Optimal Single-Pass Streaming Lower Bounds for Approximating CSPs

TL;DR

This paper establishes optimal single-pass streaming lower bounds for approximating Max-CSP problems, significantly extending previous results to a broader class of problems using analytic techniques.

Contribution

It introduces a unified approach to derive tight lower bounds for Max-CSPs in the single-pass streaming model, generalizing prior algebraic-based results.

Findings

Proves linear-space lower bounds for distinguishing CSP instances with different satisfiability fractions.

Shows that all CSPs can be approximated within (1-ε) in quasilinear space, matching the lower bounds.

Provides a reduction from a distributional hidden partition problem to establish the lower bounds.

Abstract

For an arbitrary family of predicates $\mathcal{F} \subseteq \{0,1\}^{[q]^k}$ and any $\epsilon > 0$, we prove a single-pass, linear-space streaming lower bound against the gap promise problem of distinguishing instances of Max-CSP$({\mathcal{F}})$ with at most $\beta+\epsilon$ fraction of satisfiable constraints from instances of with at least $\gamma-\epsilon$ fraction of satisfiable constraints, whenever Max-CSP$({\mathcal{F}})$ admits a $(\gamma,\beta)$-integrality gap instance for the basic LP. This subsumes the linear-space lower bound of Chou, Golovnev, Sudan, Velingker, and Velusamy (STOC 2022), which applies only to a special subclass of CSPs with linear-algebraic structure. (Their result itself generalizes work of Kapralov and Krachun (STOC 2019) for Max-CUT.) Our approach identifies the right ``analytic'' analogues of previously-used linear-algebraic conditions; this yields substantial simplifications while capturing a much larger class of problems. Our lower bound is essentially optimal for single-pass streaming, since: (1) All CSPs admit $(1-\epsilon)$-approximations in quasilinear space, and (2) sublinear-space streaming algorithms can simulate the LP (on bounded-degree instances), giving approximation algorithms when integrality gap instances do not exist. The starting point for our lower bound is a reduction from a "distributional implicit hidden partition'' problem defined by Fei, Minzer, and Wang (STOC 2026) in the context of multi-pass streaming. Our result is an analogue of theirs in the single-pass setting, where we obtain a much stronger (and tight) space lower bound.