Symmetric varieties for endoscopic groups
Abstract
Given a quasi-split reductive group and a symmetric variety , we introduce a notion of endoscopic varieties for , and establish the foundational properties of these varieties such as matching of stable semi-simple orbits. To do this, we introduce certain automorphism groups of homogeneous spherical varieties, which encode the fine rational structure needed to work over non-algebraically closed fields. In particular, we establish the existence and uniqueness of the corresponding symmetric varieties under a mild restriction of the characteristic of the field of definition. We conjecture that this construction plays a role analogous to endoscopic groups in the context of the relative trace formula. As evidence, we show how our construction gives a pre-stabilization of regular elliptic terms of relative trace formulae for many pairs . When the cotangent bundle of the symmetric variety is hyperspherical, we relate our theory to the Hamiltonian variety of the Langlands dual group introduced by Ben-Zvi, Sakellaridis, and Venkatesh, proving some structural conjectures for this variety in the symmetric setting.
Cite
@article{arxiv.2401.09156,
title = {Symmetric varieties for endoscopic groups},
author = {Spencer Leslie},
journal= {arXiv preprint arXiv:2401.09156},
year = {2024}
}
Comments
v2. Several minor errors and typos fixed. Comments welcome and appreciated!