On congruences between normalized eigenforms with different sign at a Steinberg prime

Abstract

Let f be a newform of weight 2 on 0(N) with Fourier q-expansion f(q)=q+Σn≥ 2 an qn, where 0(N) denotes the group of invertible matrices with integer coefficients, upper triangular mod N. Let p be a prime dividing N once, p N, a Steinberg prime. Then, it is well known that ap∈\1,-1\. We denote by Kf the field of coefficients of f. Let λ be a finite place in Kf not dividing 2p and assume that the mod λ Galois representation attached to f is irreducible. In this paper we will give necessary and sufficient conditions for the existence of another Hecke eigenform f'(q)=q+Σn≥ 2 a'n qn p-new of weight 2 on 0(N) and a finite place λ' of Kf' such that ap=-a'p and the Galois representations f,λ and f',λ' are isomorphic.