3-Query RLDCs are Strictly Stronger than 3-Query LDCs

TL;DR

This paper constructs 3-query RLDCs with constant alphabet size and quadratic length, demonstrating they are strictly stronger than 3-query LDCs, and introduces improved PCPPs with better parameters.

Contribution

It provides the first separation between RLDCs and LDCs by constructing efficient 3-query RLDCs and develops new PCPPs with optimal query complexity and size.

Findings

RLDCs are strictly stronger than LDCs for 3-query codes.

New 3-query PCPPs with quasi-linear size and constant alphabet.

A novel transformation from PCPPs to RLDCs.

Abstract

We construct $3$-query relaxed locally decodable codes (RLDCs) with constant alphabet size and length $\tilde{O}(k^2)$ for $k$-bit messages. Combined with the lower bound of $\tilde{\Omega}(k^3)$ of [Alrabiah, Guruswami, Kothari, Manohar, STOC 2023] on the length of locally decodable codes (LDCs) with the same parameters, we obtain a separation between RLDCs and LDCs, resolving an open problem of [Ben-Sasson, Goldreich, Harsha, Sudan and Vadhan, SICOMP 2006]. Our RLDC construction relies on two components. First, we give a new construction of probabilistically checkable proofs of proximity (PCPPs) with $3$ queries, quasi-linear size, constant alphabet size, perfect completeness, and small soundness error. This improves upon all previous PCPP constructions, which either had a much higher query complexity or soundness close to $1$. Second, we give a query-preserving transformation from PCPPs to RLDCs. At the heart of our PCPP construction is a $2$-query decodable PCP (dPCP) with matching parameters, and our construction builds on the HDX-based PCP of [Bafna, Minzer, Vyas, Yun, STOC 2025] and on the efficient composition framework of [Moshkovitz, Raz, JACM 2010] and [Dinur, Harsha, SICOMP 2013]. More specifically, we first show how to use the HDX-based construction to get a dPCP with matching parameters but a large alphabet size, and then prove an appropriate composition theorem (and related transformations) to reduce the alphabet size in dPCPs.