Minimum Cost Adaptive Submodular Cover

Abstract

Adaptive submodularity is a fundamental concept in stochastic optimization, with numerous applications such as sensor placement, hypothesis identification and viral marketing. We consider the problem of minimum cost cover of adaptive-submodular functions, and provide a 4(1+ Q)-approximation algorithm, where Q is the goal value. In fact, we consider a significantly more general objective of minimizing the pth moment of the coverage cost, and show that our algorithm simultaneously achieves a (p+1)p+1· ( Q+1)p approximation guarantee for all p 1. All our approximation ratios are best possible up to constant factors (assuming P NP). Moreover, our results also extend to the setting where one wants to cover multiple adaptive-submodular functions. Finally, we evaluate the empirical performance of our algorithm on instances of hypothesis identification.