Genus Ranges of 4-Regular Rigid Vertex Graphs

Abstract

We introduce a notion of genus range as a set of values of genera over all surfaces into which a graph is embedded cellularly, and we study the genus ranges of a special family of four-regular graphs with rigid vertices that has been used in modeling homologous DNA recombination. We show that the genus ranges are sets of consecutive integers. For any positive integer n, there are graphs with 2n vertices that have genus range m,m+1,...,m' for all 0 m<m' n, and there are graphs with 2n-1 vertices with genus range m,m+1,...,m' for all 0 m<m' <n or 0<m<m' n. Further, we show that for every n there is k<n such that h is a genus range for graphs with 2n-1 and 2n vertices for all h k. It is also shown that for every n, there is a graph with 2n vertices with genus range 0,1,...,n, but there is no such a graph with 2n-1 vertices.