An Optimal Tester for $k$-Linear

TL;DR

This paper develops optimal property testers for k-linear Boolean functions, achieving query complexities that match known lower bounds and advancing understanding of testing efficiency.

Contribution

It introduces the first non-adaptive distribution-free two-sided tester for k-linear functions with optimal query complexity.

Findings

Non-adaptive distribution-free two-sided tester with O(k log k + 1/ε) queries.

Non-adaptive distribution-free one-sided tester for k-Linear* with same query complexity.

Lower bounds for non-adaptive uniform-distribution testers and adaptive testers established.

Abstract

A Boolean function $f:\{0,1\}^n\to \{0,1\}$ is $k$-linear if it returns the sum (over the binary field $F_2$) of $k$ coordinates of the input. In this paper, we study property testing of the classes $k$-Linear, the class of all $k$-linear functions, and $k$-Linear$^*$, the class $\cup_{j=0}^kj$-Linear. We give a non-adaptive distribution-free two-sided $\epsilon$-tester for $k$-Linear that makes $$O\left(k\log k+\frac{1}{\epsilon}\right)$$ queries. This matches the lower bound known from the literature. We then give a non-adaptive distribution-free one-sided $\epsilon$-tester for $k$-Linear$^*$ that makes the same number of queries and show that any non-adaptive uniform-distribution one-sided $\epsilon$-tester for $k$-Linear must make at least $ \tilde\Omega(k)\log n+\Omega(1/\epsilon)$ queries. The latter bound, almost matches the upper bound $O(k\log n+1/\epsilon)$ known from the literature. We then show that any adaptive uniform-distribution one-sided $\epsilon$-tester for $k$-Linear must make at least $\tilde\Omega(\sqrt{k})\log n+\Omega(1/\epsilon)$ queries.