Galois representations modulo p that do not lift modulo p2

Abstract

For every finite group H and every finite H-module A, we determine the subgroup of negligible classes in H2(H,A), in the sense of Serre, over fields with enough roots of unity. As a consequence, we show that for every odd prime p, every integer n≥ 3, and every field F containing a primitive p-th root of unity, there exists a continuous n-dimensional mod p representation of the absolute Galois group of F(x1,…,xp) which does not lift modulo p2. This answers a question of Khare and Serre, and disproves a conjecture of Florence.

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