Some Remarks on Small Values of $τ(n)$ (2107.03556v2)

Abstract: A natural variant of Lehmer's conjecture that the Ramanujan $\tau$-function never vanishes asks whether, for any given integer $\alpha$, there exist any $n \in \mathbb{Z}^+$ such that $\tau(n) = \alpha$. A series of papers excludes many integers as possible values of the $\tau$-function using the theory of primitive divisors of Lucas numbers, computations of integer points on curves, and congruences for $\tau(n)$. We synthesize these results and methods to prove that if $0 < |\alpha| < 100$ and $\alpha \notin T := {2^k, -24,-48, -70,-90, 92, -96}$, then $\tau(n) \neq \alpha$ for all $n > 1$. Moreover, if $\alpha \in T$ and $\tau(n) = \alpha$, then $n$ is square-free with prescribed prime factorization. Finally, we show that a strong form of the Atkin-Serre conjecture implies that $|\tau(n)| > 100$ for all $n > 2$.