Black Box Galois Representations

Abstract

We develop methods to study 2-dimensional 2-adic Galois representations of the absolute Galois group of a number field K, unramified outside a known finite set of primes S of K, which are presented as Black Box representations, where we only have access to the characteristic polynomials of Frobenius automorphisms at a finite set of primes. Using suitable finite test sets of primes, depending only on K and S, we show how to determine the determinant , whether or not is residually reducible, and further information about the size of the isogeny graph of whose vertices are homothety classes of stable lattices. The methods are illustrated with examples for K=Q, and for K imaginary quadratic, being the representation attached to a Bianchi modular form. These results form part of the first author's thesis.