Searched refs:embedding (Results 1 – 6 of 6) sorted by relevance
11 PetscCall(PetscFree(cmp->embedding)); in PetscFEDestroy_Composite()41 PetscCall(PetscMalloc1(cmp->numSubelements * spdim, &cmp->embedding)); in PetscFESetUp_Composite()56 for (k = 0; k < dof; k++) cmp->embedding[s * spdim + sd++] = off + k; in PetscFESetUp_Composite()77 PetscCall(PetscDualSpaceGetFunctional(fem->dualSpace, cmp->embedding[s * spdim + j], &f)); in PetscFESetUp_Composite()159 const PetscInt i = (p * pdim + cmp->embedding[s * spdim + j]) * comp; in PetscFEComputeTabulation_Composite()169 const PetscInt i = ((p * pdim + cmp->embedding[s * spdim + j]) * comp + 0) * dim + d; in PetscFEComputeTabulation_Composite()180 … const PetscInt i = ((p * pdim + cmp->embedding[s * spdim + j]) * comp + 0) * dim * dim + d; in PetscFEComputeTabulation_Composite()
239 """Return the dimension of embedding space for coordinates values.253 """Set the dimension of embedding space for coordinates values.260 The embedding dimension.1219 The embedding dimension, or `DETERMINE`.1349 """Return the dimension of embedding space for coordinates values.
764 The embedding is performed by finding the locations in ``iset`` that
363 ``-dm_plex_gmsh_spacedim <d>`` embedding space dimension.
272 PetscInt *embedding; /* Map from subelements dofs to element dofs */ member
24611 title = {The topological theory of an embedding method},35087 @TechReport{ pang.wang:embedding,35899 @Article{ radstrom:embedding,35901 title = {An embedding theorem for spaces of convex sets},