Lattice-Supported Splines on Polytopal Complexes

Abstract: We study the module $C^r(\mathcal{P})$ of piecewise polynomial functions of smoothness $r$ on a pure $n$-dimensional polytopal complex $\mathcal{P}\subset\mathbb{R}^n$, via an analysis of certain subcomplexes $\mathcal{P}W$ obtained from the intersection lattice of the interior codimension one faces of $\mathcal{P}$. We obtain two main results: first, we show that in sufficiently high degree, the vector space $C^r_k(\mathcal{P})$ of splines of degree $\leq k$ has a basis consisting of splines supported on the $\mathcal{P}_W$ for $k\gg0$. We call such splines lattice-supported. This shows that an analog of the notion of a star-supported basis for $C^r_k(\Delta)$ studied by Alfeld-Schumaker in the simplicial case holds. Second, we provide a pair of conjectures, one involving lattice-supported splines, bounding how large $k$ must be so that $\mbox{dim}\mathbb{R} C^r_k(\mathcal{P})$ 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.