Generating p-extremal graphs

Abstract

Define f(n,p) to be the maximum number of edges in a graph on n vertices with p perfect matchings. Dudek and Schmitt proved there exist constants np and cp so that for even n >= np, f(n,p) = (n2)/4+cp. A graph is p-extremal if it has p perfect matchings and (n2)/4+cp edges. Based on Lovasz's Two Ear Theorem and structural results of Hartke, Stolee, West, and Yancey, we develop a computational method for determining cp and generating the finite set of graphs which describe the infinite family of p-extremal graphs. This method extends the knowledge of the size and structure of p-extremal graphs from p <= 10 to p <= 27. These values provide further evidence towards a conjectured upper bound and prove the sequence cp is not monotonic.