1. A VARIANT OF THE VAVASIS --YE LAYERED-STEP INTERIOR-POINT ALGORITHM FOR LINEAR PROGRAMMING.
- Author
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Monteiro, Renato D. C. and Tsuchiya, Takashi
- Subjects
- *
ALGORITHMS , *MATRICES (Mathematics) , *MATHEMATICS , *LINEAR substitutions , *MATHEMATICAL statistics - Abstract
In this paper we present a. variant of Vavasis and Ye's layered step path following primal-dual interior-point algorithm for linear programming. Our algorithm is a predictor corrector-type algorithm which uses from time to time the layered least squares (LLS) direction it, place of the affine scaling (AS) direction. It, has the same iteration-complexity bound of Vavasis and Ye's algorithm, namely O(n[sup3.5] log(XA + n)), where n is the number of normegative variables and XA is a certain condition number associated with the constraint matrix A. Vavasis and Ye's algorithm requires explicit knowledge of XA (which is very hard to compute or even estimate) in order to compute the layers for the LLS direction. It, contrast, our algorithm uses the AS direction at the current iterate to determine the layers for the LLS direction, and hence does not require the knowledge of XA. A variant with similar properties and with the same complexity has been developed by Megiddo, Mizuno, and Tsuchiya [Math. Programming, 82 (1998), pp. 339-355]. However, their algorithm needs to compute n LLS directions on every iteration, while ours computes at most one LLS direction on any given iteration. [ABSTRACT FROM AUTHOR]
- Published
- 2003
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