On the growth of a Coxeter group

Abstract

For a Coxeter system (W,S) let an(W,S) be the cardinality of the sphere of radius n in the Cayley graph of W with respect to the standard generating set S. It is shown that, if (W,S)(W',S') then an(W,S)≤ an(W',S') for all n∈ N0, where is a suitable partial order on Coxeter systems (cf. Thm. A). It is proven that there exists a constant τ= 1.13… such that for any non-affine, non-spherical Coxeter system (W,S) the growth rate ω(W,S)= [n]an satisfies ω(W,S)≥ τ (cf. Thm. B). The constant τ is a Perron number of degree 127 over Q. For a Coxeter group W the Coxeter generating set is not unique (up to W-conjugacy), but there is a standard procedure, the diagram twisting (cf. [BMMN02]), which allows one to pass from one Coxeter generating set S to another Coxeter generating set μ(S). A generalisation of the diagram twisting is introduced, the mutation, and it is proven that Poincar\'e series are invariant under mutations (cf. Thm. C).