Flip Distance to a Non-crossing Perfect Matching

Abstract

A perfect straight-line matching M on a finite set P of points in the plane is a set of segments such that each point in P is an endpoint of exactly one segment. M is non-crossing if no two segments in M cross each other. Given a perfect straight-line matching M with at least one crossing, we can remove this crossing by a flip operation. The flip operation removes two crossing segments on a point set Q and adds two non-crossing segments to attain a new perfect matching M'. It is well known that after a finite number of flips, a non-crossing matching is attained and no further flip is possible. However, prior to this work, no non-trivial upper bound on the number of flips was known. If g(n) (resp.~k(n)) is the maximum length of the longest (resp.~shortest) sequence of flips starting from any matching of size n, we show that g(n) = O(n3) and g(n) = (n2) (resp.~k(n) = O(n2) and k(n) = (n)).