Hard properties with (very) short PCPPs and their applications

TL;DR

This paper constructs properties that are extremely hard to test with many queries, yet admit very short proofs of correctness, revealing fundamental limits and separations in property testing models.

Contribution

It introduces properties with maximal testing hardness that still have nearly linear size PCPPs, improving previous bounds and demonstrating stronger model separations.

Findings

Existence of properties requiring linear queries for testing.

Existence of PCPPs with proof size close to linear.

Stronger separations between testing, tolerant testing, and erasure-resilient testing.

Abstract

We show that there exist properties that are maximally hard for testing, while still admitting PCPPs with a proof size very close to linear. Specifically, for every fixed $\ell$, we construct a property $\mathcal{P}^{(\ell)}\subseteq\{0,1\}^n$ satisfying the following: Any testing algorithm for $\mathcal{P}^{(\ell)}$ requires $\Omega(n)$ many queries, and yet $\mathcal{P}^{(\ell)}$ has a constant query PCPP whose proof size is $O(n\cdot \log^{(\ell)}n)$, where $\log^{(\ell)}$ denotes the $\ell$ times iterated log function (e.g., $\log^{(2)}n = \log \log n$). The best previously known upper bound on the PCPP proof size for a maximally hard to test property was $O(n \cdot \mathrm{poly}\log{n})$. As an immediate application, we obtain stronger separations between the standard testing model and both the tolerant testing model and the erasure-resilient testing model: for every fixed $\ell$, we construct a property that has a constant-query tester, but requires $\Omega(n/\log^{(\ell)}(n))$ queries for every tolerant or erasure-resilient tester.