Extended Formulations for Radial Cones
Abstract
This paper studies extended formulations for radial cones at vertices of polyhedra, where the radial cone of a polyhedron at a vertex is the polyhedron defined by the constraints of that are active at . Given an extended formulation for , it is easy to obtain an extended formulation of comparable size for each its radial cones. On the contrary, it is possible that radial cones of admit much smaller extended formulations than itself. A prominent example of this type is the perfect-matching polytope, which cannot be described by subexponential-size extended formulations (Rothvo\ss{} 2014). However, Ventura & Eisenbrand (2003) showed that its radial cones can be described by polynomial-size extended formulations. Moreover, they generalized their construction to -join polyhedra. In the same paper, the authors asked whether the same holds for the odd-cut polyhedron, the blocker of the -join polyhedron. We answer this question negatively. Precisely, we show that radial cones of odd-cut polyhedra cannot be described by subexponential-size extended formulations. To obtain our result, for a polyhedron of blocking type, we establish a general relationship between its radial cones and certain faces of the blocker of .
Keywords
Cite
@article{arxiv.1805.10325,
title = {Extended Formulations for Radial Cones},
author = {Matthias Walter and Stefan Weltge},
journal= {arXiv preprint arXiv:1805.10325},
year = {2018}
}
Comments
10 pages