Testing Monotonicity of Real-Valued Functions on DAGs

Abstract

We study monotonicity testing of real-valued functions on directed acyclic graphs (DAGs) with n vertices. For every constant δ>0, we prove a (n1/2-δ/) lower bound against non-adaptive two-sided testers on DAGs, nearly matching the classical O(n/)-query upper bound. For constant , we also prove an ( n) lower bound for randomized adaptive one-sided testers on explicit bipartite DAGs, whereas previously only an ( n) lower bound was known. A key technical ingredient in both lower bounds is positive-matching Ruzsa--Szemer\'edi families. On the algorithmic side, we give simple non-adaptive one-sided testers with query complexity O(m\,/( n)) and O(m1/3/2/3), where m is the number of edges in the transitive reduction and is the number of edges in the transitive closure. For constant >0, these improve over the previous O(n/) bound when m=o(n3) and m=o(n3/2), respectively.