On abelian -towers of multigraphs III

Abstract

Let be a rational prime. Previously, abelian -towers of multigraphs were introduced which are analogous to -extensions of number fields. It was shown that for towers of bouquets, the growth of the -part of the number of spanning trees behaves in a predictable manner (analogous to a well-known theorem of Iwasawa for -extensions of number fields). In this paper, we extend this result to abelian -towers over an arbitrary connected multigraph (not necessarily simple and not necessarily regular). In order to carry this out, we employ integer-valued polynomials to construct power series with coefficients in arising from cyclotomic number fields, different than the power series appearing in the prequel. This allows us to study the special value at u=1 of the Artin--Ihara L-function, when the base multigraph is not necessarily a bouquet.