An algorithm to compute Selmer groups via resolutions by permutations modules

Abstract

Given a number field with absolute Galois group G, a finite Galois module M, and a Selmer system L, this article gives a method to compute SelL, the Selmer group of M attached to L. First we describe an algorithm to obtain a resolution of M where the morphisms are given by Hecke operators. Then we construct another group H1S(G, M) and we prove, using the properties of Hecke operators, that H1S(G, M) is a Selmer group containing SelL. Then, we discuss the time complexity of this method.

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