Efficient Algorithms for Lipschitz Selections of Set-Valued Mappings in R2: long version
Abstract
Let F be a set-valued mapping from an N-element metric space ( M,) into the family of all closed half-planes in R2. In this paper, we provide an efficient algorithm for a Lipschitz selection of F, i.e., a Lipschitz mapping f: M R2 such that f(x)∈ F(x) for all x∈ M. Given a constant λ>0, this algorithm produces the following two outcomes: (1) The algorithm guarantees that there is no Lipschitz selection of F with Lipschitz constant at most λ; (2) The algorithm returns a Lipschitz selection of F with Lipschitz constant at most 3λ. The total work and storage required by this selection algorithm are at most CN2 where C is an absolute constant.
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