On the growth of the Jacobian in Zpl-voltage covers of graphs

Abstract

We investigate the growth of the p-part of the Jacobians in voltage covers of finite connected multigraphs, where the voltage group is isomorphic to Zpl for some l 2, and we study analogues of a conjecture of Greenberg on the growth of class numbers in multiple Zp-extensions of number fields. Moreover we prove an Iwasawa main conjecture in this setting, and we study the variation of (generalised) Iwasawa invariants as one runs over the Zpl-covers of a fixed finite graph X. We discuss many examples; in particular, we construct examples with non-trivial Iwasawa invariants.

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