ABC implies that Ramanujan's tau function misses almost all primes

Abstract

Lehmer conjectured that Ramanujan's tau-function never vanishes. In a related direction, a folklore conjecture asserts that infinitely many primes arise as absolute values of Ramanujan's tau-function. Recently, Xiong showed that these prime values form a subset of the primes with density at most 2/11. Assuming the abc Conjecture, we prove the stronger upper bound \[ S(X):=\#\ X:\ \ prime and |τ(n)|= for some n 1\ = O(X13/22), \] which implies that Ramanujan's tau-function misses a density 1 subset of the primes. We give a heuristic suggesting that S(X) should nevertheless be infinite, with predicted order of magnitude \[ S(X) C X111( X)2. \] The main engine in this note was formalized and produced automatically in Lean/Mathlib by AxiomProver from a natural-language statement of the problem.

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