Testing Unateness of Real-Valued Functions

Abstract

We give a unateness tester for functions of the form f:[n]d→ R, where n,d∈ N and R⊂eq R with query complexity O(d ((d,n))ε). Previously known unateness testers work only for Boolean functions over the domain \0,1\d. We show that every unateness tester for real-valued functions over hypergrid has query complexity (\d, |R|2\). Consequently, our tester is nearly optimal for real-valued functions over \0,1\d. We also prove that every nonadaptive, 1-sided error unateness tester for Boolean functions needs (d/ε) queries. Previously, no lower bounds for testing unateness were known.