Mildly Exponential Lower Bounds on Tolerant Testers for Monotonicity, Unateness, and Juntas

Abstract

We give the first super-polynomial (in fact, mildly exponential) lower bounds for tolerant testing (equivalently, distance estimation) of monotonicity, unateness, and juntas with a constant separation between the "yes" and "no" cases. Specifically, we give A 2(n1/4/)-query lower bound for non-adaptive, two-sided tolerant monotonicity testers and unateness testers when the "gap" parameter 2-1 is equal to , for any ≥ 1/n; A 2(k1/2)-query lower bound for non-adaptive, two-sided tolerant junta testers when the gap parameter is an absolute constant. In the constant-gap regime no non-trivial prior lower bound was known for monotonicity, the best prior lower bound known for unateness was (n3/2) queries, and the best prior lower bound known for juntas was poly(k) queries.