Coboundary expansion inside Chevalley coset complex HDXs
Abstract
Recent major results in property testing~BLM24,DDL24 and PCPs~BMV24 were unlocked by moving to high-dimensional expanders (HDXs) constructed from Cd-type buildings, rather than the long-known Ad-type ones. At the same time, these building quotient HDXs are not as easy to understand as the more elementary (and more symmetric/explicit) coset complex HDXs constructed by Kaufman--Oppenheim~KO18 (of Ad-type) and O'Donnell--Pratt~OP22 (of Bd-, Cd-, Dd-type). Motivated by these considerations, we study the B3-type generalization of a recent work of Kaufman--Oppenheim~KO21, which showed that the A3-type coset complex HDXs have good 1-coboundary expansion in their links, and thus yield 2-dimensional topological expanders. The crux of Kaufman--Oppenheim's proof of 1-coboundary expansion was: (1)~identifying a group-theoretic result by Biss and Dasgupta~BD01 on small presentations for the A3-unipotent group over~Fq; (2)~``lifting'' it to an analogous result for an A3-unipotent group over polynomial extensions~Fq[x]. For our B3-type generalization, the analogue of~(1) appears to not hold. We manage to circumvent this with a significantly more involved strategy: (1)~getting a computer-assisted proof of vanishing 1-cohomology of B3-type unipotent groups over~F5; (2)~developing significant new ``lifting'' technology to deduce the required quantitative 1-cohomology results in B3-type unipotent groups over F5k[x].
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