Risk-Sensitive Submodular Optimization
Abstract
The conditional value at risk (CVaR) is a popular risk measure which enables risk-averse decision making under uncertainty. We consider maximizing the CVaR of a continuous submodular function, an extension of submodular set functions to a continuous domain. One example application is allocating a continuous amount of energy to each sensor in a network, with the goal of detecting intrusion or contamination. Previous work allows maximization of the CVaR of a linear or concave function. Continuous submodularity represents a natural set of nonconcave functions with diminishing returns, to which existing techniques do not apply. We give a (1 - 1/e)-approximation algorithm for maximizing the CVaR of a monotone continuous submodular function. This also yields an algorithm for submodular set functions which produces a distribution over feasible sets with guaranteed CVaR. Experimental results in two sensor placement domains confirm that our algorithm substantially outperforms competitive baselines.
Cite
Text
Wilder. "Risk-Sensitive Submodular Optimization." AAAI Conference on Artificial Intelligence, 2018. doi:10.1609/AAAI.V32I1.12121Markdown
[Wilder. "Risk-Sensitive Submodular Optimization." AAAI Conference on Artificial Intelligence, 2018.](https://mlanthology.org/aaai/2018/wilder2018aaai-risk/) doi:10.1609/AAAI.V32I1.12121BibTeX
@inproceedings{wilder2018aaai-risk,
title = {{Risk-Sensitive Submodular Optimization}},
author = {Wilder, Bryan},
booktitle = {AAAI Conference on Artificial Intelligence},
year = {2018},
pages = {6451-6458},
doi = {10.1609/AAAI.V32I1.12121},
url = {https://mlanthology.org/aaai/2018/wilder2018aaai-risk/}
}