8; _sons_con[4][8]=17; _nb_of_sons_con[4]=9; _quadratic=true;
375 _little_sons_con[0][0]=0; _little_sons_con[0][1]=1; _little_sons_con[0][2]=6; _nb_of_little_sons=9;
376 _little_sons_con[1][0]=1; _little_sons_con[1][1]=2; _little_sons_con[1][2]=7;
377 _little_sons_con[2][0]=2; _little_sons_con[2][1]=0; _little_sons_con[2][2]=8;
378 _little_sons_con[3][0]=3; _little_sons_con[3][1]=4; _little_sons_con[3][2]=9;
379 _little_sons_con[4][0]=4; _little_sons_con[4][1]=5; _little_sons_con[4][2]=10;
380 _little_sons_con[5][0]=5; _little_sons_con[5][1]=3; _little_sons_con[5][2]=11;
381 _little_sons_con[6][0]=0; _little_sons_con[6][1]=3; _little_sons_con[6][2]=12;
382 _little_sons_con[7][0]=1; _little_sons_con[7][1]=4; _little_sons_con[7][2]=13;
383 _little_sons_con[8][0]=2; _little_sons_con[8][1]=5; _little_sons_con[8][2]=14;
388 _nb_of_pts=20; _nb_of_sons=6; _dim=3; _linear_type=NORM_HEXA8; _is_simplex=false;
389 _sons_type[0]=NORM_QUAD8; _sons_type[1]=NORM_QUAD8; _sons_type[2]=NORM_QUAD8; _sons_type[3]=NORM_QUAD8; _sons_type[4]=NORM_QUAD8; _sons_type[5]=NORM_QUAD8;
390 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=2; _sons_con[0][3]=3; _sons_con[0][4]=8; _sons_con[0][5]=9; _sons_con[0][6]=10; _sons_con[0][7]=11; _nb_of_sons_con[0]=8;
391 _sons_con[1][0]=4; _sons_con[1][1]=7; _sons_con[1][2]=6; _sons_con[1][3]=5; _sons_con[1][4]=15; _sons_con[1][5]=14; _sons_con[1][6]=13; _sons_con[1][7]=12; _nb_of_sons_con[1]=8;
392 _sons_con[2][0]=0; _sons_con[2][1]=4; _sons_con[2][2]=5; _sons_con[2][3]=1; _sons_con[2][4]=16; _sons_con[2][5]=12; _sons_con[2][6]=17; _sons_con[2][7]=8; _nb_of_sons_con[2]=8;
393 _sons_con[3][0]=1; _sons_con[3][1]=5; _sons_con[3][2]=6; _sons_con[3][3]=2; _sons_con[3][4]=17; _sons_con[3][5]=13; _sons_con[3][6]=18; _sons_con[3][7]=9;_nb_of_sons_con[3]=8;
394 _sons_con[4][0]=2; _sons_con[4][1]=6; _sons_con[4][2]=7; _sons_con[4][3]=3; _sons_con[4][4]=18; _sons_con[4][5]=14; _sons_con[4][6]=19; _sons_con[4][7]=10; _nb_of_sons_con[4]=8;
395 _sons_con[5][0]=3; _sons_con[5][1]=7; _sons_con[5][2]=4; _sons_con[5][3]=0; _sons_con[5][4]=19; _sons_con[5][5]=15; _sons_con[5][6]=16; _sons_con[5][7]=11; _nb_of_sons_con[5]=8; _quadratic=true;
396 _little_sons_con[0][0]=0; _little_sons_con[0][1]=1; _little_sons_con[0][2]=8; _nb_of_little_sons=12;
397 _little_sons_con[1][0]=1; _little_sons_con[1][1]=2; _little_sons_con[1][2]=9;
398 _little_sons_con[2][0]=2; _little_sons_con[2][1]=3; _little_sons_con[2][2]=10;
399 _little_sons_con[3][0]=3; _little_sons_con[3][1]=0; _little_sons_con[3][2]=11;
400 _little_sons_con[4][0]=4; _little_sons_con[4][1]=5; _little_sons_con[4][2]=12;
