Betti numbers of split graphs

Abstract

A split graph is a graph where the vertices are a disjoint union of a complete part C=\xi,…,xn\ and a stable part S=\y1,…,ym\. We will determine the Betti numbers of the edge ring of all split graphs, in particular show that the only nonzero Betti numbers are β0,0 and βi,i+1, i>0. The Betti numbers only depend on the multiset of the number of neighbors in S the xi's have. Singh and Verma have earlier determined the Betti numbers for complete split graphs (where all yi are neighbors to all xj), and for "nearly complete" split graphs (where all yi are neighbors to all xj, except that yi is not a neighbor to xi for i=1,…,\m,n\). We also determine which split graphs that have Cohen-Macaulay edge ring.