Lower Bounds for Tolerant Junta and Unateness Testing via Rejection Sampling of Graphs

Abstract

We introduce a new model for testing graph properties which we call the rejection sampling model. We show that testing bipartiteness of n-nodes graphs using rejection sampling queries requires complexity (n2). Via reductions from the rejection sampling model, we give three new lower bounds for tolerant testing of Boolean functions of the form f\0,1\n \0,1\: k-junta testing with non-adaptive queries requires (k2) queries. unateness testing requires (n) queries. unateness testing with non-adaptive queries requires (n3/2) queries. Given the O(k3/2)-query non-adaptive junta tester of Blais B08, we conclude that non-adaptive tolerant junta testing requires more queries than non-tolerant junta testing. In addition, given the O(n3/4)-query unateness tester of Chen, Waingarten, and Xie CWX17b and the O(n)-query non-adaptive unateness tester of Baleshzar, Chakrabarty, Pallavoor, Raskhodnikova, and Seshadhri BCPRS17, we conclude that tolerant unateness testing requires more queries than non-tolerant unateness testing, in both adaptive and non-adaptive settings. These lower bounds provide the first separation between tolerant and non-tolerant testing for a natural property of Boolean functions.