English

$\infty$-Categorical Perverse $p$-adic Differential Equations over Stacks

Number Theory 2022-01-21 v2 Algebraic Geometry

Abstract

We will discuss \infty-categorical perverse pp-adic differential equations over stacks. On one hand, we are going to study some pp-adic analogous results of the Drinfeld's original lemma about the \'etale fundamental groups in the \'etale setting, in the context of FF-isocrystals closely after Kedlaya and Kedlaya-Xu. We expect similar things could also be considered for diamonds after Scholze, in the context of Kedlaya-Liu's work namely the derived category of pseudocoherent Frobenius sheaves, which will induce some categorical form of Drinfeld's lemma for diamonds motivated by work of Carter-Kedlaya-Z\'abr\'adi and Pal-Z\'abr\'adi. On the other hand, we are going to establish the \infty-categorical theory of arithmetic DD-modules after Abe and Gaitsgory-Lurie, which will allow one to construct the rigid Gross GG-motives. And we are expecting to apply the whole machinery to revisit Weil's conjecture parallel to and after Gaitsgory-Lurie.

Keywords

Cite

@article{arxiv.2201.05003,
  title  = {$\infty$-Categorical Perverse $p$-adic Differential Equations over Stacks},
  author = {Xin Tong},
  journal= {arXiv preprint arXiv:2201.05003},
  year   = {2022}
}

Comments

47 pages

R2 v1 2026-06-24T08:49:02.079Z