English

Even values of Ramanujan's tau-function

Number Theory 2021-12-15 v4

Abstract

In the spirit of Lehmer's speculation that Ramanujan's tau-function never vanishes, it is natural to ask whether any given integer α\alpha is a value of τ(n)\tau(n). For odd α\alpha, Murty, Murty, and Shorey proved that τ(n)α\tau(n)\neq \alpha for sufficiently large nn. Several recent papers have identified explicit examples of odd α\alpha which are not tau-values. Here we apply these results (most notably the recent work of Bennett, Gherga, Patel, and Siksek) to offer the first examples of even integers that are not tau-values. Namely, for primes \ell we find that τ(n)∉{±2 : 3<100}{±22 : 3<100}{±23 : 3<100 with 59}. \tau(n)\not \in \{ \pm 2\ell \ : \ 3\leq \ell< 100\} \cup \{\pm 2\ell^2 \ : \ 3\leq \ell <100\} \cup \{\pm 2\ell^3 \ : \ 3\leq \ell<100\ {\text {\rm with $\ell\neq 59$}}\}. Moreover, we obtain such results for infinitely many powers of each prime 3<1003\leq \ell<100. As an example, for =97\ell=97 we prove that τ(n)∉{297j : 1j≢0(mod44)}{297j : j1}.\tau(n)\not \in \{ 2\cdot 97^j \ : \ 1\leq j\not \equiv 0\pmod{44}\}\cup \{-2\cdot 97^j \ : \ j\geq 1\}. The method of proof applies mutatis mutandis to newforms with residually reducible mod 2 Galois representation and is easily adapted to generic newforms with integer coefficients.

Keywords

Cite

@article{arxiv.2102.00111,
  title  = {Even values of Ramanujan's tau-function},
  author = {Jennifer S. Balakrishnan and Ken Ono and Wei-Lun Tsai},
  journal= {arXiv preprint arXiv:2102.00111},
  year   = {2021}
}

Comments

La Matematica (2021)

R2 v1 2026-06-23T22:40:28.942Z