The minimum b2 problem for right-angled Artin groups

Abstract

This paper focuses on tools for constructing 4-manifolds that have fundamental group G isomorphic to a right-angled Artin group and that are also minimal, in the sense that they minimize b2(M), the dimension of H2(M;Q). For a finitely presented group G, define h(G) = \ b2(M) | M ∈ M(G) \. In this paper, we explore the ways in which we can bound h(G) from below using group cohomology and the tools necessary to build 4-manifolds that realize these lower bounds. We give solutions for right-angled Artin groups, or RAAGs, when the graph associated to G has no 4-cliques, and further we reduce this problem to the case when the graph is connected and contains only 4-cliques. We then give solutions for many infinite families of RAAGs and provide a conjecture to the solution for all RAAGs.