On the Sigma invariants of even Artin groups of FC-type

Abstract

In this paper we study Sigma invariants of even Artin groups of FC-type, extending some known results for right-angled Artin groups. In particular, we define a condition that we call the strong homological n-link condition for a graph and prove that it gives a sufficient condition for a character :A Z to satisfy []∈n(A,Z). This implies that the kernel A= is of type FPn. The homotopy counterpart is also proved. Partial results on the converse are discussed. We also provide a general formula for the free part of Hn(A;F) as an F[t 1]-module with the natural action induced by . This gives a characterization of when Hn(A;F) is a finite dimensional vector space over F. In the last version we correct a problem in the proof of Lemma 4.3 and also a remark at the end of subsection 3.3.