401 _little_sons_con[5][0]=5; _little_sons_con[5][1]=6; _little_sons_con[5][2]=13;
402 _little_sons_con[6][0]=6; _little_sons_con[6][1]=7; _little_sons_con[6][2]=14;
403 _little_sons_con[7][0]=7; _little_sons_con[7][1]=4; _little_sons_con[7][2]=15;
404 _little_sons_con[8][0]=0; _little_sons_con[8][1]=4; _little_sons_con[8][2]=16;
405 _little_sons_con[9][0]=1; _little_sons_con[9][1]=5; _little_sons_con[9][2]=17;
406 _little_sons_con[10][0]=2; _little_sons_con[10][1]=6; _little_sons_con[10][2]=18;
407 _little_sons_con[11][0]=3; _little_sons_con[11][1]=7; _little_sons_con[11][2]=19;
412 _nb_of_pts=27; _nb_of_sons=6; _dim=3; _linear_type=NORM_HEXA8; _is_simplex=false;
413 _sons_type[0]=NORM_QUAD9; _sons_type[1]=NORM_QUAD9; _sons_type[2]=NORM_QUAD9; _sons_type[3]=NORM_QUAD9; _sons_type[4]=NORM_QUAD9; _sons_type[5]=NORM_QUAD9;
414 _sons_con[0][0]=0; _sons_con[0][1]=1; _sons_con[0][2]=2; _sons_con[0][3]=3; _sons_con[0][4]=8; _sons_con[0][5]=9; _sons_con[0][6]=10; _sons_con[0][7]=11; _sons_con[0][8]=20; _nb_of_sons_con[0]=9;
415 _sons_con[1][0]=4; _sons_con[1][1]=7; _sons_con[1][2]=6; _sons_con[1][3]=5; _sons_con[1][4]=15; _sons_con[1][5]=14; _sons_con[1][6]=13; _sons_con[1][7]=12; _sons_con[1][8]=25; _nb_of_sons_con[1]=9;
416 _sons_con[2][0]=0; _sons_con[2][1]=4; _sons_con[2][2]=5; _sons_con[2][3]=1; _sons_con[2][4]=16; _sons_con[2][5]=12; _sons_con[2][6]=17; _sons_con[2][7]=8; _sons_con[2][8]=21; _nb_of_sons_con[2]=9;
417 _sons_con[3][0]=1; _sons_con[3][1]=5; _sons_con[3][2]=6; _sons_con[3][3]=2; _sons_con[3][4]=17; _sons_con[3][5]=13; _sons_con[3][6]=18; _sons_con[3][7]=9; _sons_con[3][8]=22; _nb_of_sons_con[3]=9;
418 _sons_con[4][0]=2; _sons_con[4][1]=6; _sons_con[4][2]=7; _sons_con[4][3]=3; _sons_con[4][4]=18; _sons_con[4][5]=14; _sons_con[4][6]=19; _sons_con[4][7]=10; _sons_con[4][8]=23; _nb_of_sons_con[4]=9;
419 _sons_con[5][0]=3; _sons_con[5][1]=7; _sons_con[5][2]=4; _sons_con[5][3]=0; _sons_con[5][4]=19; _sons_con[5][5]=15; _sons_con[5][6]=16; _sons_con[5][7]=11; _sons_con[5][8]=24; _nb_of_sons_con[5]=9;
425 _nb_of_pts=0; _nb_of_sons=0; _dim=2; _dyn=true; _extruded_type=NORM_POLYHED; _is_simplex=false; _quadratic_type=NORM_QPOLYG;
430 _nb_of_pts=0; _nb_of_sons=0; _dim=3; _dyn=true; _is_simplex=false;
435 _nb_of_pts=0; _nb_of_sons=0; _dim=2; _dyn=true; _is_simplex=false; _quadratic=true; _linear_type=NORM_POLYGON;
440 _nb_of_pts=0; _nb_of_sons=0; _dim=1; _dyn=true; _extruded_type=NORM_POLYGON; _is_simplex=false;
445 _nb_of_pts=std::numeric_limits<unsigned>::max(); _nb_of_sons=std::numeric_limits<unsigned>::max(); _dim=std::numeric_limits<unsigned>::max();
452 * Equivalent to getNumberOfSons except that this method deals with dynamic type.
