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Smooth Hyperbolicity Cones are Spectrahedral Shadows
Preprint
02 August 2012
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Abstract
Hyperbolicity cones are convex algebraic cones arising from hyperbolic polynomials. A well-understood subclass of hyperbolicity cones is that of spectrahedral cones and it is conjectured that every hyperbolicity cone is spectrahedral. In this paper we prove a weaker version of this conjecture by showing that every smooth hyperbolicity cone is the linear projection of a spectrahedral cone, that is, a spectrahedral shadow.
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Most cited references4
- Record: found
- Abstract: not found
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Linear matrix inequality representation of sets
J. William Helton, Victor Vinnikov (2007)
- Record: found
- Abstract: not found
- Article: not found
Hyperbolic Programs, and Their Derivative Relaxations
James Renegar (2006)
- Record: found
- Abstract: not found
- Article: not found
Sufficient and Necessary Conditions for Semidefinite Representability of Convex Hulls and Sets
J. William Helton, Jiawang Nie (2009)