Sciweavers

FOCM
2010

Self-Concordant Barriers for Convex Approximations of Structured Convex Sets

13 years 11 months ago
Self-Concordant Barriers for Convex Approximations of Structured Convex Sets
We show how to approximate the feasible region of structured convex optimization problems by a family of convex sets with explicitly given and efficient (if the accuracy of the approximation is moderate) self-concordant barriers. This approach extends the reach of the modern theory of interior-point methods, and lays the foundation for new ways to treat structured convex optimization problems with a very large number of constraints. Moreover, our approach provides a strong connection from the theory of self-concordant barriers to the combinatorial optimization literature on solving packing and covering problems.
Levent Tunçel, Arkadi Nemirovski
Added 25 Jan 2011
Updated 25 Jan 2011
Type Journal
Year 2010
Where FOCM
Authors Levent Tunçel, Arkadi Nemirovski
Comments (0)