454 unsigned CellModel::getNumberOfSons2(const mcIdType *conn, mcIdType lgth) const
457 return getNumberOfSons();
460 if(_type==NORM_POLYGON)
461 return FromIdType<unsigned>(lgth);
463 return FromIdType<unsigned>(lgth/2);
466 return FromIdType<unsigned>(lgth);//NORM_POLYL
468 return (unsigned)std::count(conn,conn+lgth,-1)+1;
471 unsigned CellModel::getNumberOfEdgesIn3D(const mcIdType *conn, mcIdType lgth) const
474 return _nb_of_little_sons;
476 return FromIdType<unsigned>(lgth-ToIdType(std::count(conn,conn+lgth,-1)/2));
480 * \sa fillMicroEdgeNodalConnectivity
482 unsigned CellModel::getNumberOfMicroEdges() const
484 unsigned mul(isQuadratic()?2:1);
487 switch(getDimension())
490 return mul*getNumberOfSons();
492 return mul*_nb_of_little_sons;
494 throw INTERP_KERNEL::Exception("CellModel::getNumberOfMacroEdges : only 2D and 3D cells support this !");
498 throw INTERP_KERNEL::Exception("CellModel::getNumberOfMacroEdges : not supported by dynamic type !");
501 NormalizedCellType CellModel::getCorrespondingPolyType() const
503 switch(getDimension())
511 throw INTERP_KERNEL::Exception("CellModel::getPolyType : no poly type for quadratic 1D !");
524 throw INTERP_KERNEL::Exception("CellModel::getPolyType : no poly type for quadratic 3D !");
527 throw INTERP_KERNEL::Exception("CellModel::getPolyType : only dimension 0, 1, 2, 3 are supported !");
532 * Equivalent to getSonType except that this method deals with dynamic type.
534 NormalizedCellType CellModel::getSonType2(unsigned sonId) const
537 return getSonType(sonId);
540 if(_type==NORM_POLYGON)
546 return NORM_ERROR;//NORM_POLYL
552 * \b WARNING this method do not manage correctly types that return true at the call of isDynamic. Use fillSonCellNodalConnectivity2 instead.
