Coboundary Expansion of Coset Complexes

Author(s)

Kaufman, Tali; Oppenheim, Izhar; Weinberger, Shmuel

Abstract

Coboundary expansion is a high dimensional generalization of the Cheeger constant to simplicial complexes. Originally, this notion was motivated by the fact that it implies topological expansion, but nowadays a significant part of the motivation stems from its deep connection to problems in theoretical computer science such as list agreement expansion and agreement expansion in the low soundness regime. In this paper, we prove coboundary expansion with non-Abelian coefficients for the coset complex construction of Kaufman and Oppenheim. Our proof uses a novel global argument, as opposed to the local-to-global arguments that are used to prove cosystolic expansion.

Description

STOC ’25, Prague, Czechia

Date issued

2025-06-15

URI

https://hdl.handle.net/1721.1/164421

Publisher

ACM|Proceedings of the 57th Annual ACM Symposium on Theory of Computing

Citation

Tali Kaufman, Izhar Oppenheim, and Shmuel Weinberger. 2025. Coboundary Expansion of Coset Complexes. In Proceedings of the 57th Annual ACM Symposium on Theory of Computing (STOC '25). Association for Computing Machinery, New York, NY, USA, 1722–1731.

Version: Final published version

ISBN

979-8-4007-1510-5