Curse of dimensionality reduction in max-plus based approximation methods: theoretical estimates and improved pruning algorithms
Abstract
Max-plus based methods have been recently developed to approximate the value function of possibly high dimensional optimal control problems. A critical step of these methods consists in approximating a function by a supremum of a small number of functions (max-plus "basis functions") taken from a prescribed dictionary. We study several variants of this approximation problem, which we show to be continuous versions of the facility location and -center combinatorial optimization problems, in which the connection costs arise from a Bregman distance. We give theoretical error estimates, quantifying the number of basis functions needed to reach a prescribed accuracy. We derive from our approach a refinement of the curse of dimensionality free method introduced previously by McEneaney, with a higher accuracy for a comparable computational cost.
Cite
@article{arxiv.1109.5241,
title = {Curse of dimensionality reduction in max-plus based approximation methods: theoretical estimates and improved pruning algorithms},
author = {Stephane Gaubert and William McEneaney and Zheng Qu},
journal= {arXiv preprint arXiv:1109.5241},
year = {2012}
}
Comments
8pages 5 figures