Hard properties with (very) short PCPPs and their applications

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 , we construct a property P()⊂eq\0,1\n satisfying the following: Any testing algorithm for P() requires (n) many queries, and yet P() has a constant query PCPP whose proof size is O(n· ()n), where () denotes the times iterated log function (e.g., (2)n = n). The best previously known upper bound on the PCPP proof size for a maximally hard to test property was O(n · polyn). 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 , we construct a property that has a constant-query tester, but requires (n/()(n)) queries for every tolerant or erasure-resilient tester.