A polynomial time algorithm to approximate the mixed volume within a simply exponential factor
Abstract
Let be an -tuple of convex compact subsets in the Euclidean space , and let be the Euclidean volume in . The Minkowski polynomial is defined as and the mixed volume as Our main result is a poly-time algorithm which approximates with multiplicative error and with better rates if the affine dimensions of most of the sets are small. Our approach is based on a particular approximation of by a solution of some convex minimization problem. We prove the mixed volume analogues of the Van der Waerden and Schrijver-Valiant conjectures on the permanent. These results, interesting on their own, allow us to justify the abovementioned approximation by a convex minimization, which is solved using the ellipsoid method and a randomized poly-time time algorithm for the approximation of the volume of a convex set.
Keywords
Cite
@article{arxiv.cs/0702013,
title = {A polynomial time algorithm to approximate the mixed volume within a simply exponential factor},
author = {Leonid Gurvits},
journal= {arXiv preprint arXiv:cs/0702013},
year = {2009}
}
Comments
a journal version, accepted to Discrete and Computational Geometry