Matchings in regular graphs: minimizing the partition function

Abstract

For a graph $G$ on $v(G)$ vertices let $m_k(G)$ denote the number of matchings of size $k$, and consider the partition function $M_{G}(\lambda)=\sum_{k=0}^nm_k(G)\lambda^k$. In this paper we show that if $G$ is a $d$--regular graph and $0 \frac{1}{v(K_{d+1})}\ln M_{K_{d+1}}(\lambda).$$ The same inequality holds true if $d=3$ and $\lambda<0.3575$. More precise conjectures are also given.