On Compatible Matchings
Abstract
A matching is compatible to two or more labeled point sets of size n with labels \1,…,n\ if its straight-line drawing on each of these point sets is crossing-free. We study the maximum number of edges in a matching compatible to two or more labeled point sets in general position in the plane. We show that for any two labeled convex sets of n points there exists a compatible matching with 2n edges. More generally, for any labeled point sets we construct compatible matchings of size (n1/). As a corresponding upper bound, we use probabilistic arguments to show that for any given sets of n points there exists a labeling of each set such that the largest compatible matching has O(n2/(+1)) edges. Finally, we show that ( n) copies of any set of n points are necessary and sufficient for the existence of a labeling such that any compatible matching consists only of a single edge.
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