A decomposition of graph a-numbers

Abstract

We study the a-sequence (a0(G), a1(G), ·s) of a finite simple graph G, defined recursively through a combinatorial rule and known to coincide with the sequence of rational Betti numbers of the real toric variety associated with G. In this paper, we establish a combinatorial and topological decomposition formula for the a-sequence. As an application, we show that the a-sequence is monotone under graph inclusion; that is, ai(G) ≥ ai(H) for all i ≥ 0 whenever H is a subgraph of G, and obtain the lower and upper bounds of ai-numbers. We also prove that the a-sequence is unimodal in i for a broad class of graphs G, including those with a Hamiltonian circuit or a universal vertex. These results provide a new class of topological spaces whose Betti number sequences are unimodal but not necessarily log concave, contributing to the study of real loci in algebraic geometry.