A d1/2+o(1) Monotonicity Tester for Boolean Functions on d-Dimensional Hypergrids

Abstract

Monotonicity testing of Boolean functions on the hypergrid, f:[n]d \0,1\, is a classic topic in property testing. Determining the non-adaptive complexity of this problem is an important open question. For arbitrary n, [Black-Chakrabarty-Seshadhri, SODA 2020] describe a tester with query complexity O(-4/3d5/6). This complexity is independent of n, but has a suboptimal dependence on d. Recently, [Braverman-Khot-Kindler-Minzer, ITCS 2023] and [Black-Chakrabarty-Seshadhri, STOC 2023] describe O(-2 n3d) and O(-2 nd)-query testers, respectively. These testers have an almost optimal dependence on d, but a suboptimal polynomial dependence on n. In this paper, we describe a non-adaptive, one-sided monotonicity tester with query complexity O(-2 d1/2 + o(1)), independent of n. Up to the do(1)-factors, our result resolves the non-adaptive complexity of monotonicity testing for Boolean functions on hypergrids. The independence of n yields a non-adaptive, one-sided O(-2 d1/2 + o(1))-query monotonicity tester for Boolean functions f:Rd \0,1\ associated with an arbitrary product measure.