Open AccessSelf-Scaled Barriers and Interior-Point Methods for Convex Programming
Author(s) -
Yu. E. Nesterov,
Michael J. Todd
Publication year - 1997
Publication title -
mathematics of operations research
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.619
H-Index - 83
eISSN - 1526-5471
pISSN - 0364-765X
DOI - 10.1287/moor.22.1.1
Subject(s) - interior point method , mathematics , conic optimization , mathematical optimization , second order cone programming , conic section , hessian matrix , convex optimization , regular polygon , norm (philosophy) , convex analysis , geometry , political science , law
This paper provides a theoretical foundation for efficient interior-point algorithms for convex programming problems expressed in conic form, when the cone and its associated barrier are self-scaled. For such problems we devise long-step and symmetric primal-dual methods. Because of the special properties of these cones and barriers, our algorithms can take steps that go typically a large fraction of the way to the boundary of the feasible region, rather than being confined to a ball of unit radius in the local norm defined by the Hessian of the barrier
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