Explicit Almost-Optimal -Balanced Codes via Free Expander Walks

Abstract

We study the problem of constructing explicit codes whose rate and distance match the Gilbert-Varshamov bound in the low-rate, high-distance regime. In 2017, Ta-Shma gave an explicit family of codes where every pair of codewords has relative distance 1-2, with rate (2+o(1)), matching the Gilbert-Varshamov bound up to a factor of o(1). Ta-Shma's construction was based on starting with a good code and amplifying its bias with walks arising from the s-wide-replacement product. In this work, we give a simpler almost-optimal construction, based on what we call free expander walks: ordinary expander walks where each step is taken on a distinct expander from a carefully chosen sequence. This sequence of expanders is derived from the construction of near-X-Ramanujan graphs due to O'Donnell and Wu. We additionally discuss some additional applications of near-X-Ramanujan graphs to "on average" lossless expansion and rotating expanders.