Ordinary primes in Hilbert modular varieties
Abstract
A well-known conjecture, often attributed to Serre, asserts that any motive over any number field has infinitely many ordinary reductions (in the sense that the Newton polygon coincides with the Hodge polygon). In the case of Hilbert modular cuspforms of parallel weight , we show how to produce more ordinary primes by using the Sato-Tate equidistribution and combining it with the Galois theory of the Hecke field. Under the assumption of stronger forms of Sato-Tate equidistribution, we get stronger (but conditional) results. In the case of higher weights, we formulate the ordinariness conjecture for submotives of the intersection cohomology of proper algebraic varieties with motivic coefficients, and verify it for the motives whose -adic Galois realisations are abelian on a finite index subgroup. We get some results for Hilbert cuspforms of weight , weaker than those for .
Keywords
Cite
@article{arxiv.2410.01182,
title = {Ordinary primes in Hilbert modular varieties},
author = {Junecue Suh},
journal= {arXiv preprint arXiv:2410.01182},
year = {2024}
}
Comments
Published in 2020 and being arXived at the persuasion of an independent mathematician. With addendum in response to a message in Oct. 2024 from N. Katz