The Core of a 2-Dimensional Set-Valued Mapping. Existence Criteria and Efficient Algorithms for Lipschitz Selections of Low Dimensional Set-Valued Mappings

Abstract

Let M=( M,) be a metric space and let X be a Banach space. Let F be a set-valued mapping from M into the family Km(X) of all compact convex subsets of X of dimension at most m. The main result in our recent joint paper with Charles Fefferman (which is referred to as a "Finiteness Principle for Lipschitz selections") provides efficient conditions for the existence of a Lipschitz selection of F, i.e., a Lipschitz mapping f: M X such that f(x)∈ F(x) for every x∈ M. We give new alternative proofs of this result in two special cases. When m=2 we prove it for X= R2, and when m=1 we prove it for all choices of X. Both of these proofs make use of a simple reiteration formula for the "core" of a set-valued mapping F, i.e., for a mapping G: M Km(X) which is Lipschitz with respect to the Hausdorff distance, and such that G(x)⊂ F(x) for all x∈ M. We also present several constructive criteria for the existence of Lipschitz selections of set-valued mappings from M into the family of all closed half-planes in R2.