Sublinear-Time Algorithms for Max Cut, Max E2Lin(q), and Unique Label Cover on Expanders

Abstract

We show sublinear-time algorithms for Max Cut and Max E2Lin(q) on expanders in the adjacency list model that distinguishes instances with the optimal value more than 1- from those with the optimal value less than 1- for . The time complexities for Max Cut and Max 2Lin(q) are O(1φ2 · m1/2+O(/(φ2))) and O(poly(qφ)· (mq)1/2+O(q6/φ22)), respectively, where m is the number of edges in the underlying graph and φ is its conductance. Then, we show a sublinear-time algorithm for Unique Label Cover on expanders with φ ε in the bounded-degree model. The time complexity of our algorithm is Od(2qO(1)·φ1/q· -1/2· n1/2+qO(q)· 41.5-q· φ-2), where n is the number of variables. We complement these algorithmic results by showing that testing 3-colorability requires (n) queries even on expanders.