Concave Aspects of Submodular Functions
Abstract
Submodular Functions are a special class of set functions, which generalize several information-theoretic quantities such as entropy and mutual information [1]. Submodular functions have subgradients and subdifferentials [2] and admit polynomial-time algorithms for minimization, both of which are fundamental characteristics of convex functions. Submodular functions also show signs similar to concavity. Submodular function maximization, though NP-hard, admits constant-factor approximation guarantees, and concave functions composed with modular functions are submodular. In this paper, we try to provide a more complete picture of the relationship between submodularity with concavity. We characterize the super-differentials and polyhedra associated with upper bounds and provide optimality conditions for submodular maximization using the-super differentials. This paper is a concise and shorter version of our longer preprint [3].
Cite
@article{arxiv.2006.16784,
title = {Concave Aspects of Submodular Functions},
author = {Rishabh Iyer and Jeff Bilmes},
journal= {arXiv preprint arXiv:2006.16784},
year = {2020}
}
Comments
Also appearing in International Symposium of Information Theory. arXiv admin note: substantial text overlap with arXiv:1506.07329