Uniquely restricted matchings in subcubic graphs

Abstract

A matching M in a graph G is uniquely restricted if no other matching in G covers the same set of vertices. We conjecture that every connected subcubic graph with m edges and b bridges that is distinct from K3,3 has a uniquely restricted matching of size at least m+b6, and we establish this bound with b replaced by the number of bridges that lie on a path between two vertices of degree at most 2. Moreover, we prove that every connected subcubic graph of order n and girth at least 7 has a uniquely restricted matching of size at least n-13, which partially confirms a Conjecture of F\"urst and Rautenbach (Some bounds on the uniquely restricted matching number, arXiv:1803.11032).