Optimal Polynomial Admissible Meshes on Some Classes of Compact Subsets of d

Abstract

We show that any compact subset of d which is the closure of a bounded star-shaped Lipschitz domain Ω, such that Ω has positive reach in the sense of Federer, admits an optimal AM (admissible mesh), that is a sequence of polynomial norming sets with optimal cardinality. This extends a recent result of A. Kroó on C 2 star-shaped domains. Moreover, we prove constructively the existence of an optimal AM for any K := Ω⊂ d where Ω is a bounded C 1,1 domain. This is done by a particular multivariate sharp version of the Bernstein Inequality via the distance function.