Price of Dependence: Stochastic Submodular Maximization with Dependent Items

TL;DR

This paper addresses stochastic submodular maximization with dependent items under packing constraints, introducing a non-adaptive policy that approximates the optimal adaptive policy considering item dependencies.

Contribution

It introduces the concept of degree of independence and provides a non-adaptive policy with approximation guarantees for dependent items in stochastic submodular maximization.

Findings

Non-adaptive policy approximates optimal adaptive policy within a factor depending on independence degree.

Analysis of the adaptivity gap for prefix-closed constraints.

Extension of stochastic submodular maximization to dependent item scenarios.

Abstract

In this paper, we study the stochastic submodular maximization problem with dependent items subject to packing constraints such as matroid and knapsack constraints. The input of our problem is a finite set of items, and each item is in a particular state from a set of possible states. After picking an item, we are able to observe its state. We assume a monotone and submodular utility function over items and states, and our objective is to select a group of items adaptively so as to maximize the expected utility. Previous studies on stochastic submodular maximization often assume that items' states are independent, however, this assumption may not hold in general. This motivates us to study the stochastic submodular maximization problem with dependent items. We first introduce the concept of \emph{degree of independence} to capture the degree to which one item's state is dependent on others'. Then we propose a non-adaptive policy that approximates the optimal adaptive policy within a factor of $\alpha(1-e^{-\frac{\kappa}{2}+\frac{\kappa}{18m^2}}-\frac{\kappa+2}{3m\kappa})$ where the value of $\alpha$ is depending on the type of constraints, e.g., $\alpha=1$ for matroid constraint, $\kappa$ is the degree of independence, e.g., $\kappa=1$ for independent items, and $m$ is the number of items. We also analyze the adaptivity gap, i.e., the ratio of the values of best adaptive policy and best non-adaptive policy, of our problem with prefix-closed constraints.