Containment problems for polytopes and spectrahedra
Abstract
We study the computational question whether a given polytope or spectrahedron (as given by the positive semidefiniteness region of a linear matrix pencil ) is contained in another one . First we classify the computational complexity, extending results on the polytope/polytope-case by Gritzmann and Klee to the polytope/spectrahedron-case. For various restricted containment problems, NP-hardness is shown. We then study in detail semidefinite conditions to certify containment, building upon work by Ben-Tal, Nemirovski and Helton, Klep, McCullough. In particular, we discuss variations of a sufficient semidefinite condition to certify containment of a spectrahedron in a spectrahedron. It is shown that these sufficient conditions even provide exact semidefinite characterizations for containment in several important cases, including containment of a spectrahedron in a polyhedron. Moreover, in the case of bounded the criteria will always succeed in certifying containment of some scaled spectrahedron in .
Keywords
Cite
@article{arxiv.1204.4313,
title = {Containment problems for polytopes and spectrahedra},
author = {Kai Kellner and Thorsten Theobald and Christian Trabandt},
journal= {arXiv preprint arXiv:1204.4313},
year = {2013}
}
Comments
24 pages; minor corrections; to appear in SIAM J. Opt