On Solé and Planat criterion for the Riemann Hypothesis
preprint
OA: closed
Abstract
There are several statements equivalent to the famous Riemann hypothesis. In 2011, Solé and Planat stated that the Riemann hypothesis is true if and only if the inequality \(\zeta(2) \cdot \prod_{q\leq q_{n}} (1+\frac{1}{q}) > e^{\gamma} \cdot \log \theta(q_{n})\) holds for all prime numbers \(q_{n}> 3\), where \(\theta(x)\) is the Chebyshev function, \(\gamma \approx 0.57721\) is the Euler-Mascheroni constant, \(\zeta(x)\) is the Riemann zeta function and \(\log\) is the natural logarithm. In this note, using Solé and Planat criterion, we prove that the Riemann hypothesis is true.
My notes (saved in your browser only)
Citation neighborhood (no data yet)
We don't have any in-corpus citations linked to this paper yet. The paper's references may be in our DB but unresolved to ``paper_id`` (resolution happens at ingest when the cited DOI matches a row we already have). Run the cross-source citation reconcile pass to retry.
Source provenance
- europepmc
- last seen: 2026-05-19T01:45:01.086888+00:00