High Dimensional Expanders: Eigenstripping, Pseudorandomness, and Unique Games
Abstract
Higher order random walks (HD-walks) on high dimensional expanders (HDX) have seen an incredible amount of study and application since their introduction by Kaufman and Mass [KM16], yet their broader combinatorial and spectral properties remain poorly understood. We develop a combinatorial characterization of the spectral structure of HD-walks on two-sided local-spectral expanders [DK17], which offer a broad generalization of the well-studied Johnson and Grassmann graphs. Our characterization, which shows that the spectra of HD-walks lie tightly concentrated in a few combinatorially structured strips, leads to novel structural theorems such as a tight -characterization of edge-expansion, as well as to a new understanding of local-to-global algorithms on HDX. Towards the latter, we introduce a spectral complexity measure called Stripped Threshold Rank, and show how it can replace the (much larger) threshold rank in controlling the performance of algorithms on structured objects. Combined with a sum-of-squares proof of the former -characterization, we give a concrete application of this framework to algorithms for unique games on HD-walks, in many cases improving the state of the art [RBS11, ABS15] from nearly-exponential to polynomial time (e.g. for sparsifications of Johnson graphs or of slices of the -ary hypercube). Our characterization of expansion also holds an interesting connection to hardness of approximation, where an -variant for the Grassmann graphs was recently used to resolve the 2-2 Games Conjecture [KMS18]. We give a reduction from a related -variant to our -characterization, but it loses factors in the regime of interest for hardness where the gap between and structure is large. Nevertheless, we open the door for further work on the use of HDX in hardness of approximation and unique games.
Cite
@article{arxiv.2011.04658,
title = {High Dimensional Expanders: Eigenstripping, Pseudorandomness, and Unique Games},
author = {Mitali Bafna and Max Hopkins and Tali Kaufman and Shachar Lovett},
journal= {arXiv preprint arXiv:2011.04658},
year = {2021}
}
Comments
An old version of this paper appeared under the title "High Dimensional Expanders: Random Walks, Pseudorandomness, and Unique Games." New version contains UG Algorithm for HD-walks over two-sided local-spectral expanders, tighter structural results, and simplified proofs