Please use this identifier to cite or link to this item: https://hdl.handle.net/10316/44481
Title: Lifts of convex sets and cone factorizations
Authors: Gouveia, João 
Parrilo, Pablo A. 
Thomas, Rekha 
Issue Date: 2013
Publisher: INFORMS
Project: PEst-C/MAT/UI0324/2011 
metadata.degois.publication.title: Mathematics of Operations Research
metadata.degois.publication.volume: 38
metadata.degois.publication.issue: 2
Abstract: In this paper we address the basic geometric question of when a given convex set is the image under a linear map of an affine slice of a given closed convex cone. Such a representation or 'lift' of the convex set is especially useful if the cone admits an efficient algorithm for linear optimization over its affine slices. We show that the existence of a lift of a convex set to a cone is equivalent to the existence of a factorization of an operator associated to the set and its polar via elements in the cone and its dual. This generalizes a theorem of Yannakakis that established a connection between polyhedral lifts of a polytope and nonnegative factorizations of its slack matrix. Symmetric lifts of convex sets can also be characterized similarly. When the cones live in a family, our results lead to the definition of the rank of a convex set with respect to this family. We present results about this rank in the context of cones of positive semidefinite matrices. Our methods provide new tools for understanding cone lifts of convex sets.
URI: https://hdl.handle.net/10316/44481
DOI: 10.1287/moor.1120.0575
10.1287/moor.1120.0575
Rights: openAccess
Appears in Collections:I&D CMUC - Artigos em Revistas Internacionais

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