JOURNAL ARTICLE
A path-following infeasible-interior-point algorithm for linear complementarity problems
Year: 1993 Journal: Optimization methods & software Vol: 2 (2)Pages: 79-106 Publisher: Taylor & Francis
Abstract
We describe an infeasible-interior-point algorithm for monotone linear complementarity problems that has polynomial complexity, global linear convergence, and local superlinear convergence with a Q-order of 2. Only one matrix factorization is required per iteration, and the analysis assumes only that a strictly complementary solution exists.
Keywords:
Linear complementarity problem Mathematics Interior point method Complementarity theory Monotone polygon Complementarity (molecular biology) Mixed complementarity problem Factorization Convergence (economics) Algorithm Mathematical optimization Criss-cross algorithm Linear programming Applied mathematics Linear-fractional programming Nonlinear system
Metrics
29
Cited By
5.80
FWCI (Field Weighted Citation Impact)
7
Refs
0.97
Citation Normalized Percentile
Is in top 1%
Is in top 10%
Topics
Advanced Optimization Algorithms Research
Physical Sciences → Mathematics → Numerical Analysis
Matrix Theory and Algorithms
Physical Sciences → Computer Science → Computational Theory and Mathematics
Numerical methods for differential equations
Physical Sciences → Mathematics → Numerical Analysis
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