Correspondences without a Core
Abstract
We study the formal properties of correspondences of curves without a core, focusing on the case of \'{e}tale correspondences. The motivating examples come from Hecke correspondences of Shimura curves. Given a correspondence without a core, we construct an infinite graph together with a large group of "algebraic" automorphisms . The graph measures the "generic dynamics" of the correspondence. We construct specialization maps to the "physical dynamics" of the correspondence. We also prove results on the number of bounded \'{e}tale orbits, in particular generalizing a recent theorem of Hallouin and Perret. We use a variety of techniques: Galois theory, the theory of groups acting on infinite graphs, and finite group schemes.
Keywords
Cite
@article{arxiv.1704.00335,
title = {Correspondences without a Core},
author = {Raju Krishnamoorthy},
journal= {arXiv preprint arXiv:1704.00335},
year = {2018}
}
Comments
part of the author's thesis. Comments welcome!