The index of a certain quotient of the Hecke algebra in its normalization

Abstract

Let be a congruence subgroup of SL2(Z), and let f be a normalized eigenform of weight k on . Let K denote the number field generated over Q by the Fourier coefficients of f. Let R denote the the order in K generated by the Fourier coefficients of f, which is contained in the ring of integers O of K. We relate the primes that divide the index of R in O to primes p such that f is congruent to a conjugate of f modulo a prime ideal of residue characteristic p. The index mentioned above is the same as the index of the quotient of the Hecke algebra by the annihilator ideal of f in its normalization.