Junta correlation is testable

Abstract

The problem of tolerant junta testing is a natural and challenging problem which asks if the property of a function having some specified correlation with a k-Junta is testable. In this paper we give an affirmative answer to this question: We show that given distance parameters 12 >cu>c 0, there is a tester which given oracle access to f:\-1,1\n → \-1,1\, with query complexity 2k · poly(k,1/|cu-c|) and distinguishes between the following cases: 1. The distance of f from any k-junta is at least cu; 2. There is a k-junta g which has distance at most c from f. This is the first non-trivial tester (i.e., query complexity is independent of n) which works for all 1/2 > cu > c 0. The best previously known results by Blais et~ al., required cu 16 c. In fact, with the same query complexity, we accomplish the stronger goal of identifying the most correlated k-junta, up to permutations of the coordinates. We can further improve the query complexity to poly(k, 1/|cu-c|) for the (weaker) task of distinguishing between the following cases: 1. The distance of f from any k'-junta is at least cu. 2. There is a k-junta g which is at a distance at most c from f. Here k'=O(k2/|cu-c|). Our main tools are Fourier analysis based algorithms that simulate oracle access to influential coordinates of functions.