A Stochastic Smoothing Algorithm for Semidefinite Programming

Alexandre d’Aspremont, Noureddine El Karoui

Type: Article

Publication Date: 2014-01-01

Citations: 3

DOI: https://doi.org/10.1137/12088728x

Abstract

We use a rank one Gaussian perturbation to derive a smooth stochastic approximation of the maximum eigenvalue function. We then combine this smoothing result with an optimal smooth stochastic optimization algorithm to produce an efficient method for solving maximum eigenvalue minimization problems. We show that the complexity of this new method is lower than that of deterministic smoothing algorithms in certain precision/dimension regimes.

Locations

arXiv (Cornell University) - View - PDF
CiteSeer X (The Pennsylvania State University) - View - PDF
HAL (Le Centre pour la Communication Scientifique Directe) - View
DataCite API - View
SIAM Journal on Optimization - View

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+	Fundamentals of Convex Analysis	2001	Jean‐Baptiste Hiriart‐Urruty Claude Lemaréchal
+	Convex analysis and minimization algorithms	1993	Jean‐Baptiste Hiriart‐Urruty Claude Lemaréchal
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+	Local Operator Theory, Random Matrices and Banach Spaces	2001	Kenneth R. Davidson Stanisław J. Szarek
+ PDF Chat	Applied Asymptotic Analysis	2006	Peter D. Miller
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+	A Spectral Bundle Method for Semidefinite Programming	2000	Christoph Helmberg Franz Rendl