Optimal approximation order of piecewise constants on convex partitions

Abstract

We prove that the error of the best nonlinear Lp-approximation by piecewise constants on convex partitions is O(N-2d+1), where N the number of cells, for all functions in the Sobolev space W2q() on a cube ⊂Rd, d≥slant 2, as soon as 2d+1 + 1p - 1q≥slant 0. The approximation order O(N-2d+1) is achieved on a polyhedral partition obtained by anisotropic refinement of an adaptive dyadic partition. Further estimates of the approximation order from the above and below are given for various Sobolev and Sobolev-Slobodeckij spaces Wrq() embedded in Lp(), some of which also improve the standard estimate O(N- 1d) known to be optimal on isotropic partitions.