A kqq-2 Lower Bound for Odd Query Locally Decodable Codes from Bipartite Kikuchi Graphs

Abstract

A code C \0,1\k \0,1\n is a q-query locally decodable code (q-LDC) if one can recover any chosen bit bi of the message b ∈ \0,1\k with good confidence by querying a corrupted string x of the codeword x = C(b) in at most q coordinates. For 2 queries, the Hadamard code is a 2-LDC of length n = 2k, and this code is in fact essentially optimal. For q ≥ 3, there is a large gap in our understanding: the best constructions achieve n = (ko(1)), while prior to the recent work of [AGKM23], the best lower bounds were n ≥ (kqq-2) for q even and n ≥ (kq+1q-1) for q odd. The recent work of [AGKM23] used techniques from semirandom XOR refutation to prove a lower bound of n ≥ (k3) for q = 3, thus achieving the "kqq-2 bound" for an odd value of q. However, their proof does not extend to any odd q ≥ 5. In this paper, we prove a q-LDC lower bound of n ≥ (kqq-2) for any odd q. Our key technical idea is the use of an imbalanced bipartite Kikuchi graph, which gives a simpler method to analyze spectral refutations of odd arity XOR without using the standard "Cauchy-Schwarz trick", a trick that typically produces random matrices with nontrivially correlated entries and makes the analysis for odd arity XOR significantly more complicated than even arity XOR.

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