Selmer groups over pd-extensions
Abstract
Consider an abelian variety A defined over a global field K and let L/K be a pd-extension, unramified outside a finite set of places of K, with (L/K)=. Let ():=p[[]] denote the Iwasawa algebra. In this paper, we study how the characteristic ideal of the ()-module XL, the dual p-primary Selmer group, varies when L/K is replaced by a intermediate pe-extension.
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