Almost all primes satisfy the Atkin-Serre conjecture and are not extremal

Abstract

Let f(z)=Σn=1∞ af(n)e2π i n z be a non-CM holomorphic cupsidal newform of trivial nebentypus and even integral level k≥ 2. Deligne's proof of the Weil conjectures shows that |af(p)|≤ 2pk-12 for all primes p. We prove for 100% of primes p that 2pk-12 p p<|af(p)|< 2pk-12. Our proof gives an effective upper bound for the size of the exceptional set. The lower bound shows that the Atkin-Serre conjecture is satisfied for 100% of primes, and the upper bound shows that |af(p)| is as large as possible (i.e., p is extremal for f) for 0% of primes. Our proofs use the effective form of the Sato-Tate conjecture proved by the second author, which relies on the recent proof of the automorphy of the symmetric powers of f due to Newton and Thorne.