论文信息 - Self-Scaled Barriers and Interior-Point Methods for Convex Programming

Self-Scaled Barriers and Interior-Point Methods for Convex Programming

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.

Michael J. Todd | Yurii Nesterov | Y. Nesterov | M. Todd

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