554 unsigned CellModel::fillSonCellNodalConnectivity(int sonId, const mcIdType *nodalConn, mcIdType *sonNodalConn) const
556 unsigned nbOfTurnLoop=_nb_of_sons_con[sonId];
557 const unsigned *sonConn=_sons_con[sonId];
558 for(unsigned i=0;i<nbOfTurnLoop;i++)
559 sonNodalConn[i]=nodalConn[sonConn[i]];
563 unsigned CellModel::fillSonCellNodalConnectivity2(int sonId, const mcIdType *nodalConn, mcIdType lgth, mcIdType *sonNodalConn, NormalizedCellType& typeOfSon) const
565 typeOfSon=getSonType2(sonId);
567 return fillSonCellNodalConnectivity(sonId,nodalConn,sonNodalConn);
572 if(_type==NORM_POLYGON)
574 sonNodalConn[0]=nodalConn[sonId];
575 sonNodalConn[1]=nodalConn[(sonId+1)%lgth];
580 sonNodalConn[0]=nodalConn[sonId];
581 sonNodalConn[1]=nodalConn[(sonId+1)%(lgth/2)];
582 sonNodalConn[2]=nodalConn[sonId+(lgth/2)];
588 const mcIdType *where=nodalConn;
589 for(int i=0;i<sonId;i++)
591 where=std::find(where,nodalConn+lgth,-1);
594 const mcIdType *where2=std::find(where,nodalConn+lgth,-1);
595 std::copy(where,where2,sonNodalConn);
596 return (unsigned)(where2-where);
599 throw INTERP_KERNEL::Exception("CellModel::fillSonCellNodalConnectivity2 : no sons on NORM_POLYL !");
604 * Equivalent to CellModel::fillSonCellNodalConnectivity2 except for HEXA8 where the order of sub faces is not has MED file numbering for transformation HEXA8->HEXA27
606 unsigned CellModel::fillSonCellNodalConnectivity4(int sonId, const mcIdType *nodalConn, mcIdType lgth, mcIdType *sonNodalConn, NormalizedCellType& typeOfSon) const
608 if(_type==NORM_HEXA8)
610 static const int permutation[6]={0,2,3,4,5,1};
611 return fillSonCellNodalConnectivity2(permutation[sonId],nodalConn,lgth,sonNodalConn,typeOfSon);
614 return fillSonCellNodalConnectivity2(sonId,nodalConn,lgth,sonNodalConn,typeOfSon);
617 unsigned CellModel::fillSonEdgesNodalConnectivity3D(int sonId, const mcIdType *nodalConn, mcIdType lgth, mcIdType *sonNodalConn, NormalizedCellType& typeOfSon) const
624 sonNodalConn[0]=nodalConn[_little_sons_con[sonId][0]];
625 sonNodalConn[1]=nodalConn[_little_sons_con[sonId][1]];
631 sonNodalConn[0]=nodalConn[_little_sons_con[sonId][0]];
632 sonNodalConn[1]=nodalConn[_little_sons_con[sonId][1]];
633 sonNodalConn[2]=nodalConn[_little_sons_con[sonId][2]];
638 throw INTERP_KERNEL::Exception("CellModel::fillSonEdgesNodalConnectivity3D : not implemented yet for NORM_POLYHED !");
642 * \sa getNumberOfMicroEdges
644 unsigned CellModel::fillMicroEdgeNodalConnectivity(int sonId, const mcIdType *nodalConn, mcIdType *sonNodalConn, NormalizedCellType& typeOfSon) const
648 int edgeId(sonId/2),subEdgeId(sonId%2);
650 const unsigned *sonConn(0);
651 switch(getDimension())
655 sonConn=_sons_con[edgeId];
660 sonConn=_little_sons_con[edgeId];
664 throw INTERP_KERNEL::Exception("CellModel::fillMicroEdgeNodalConnectivity : only 2D and 3D cells support this !");
666 const unsigned tmp[3]={sonConn[0],sonConn[2],sonConn[1]};
667 sonNodalConn[0]=nodalConn[tmp[subEdgeId]];
668 sonNodalConn[1]=nodalConn[tmp[subEdgeId+1]];
673 switch(getDimension())
676 return fillSonCellNodalConnectivity2(sonId,nodalConn,0,sonNodalConn,typeOfSon);
678 return fillSonEdgesNodalConnectivity3D(sonId,nodalConn,0,sonNodalConn,typeOfSon);
680 throw INTERP_KERNEL::Exception("CellModel::fillMicroEdgeNodalConnectivity : only 2D and 3D cells support this #2 !");
685 void CellModel::changeOrientationOf2D(mcIdType *nodalConn, unsigned int sz) const
691 std::vector<mcIdType> tmp(sz-1);
692 std::copy(nodalConn+1,nodalConn+sz,tmp.rbegin());
693 std::copy(tmp.begin(),tmp.end(),nodalConn+1);
