Bottleneck Non-Crossing Matching in the Plane
Abstract
Let P be a set of 2n points in the plane, and let M C (resp., M NC) denote a bottleneck matching (resp., a bottleneck non-crossing matching) of P. We study the problem of computing M NC. We first prove that the problem is NP-hard and does not admit a PTAS. Then, we present an O(n1.50.5 n)-time algorithm that computes a non-crossing matching M of P, such that bn(M) 210 · bn(M NC), where bn(M) is the length of a longest edge in M. An interesting implication of our construction is that bn(M NC)/bn(M C) 210.
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