Modular forms of CM type mod

Abstract

We say that a normalized modular form is of CM type modulo by an imaginary quadratic field K if its Fourier coefficients ap are congruent to 0 modulo a prime L for every prime p that is inert in K. In this paper, we address the following question. Let f be a weight~2 cuspidal Hecke eigenform without complex multiplication which is of CM type modulo by an imaginary quadratic field K. Does there exist a congruence modulo between f and a genuine CM modular form of weight~2? We conjecture that such a congruence always exists. We prove this conjecture for >2 and ≠ 3 when K=Q(-3). In this setting, we discuss three situations: (i) modular forms attached to abelian surfaces with quaternionic multiplication, (ii) Q-curves completely defined over an imaginary quadratic field, and (iii) elliptic curves over Q whose 5-torsion Galois representation has image the maximal cyclic of order 16 inside GL2( F5). In all these cases, the modular forms under consideration are of CM type modulo suitable primes~, and we show that the associated residual Galois representations are monomial with respect to an imaginary quadratic field K (in some instances, more than one such field). Finally, we present numerical evidence that motivated the conjecture and provides further support for its validity beyond the cases treated in this paper.