697 unsigned int sz2(sz/2);
698 std::vector<mcIdType> tmp0(sz2-1),tmp1(sz2);
699 std::copy(nodalConn+1,nodalConn+sz2,tmp0.rbegin());
700 std::copy(nodalConn+sz2,nodalConn+sz,tmp1.rbegin());
701 std::copy(tmp0.begin(),tmp0.end(),nodalConn+1);
702 std::copy(tmp1.begin(),tmp1.end(),nodalConn+sz2);
706 void CellModel::changeOrientationOf1D(mcIdType *nodalConn, unsigned int sz) const
712 std::swap(nodalConn[0],nodalConn[1]);
717 std::swap(nodalConn[0],nodalConn[1]);
718 std::swap(nodalConn[2],nodalConn[3]);
721 throw Exception("CellModel::changeOrientationOf1D : unrecognized 1D cell type !");
725 std::vector<mcIdType> tmp(sz-1);
726 std::copy(nodalConn+1,nodalConn+sz,tmp.rbegin());
727 std::copy(tmp.begin(),tmp.end(),nodalConn+1);
731 //================================================================================
733 * \brief Return number of nodes in sonId-th son of a Dynamic() cell
735 //================================================================================
737 unsigned CellModel::getNumberOfNodesConstituentTheSon2(unsigned sonId, const mcIdType *nodalConn, mcIdType lgth) const
740 return getNumberOfNodesConstituentTheSon(sonId);
744 if(_type==NORM_POLYGON)
751 const mcIdType *where=nodalConn;
752 for(unsigned int i=0;i<sonId;i++)
754 where=std::find(where,nodalConn+lgth,-1);
757 const mcIdType *where2=std::find(where,nodalConn+lgth,-1);
758 return (unsigned)(where2-where);
761 throw INTERP_KERNEL::Exception("CellModel::getNumberOfNodesConstituentTheSon2 : no sons on NORM_POLYL !");
765 * This method retrieves if cell1 represented by 'conn1' and cell2 represented by 'conn2'
766 * are equivalent by a permutation or not. This method expects to work on 1D or 2D (only mesh dimension where it is possible to have a spaceDim) strictly higher than meshDim.
767 * If not an exception will be thrown.
768 * @return True if two cells have same orientation, false if not.
770 bool CellModel::getOrientationStatus(mcIdType lgth, const mcIdType *conn1, const mcIdType *conn2) const
772 if(_dim!=1 && _dim!=2)
773 throw INTERP_KERNEL::Exception("CellModel::getOrientationStatus : invalid dimension ! Must be 1 or 2 !");
776 std::vector<mcIdType> tmp(2*lgth);
777 std::vector<mcIdType>::iterator it=std::copy(conn1,conn1+lgth,tmp.begin());
778 std::copy(conn1,conn1+lgth,it);
779 it=std::search(tmp.begin(),tmp.end(),conn2,conn2+lgth);
784 std::vector<mcIdType>::reverse_iterator it2=std::search(tmp.rbegin(),tmp.rend(),conn2,conn2+lgth);
787 throw INTERP_KERNEL::Exception("CellModel::getOrientationStatus : Request of orientation status of non equal connectively cells !");
793 std::vector<mcIdType> tmp(lgth);
794 std::vector<mcIdType>::iterator it=std::copy(conn1,conn1+lgth/2,tmp.begin());
795 std::copy(conn1,conn1+lgth/2,it);
796 it=std::search(tmp.begin(),tmp.end(),conn2,conn2+lgth/2);
797 std::size_t d=std::distance(tmp.begin(),it);
800 it=std::copy(conn1+lgth/2,conn1+lgth,tmp.begin());
801 std::copy(conn1+lgth/2,conn1+lgth,it);
802 it=std::search(tmp.begin(),tmp.end(),conn2,conn2+lgth);
805 std::size_t d2=std::distance(tmp.begin(),it);
810 mcIdType p=(lgth+1)/2;
811 std::vector<mcIdType> tmp(2*p);
812 std::vector<mcIdType>::iterator it=std::copy(conn1,conn1+p,tmp.begin());
813 std::copy(conn1,conn1+p,it);
814 it=std::search(tmp.begin(),tmp.end(),conn2,conn2+p);
815 std::size_t d=std::distance(tmp.begin(),it);
819 it=std::copy(conn1+p,conn1+lgth,tmp.begin());
820 std::copy(conn1+p,conn1+lgth,it);
821 it=std::search(tmp.begin(),tmp.end(),conn2+p,conn2+lgth);
824 std::size_t d2=std::distance(tmp.begin(),it);
