Right-angled Artin groups and the cohomology basis graph

Abstract

Let be a finite graph and let A() be the corresponding right-angled Artin group. From an arbitrary basis B of H1(A(), F) over an arbitrary field, we construct a natural graph B from the cup product, called the cohomology basis graph. We show that B always contains as a subgraph. This provides an effective way to reconstruct the defining graph from the cohomology of A(), to characterize the planarity of the defining graph from the algebra of A(), and to recover many other natural graph-theoretic invariants. We also investigate the behavior of the cohomology basis graph under passage to elementary subminors, and show that it is not well-behaved under edge contraction.