Classification of 2-extendable bipartite and cubic non-bipartite vertex-transitive graphs

Abstract

In Chan95, the authors classified the 2-extendable abelian Cayley graphs and posed the problem of characterizing all 2-extendable Cayley graphs. We first show that a connected bipartite Cayley (vertex-transitive) graph is 2-extendable if and only if it is not a cycle. It is known that a non-bipartite Cayley (vertex-transitive) graph is 2-extendable when it is of minimum degree at least five sun. We next classify all 2-extendable cubic non-bipartite Cayley graphs and obtain that: a cubic non-bipartite Cayley graph with girth g is 2-extendable if and only if g≥ 4 and it doesn't isomorphic to Z4n(1,4n-1,2n) or Z4n+2(2,4n,2n+1) with n≥ 2. Indeed, we prove a more stronger result that a cubic non-bipartite vertex-transitive graph with girth g is 2-extendable if and only if g≥ 4 and it doesn't isomorphic to Z4n(1,4n-1,2n) or Z4n+2(2,4n,2n+1) with n≥ 2 or the Petersen graph.