Pseudo and Strongly Pseudo 2--Factor Isomorphic Regular Graphs

Abstract

A graph G is pseudo 2--factor isomorphic if the parity of the number of cycles in a 2--factor is the same for all 2--factors of G. In ADJLS we proved that pseudo 2--factor isomorphic k--regular bipartite graphs exist only for k 3. In this paper we generalize this result for regular graphs which are not necessarily bipartite. We also introduce strongly pseudo 2--factor isomorphic graphs and we prove that pseudo and strongly pseudo 2--factor isomorphic 2k--regular graphs and k--regular digraphs do not exist for k≥ 4. Moreover, we present constructions of infinite families of regular graphs in these classes. In particular we show that the family of Flower snarks is strongly pseudo 2--factor isomorphic but not 2--factor isomorphic and we conjecture that, together with the Petersen and the Blanusa2 graphs, they are the only cyclically 4--edge--connected snarks for which each 2--factor contains only cycles of odd length.