The non--part of the number of spanning trees in abelian -towers of multigraphs

Abstract

Let and p be two distinct primes. We study the p-adic valuation of the number of spanning trees in an abelian -tower of connected multigraphs. This is analogous to the classical theorem of Washington--Sinnott on the growth of the p-part of the class group in a cyclotomic Z-extension of abelian extensions of Q. Furthermore, we show that under certain hypotheses, the number of primes dividing the number of spanning trees is unbounded in such a tower.