Growth series of CAT(0) cubical complexes

Abstract

Let X be a CAT(0) cubical complex. The growth series of X at x is Gx(t)=Σy ∈ Vert(X) td(x,y), where d(x,y) denotes 1-distance between x and y. If X is cocompact, then Gx is a rational function of t. In the case when X is the Davis complex of a right-angled Coxeter group it is a well-known that Gx(t)=1/fL(-t/(1+t)), where fL denotes the f-polynomial of the link L of a vertex of X. We obtain a similar formula for general cocompact X. We also obtain a simple relation between the growth series of individual orbits and the f-polynomials of various links. In particular, we get a simple proof of reciprocity of these series (Gx(t)= Gx(t-1)) for an Eulerian manifold X.