Skip to content
New issue

Have a question about this project? Sign up for a free GitHub account to open an issue and contact its maintainers and the community.

By clicking “Sign up for GitHub”, you agree to our terms of service and privacy statement. We’ll occasionally send you account related emails.

Already on GitHub? Sign in to your account

Fix num_entities by using explicit math formula for counting #155

Merged
Merged
Changes from all commits
Commits
File filter

Filter by extension

Filter by extension

Conversations
Failed to load comments.
Loading
Jump to
Jump to file
Failed to load files.
Loading
Diff view
Diff view
56 changes: 30 additions & 26 deletions src/mesh.cpp
Original file line number Diff line number Diff line change
Expand Up @@ -20,33 +20,37 @@

namespace
{
// Calculate number of vertices, edges, facets, and cells for any given
// level of refinement
// The numbers of lower-dimensional cells of the CW complex of the right prism.
//
// The right prism with dimensions i x j x k is uniformly decomposed
// into ijk unit cubes, and each cube is decomposed into 6 tetrahedra;
// the decomposition procedure is described in Hatcher's "Algebraic
// Topology", on the proof of Theorem 2.10 [1], although pictures of
// the decomposition for the particular case of 3 dimensions simply
// can be viewed online by searching for "tetrahedral decomposition of
// cube".
//
// This decomposition of the right prism leads to a number of
// vertices, edges, faces, and tetrahedra (cells). The counting of
// edges and faces is complicated by the fact that many cells might
// share an edge, and two cells might share a face.
//
// The variable @param nrefine controls the dyadic subdivision of the
// prism; essentially equivalent to scaling up the prism by a factor
// of 2^nrefine in all directions. It should be a nonnegative small
// integer.
//
// 1. Available at <https://pi.math.cornell.edu/~hatcher/AT/ATpage.html>.
constexpr std::tuple<std::int64_t, std::int64_t, std::int64_t, std::int64_t>
num_entities(std::int64_t i, std::int64_t j, std::int64_t k, int nrefine)
{
std::int64_t nv = (i + 1) * (j + 1) * (k + 1);
std::int64_t ne = 0;
std::int64_t nc = (i * j * k) * 6;
std::int64_t earr[3] = {1, 3, 7};
std::int64_t farr[2] = {2, 12};
for (int r = 0; r < nrefine; ++r)
{
ne = earr[0] * (i + j + k) + earr[1] * (i * j + j * k + k * i)
+ earr[2] * i * j * k;
nv += ne;
nc *= 8;
earr[0] *= 2;
earr[1] *= 4;
earr[2] *= 8;
farr[0] *= 4;
farr[1] *= 8;
}
ne = earr[0] * (i + j + k) + earr[1] * (i * j + j * k + k * i)
+ earr[2] * i * j * k;
std::int64_t nf = farr[0] * (i * j + j * k + k * i) + farr[1] * i * j * k;

return {nv, ne, nf, nc};
num_entities(std::int64_t i, std::int64_t j, std::int64_t k, int nrefine) {
i <<= nrefine;
j <<= nrefine;
k <<= nrefine;
std::int64_t vertices = (i + 1) * (j + 1) * (k + 1);
std::int64_t edges = 7*i*j*k + 3*(i*j + i*k + j*k) + (i + j + k);
std::int64_t faces = 12*i*j*k + 2*(i*j + i*k + j*k);
std::int64_t cells = 6 * (i * j * k);
return {vertices, edges, faces, cells};
}

std::int64_t num_pdofs(std::int64_t i, std::int64_t j, std::int64_t k,
Expand Down