Algorithmic Meta-Theorems for Monotone Submodular Maximization

Abstract

We consider a monotone submodular maximization problem whose constraint is described by a logic formula on a graph. Formally, we prove the following three `algorithmic metatheorems.' (1) If the constraint is specified by a monadic second-order logic on a graph of bounded treewidth, the problem is solved in nO(1) time with an approximation factor of O( n). (2) If the constraint is specified by a first-order logic on a graph of low degree, the problem is solved in O(n1 + ε) time for any ε > 0 with an approximation factor of 2. (3) If the constraint is specified by a first-order logic on a graph of bounded expansion, the problem is solved in nO( k) time with an approximation factor of O( k), where k is the number of variables and O(·) suppresses only constants independent of k.