830 DiameterCalculator *CellModel::buildInstanceOfDiameterCalulator(int spaceDim) const
839 return new DiameterCalulatorTRI3S2;
841 return new DiameterCalulatorTRI3S3;
843 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For TRI3 only space dimension 2 and 3 implemented !");
852 return new DiameterCalulatorQUAD4S2;
854 return new DiameterCalulatorQUAD4S3;
856 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For QUAD4 only space dimension 2 and 3 implemented !");
865 return new DiameterCalulatorTRI6S2;
867 return new DiameterCalulatorTRI6S3;
869 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For TRI6 only space dimension 2 and 3 implemented !");
878 return new DiameterCalulatorTRI7S2;
880 return new DiameterCalulatorTRI7S3;
882 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For TRI7 only space dimension 2 and 3 implemented !");
891 return new DiameterCalulatorQUAD8S2;
893 return new DiameterCalulatorQUAD8S3;
895 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For QUAD8 only space dimension 2 and 3 implemented !");
904 return new DiameterCalulatorQUAD9S2;
906 return new DiameterCalulatorQUAD9S3;
908 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For QUAD9 only space dimension 2 and 3 implemented !");
915 return new DiameterCalulatorTETRA4;
917 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For TETRA4 space dimension 3 expected !");
922 return new DiameterCalulatorTETRA10;
924 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For TETRA10 space dimension 3 expected !");
929 return new DiameterCalulatorHEXA8;
931 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For HEXA8 space dimension 3 expected !");
936 return new DiameterCalulatorHEXA20;
938 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For HEXA20 space dimension 3 expected !");
943 return new DiameterCalulatorHEXA27;
945 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For HEXA27 space dimension 3 expected !");
950 return new DiameterCalulatorPENTA6;
952 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For PENTA6 space dimension 3 expected !");
957 return new DiameterCalulatorPENTA15;
959 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For PENTA15 space dimension 3 expected !");
964 return new DiameterCalulatorPYRA5;
966 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For PYRA5 space dimension 3 expected !");
971 return new DiameterCalulatorPYRA13;
973 throw Exception("CellModel::buildInstanceOfDiameterCalulator : For PYRA13 space dimension 3 expected !");
976 throw Exception("CellModel::buildInstanceOfDiameterCalulator : implemented only for TRI3, QUAD4, TETRA4, HEXA8, PENTA6, PYRA5 !");
980 OrientationInverter *CellModel::buildOrientationInverter() const
985 return new OrientationInverterSEG2;
987 return new OrientationInverterSEG3;
990 return new OrientationInverter2DLinear(getNumberOfNodes());
993 return new OrientationInverter2DQuadratic(getNumberOfNodes());
995 return new OrientationInverterPolygon;
997 return new OrientationInverterQPolygon;
999 return new OrientationInverterTetra4;
1001 return new OrientationInverterPyra5;
1003 return new OrientationInverterTetra10;
1005 return new OrientationInverterPyra13;
1008 return new OrientationInverter3DExtrusionLinear(getNumberOfNodes());
1011 return new OrientationInverter3DExtrusionQuadratic(getNumberOfNodes());
1014 std::ostringstream oss; oss << "CellModel::buildOrientationInverter : not managed geometric type " << getRepr() << " yet !";
1015 throw INTERP_KERNEL::Exception(oss.str());