An analogue of Kida's formula in graph theory

Abstract

Let be a rational prime and let p:Y→ X be a Galois cover of finite graphs whose Galois group is a finite -group. Consider a Z-tower above X and its pullback along p. Assuming that all the graphs in the pullback are connected, one obtains a Z-tower above Y. Under the assumption that the Iwasawa μ-invariant of the tower above X vanishes, we prove a formula relating the Iwasawa λ-invariant of the Z-tower above X to the Iwasawa λ-invariant of the pullback. This formula is analogous to Kida's formula in classical Iwasawa theory. We present an application to the study of structural properties of certain noncommutative pro- towers of graphs, based on an analogy with classical results of Cuoco on the growth of Iwasawa invariants in Z2-extensions of number fields. Our investigations are illustrated by explicit examples.