The R∞-property for right-angled Artin groups

Abstract

Given a group G and an automorphism of G, two elements x, y ∈ G are said to be -conjugate if x = g y (g)-1 for some g ∈ G. The number of equivalence classes is the Reidemeister number R() of , and if R() = ∞ for all automorphisms of G, then G is said to have the R∞-property. A finite simple graph gives rise to the right-angled Artin group A, which has as generators the vertices of and as relations vw = wv if and only if v and w are joined by an edge in . We conjecture that all non-abelian right-angled Artin groups have the R∞-property and prove this conjecture for several subclasses of right-angled Artin groups.