Geodesic growth of right-angled Coxeter groups based on trees

Abstract

In this paper we exhibit two infinite families of trees \T1n\n ≥ 17 and \T2n\n ≥ 17 on n vertices, such that T1n and T2n are non-isomorphic, co-spectral, and the right-angled Coxeter groups (RACGs) based on T1n and T2n have the same geodesic growth with respect to the standard generating set. We then show that the spectrum of a tree does is not sufficient to determine the geodesic growth of the RACG based on that tree, by providing two infinite families of trees \S1n\n ≥ 11 and \S2n\n ≥ 11, on n vertices, such that S1n and S2n are non-isomorphic, co-spectral, and the right-angled Coxeter groups (RACGs) based on S1n and S2n have distinct geodesic growth. Asymptotically, as n→ ∞, each set Tin, or Sin, i=1,2, has the cardinality of the set of all trees on n vertices. Our proofs are constructive and use two families of trees previously studied by B. McKay and C. Godsil.