Lattice-Supported Splines on Polytopal Complexes
Abstract
We study the module of piecewise polynomial functions of smoothness on a pure -dimensional polytopal complex , via an analysis of certain subcomplexes obtained from the intersection lattice of the interior codimension one faces of . We obtain two main results: first, we show that in sufficiently high degree, the vector space of splines of degree has a basis consisting of splines supported on the for . We call such splines lattice-supported. This shows that an analog of the notion of a star-supported basis for studied by Alfeld-Schumaker in the simplicial case holds. Second, we provide a pair of conjectures, one involving lattice-supported splines, bounding how large must be so that agrees with the formula given by McDonald-Schenck. A family of examples shows that the latter conjecture is tight. The proposed bounds generalize known and conjectured bounds in the simplicial case.
Keywords
Cite
@article{arxiv.1312.3294,
title = {Lattice-Supported Splines on Polytopal Complexes},
author = {Michael DiPasquale},
journal= {arXiv preprint arXiv:1312.3294},
year = {2014}
}
Comments
22 pages, 11 figures. v2 (updated from published version): More examples added, as well as new results for the graded case. Index of summation in Definition 4.1 changed, theorems and proofs updated to reflect this