English

High Dimensional Expanders: Eigenstripping, Pseudorandomness, and Unique Games

Computational Complexity 2021-07-20 v3 Combinatorics

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 2\ell_2-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 2\ell_2-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 qq-ary hypercube). Our characterization of expansion also holds an interesting connection to hardness of approximation, where an \ell_\infty-variant for the Grassmann graphs was recently used to resolve the 2-2 Games Conjecture [KMS18]. We give a reduction from a related \ell_\infty-variant to our 2\ell_2-characterization, but it loses factors in the regime of interest for hardness where the gap between 2\ell_2 and \ell_\infty structure is large. Nevertheless, we open the door for further work on the use of HDX in hardness of approximation and unique games.

Keywords

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

R2 v1 2026-06-23T20:01:34.256Z