English

The plectic conjecture over function fields

Number Theory 2021-12-28 v2 Algebraic Geometry Representation Theory

Abstract

We prove the plectic conjecture of Nekov\'a\v{r}-Scholl over global function fields QQ. For example, when the cocharacter is defined over QQ and the structure group is a Weil restriction from a geometric degree dd separable extension F/QF/Q, consider the complex computing \ell-adic intersection cohomology with compact support of the associated moduli space of shtukas over QIQ_I. We endow this with the structure of a complex of \DeclareMathOperator\WeilWeil(\Weil(F)dSd)I\DeclareMathOperator{\Weil}{Weil}(\Weil(F)^d\rtimes\mathfrak{S}_d)^I-modules, which extends its structure as a complex of \Weil(Q)I\Weil(Q)^I-modules constructed by Arinkin-Gaitsgory-Kazhdan-Raskin-Rozenblyum-Varshavsky. We show that the action of (\Weil(F)dSd)I(\Weil(F)^d\rtimes\mathfrak{S}_d)^I commutes with the Hecke action, and we give a moduli-theoretic description of the action of Frobenius elements in \Weil(F)d×I\Weil(F)^{d\times I}.

Keywords

Cite

@article{arxiv.2106.05382,
  title  = {The plectic conjecture over function fields},
  author = {Siyan Daniel Li-Huerta},
  journal= {arXiv preprint arXiv:2106.05382},
  year   = {2021}
}

Comments

Major revision: upgraded main result to level of complexes. 41 pages. Comments welcome!

R2 v1 2026-06-24T03:01:57.380Z