On the image of the Galois representation associated to a non-CM Hida family

Abstract

Fix a prime p > 2. Let : Gal(Q/Q) GL2(I) be the Galois representation coming from a non-CM irreducible component I of Hida's p-ordinary Hecke algebra. Assume the residual representation is absolutely irreducible. Under a minor technical condition we identify a subring I0 of I containing Zp[[T]] such that the image of is large with respect to I0. That is, Im contains ker(SL2(I0) SL2(I0/a)) for some non-zero I0-ideal a. This paper builds on recent work of Hida who showed that the image of such a Galois representation is large with respect to Zp[[T]]. Our result is an I-adic analogue of the description of the image of the Galois representation attached to a non-CM classical modular form obtained by Ribet and Momose in the 1980s.