Extreme values of L-functions of newforms

Abstract

In 2008, Soundararajan showed that there exists a normalized Hecke eigenform f of weight k and level one such that L(1/2, f ) ~≥~ ( (1 + o(1)) 2 k k ) for sufficiently large k 0 4. In this note, we show that for any ε>0 and for all sufficiently large k 0 4, the number of normalized Hecke eigenforms of weight k and level one for which L(1/2, f ) ~≥~ (1.41 k k ) is ε k1-ε. For an odd fundamental discriminant D, let Bk(|D|) be the set of all cuspidal normalized Hecke eigenforms of weight k and level dividing |D|. When the real primitive Dirichlet character D satisfies D(-1)= ik, we investigate the number of f ∈ Bk(|D|) for which L(1/2, f D) takes extremal values.

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