On the gaps between non-zero Fourier coefficients of eigenforms with CM
Abstract
Suppose E is an elliptic curve over Q of conductor N with complex multiplication (CM) by Q(i), and fE is the corresponding cuspidal Hecke eigenform in Snew2(0(N)). Then n-th Fourier coefficient of fE is non-zero in the short interval (X, X + cX14) for all X 0 and for some c > 0. As a consequence, we produce infinitely many cuspidal CM eigenforms f level N>1 and weight k > 2 for which if(n) n14 holds, for all n 0.
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