Point sets with many non-crossing matchings

Abstract

The maximum number of non-crossing straight-line perfect matchings that a set of n points in the plane can have is known to be O(10.0438n) and *(3n). The lower bound, due to Garc\'ia, Noy, and Tejel (2000) is attained by the double chain, which has (3n nO(1)) such matchings. We reprove this bound in a simplified way that uses the novel notion of down-free matching, and apply this approach on several other constructions. As a result, we improve the lower bound. First we show that double zigzag chain with n points has *(λn) such matchings with λ ≈ 3.0532. Next we analyze further generalizations of double zigzag chains - double r-chains. The best choice of parameters leads to a construction with *(n) matchings, with ≈ 3.0930. The derivation of this bound requires an analysis of a coupled dynamic-programming recursion between two infinite vectors.