Irreducible pseudo 2-factor isomorphic cubic bipartite graphs

Abstract

A bipartite graph is pseudo 2--factor isomorphic if all its 2--factors have the same parity of number of circuits. In ADJLS we proved that the only essentially 4--edge-connected pseudo 2--factor isomorphic cubic bipartite graph of girth 4 is K3,3, and conjectured [Conjecture 3.6]ADJLS that the only essentially 4--edge-connected cubic bipartite graphs are K3,3, the Heawood graph and the Pappus graph. There exists a characterization of symmetric configurations n3 % decide notation and how to use it in the rest of the paper due to Martinetti (1886) in which all symmetric configurations n3 can be obtained from an infinite set of so called irreducible configurations VM. The list of irreducible configurations has been completed by Boben B in terms of their irreducible Levi graphs. In this paper we characterize irreducible pseudo 2--factor isomorphic cubic bipartite graphs proving that the only pseudo 2--factor isomorphic irreducible Levi graphs are the Heawood and Pappus graphs. Moreover, the obtained characterization allows us to partially prove the above Conjecture.