Images of Galois representations in mod p Hecke algebras

Abstract

Let (Tf,mf) denote the mod p local Hecke algebra attached to a normalised Hecke eigenform f, which is a commutative algebra over some finite field Fq of characteristic p and with residue field Fq. By a result of Carayol we know that, if the residual Galois representation f:GQ→GL2(Fq) is absolutely irreducible, then one can attach to this algebra a Galois representation f:GQ→GL2(Tf) that is a lift of f. We will show how one can determine the image of f under the assumptions that (i) the image of the residual representation contains SL2(Fq), (ii) that mf2=0 and (iii) that the coefficient ring is generated by the traces. As an application we will see that the methods that we use allow us to deduce the existence of certain p-elementary abelian extensions of big non-solvable number fields.