A Nearly-Quadratic Gap Between Adaptive and Non-Adaptive Property Testers

Abstract

We show that for all integers t≥ 8 and arbitrarily small ε>0, there exists a graph property (which depends on ε) such that ε-testing has non-adaptive query complexity Q=\~(q2-2/t), where q=\~(ε-1) is the adaptive query complexity. This resolves the question of how beneficial adaptivity is, in the context of proximity-dependent properties (benefits-of-adaptivity). This also gives evidence that the canonical transformation of Goldreich and Trevisan (canonical-testers) is essentially optimal when converting an adaptive property tester to a non-adaptive property tester. To do so, we provide optimal adaptive and non-adaptive testers for the combined property of having maximum degree O(ε N) and being a blow-up collection of an arbitrary base graph H.