Primal-dual algorithms for linear programming based on the logarithmic barrier method |
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| Authors: | B. Jansen C. Roos T. Terlaky J. P. Vial Professor |
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| Affiliation: | (1) Faculty of Technical Mathematics and Computer Science, Delft University of Technology, Delft, The Netherlands;(2) Present address: Eötvös University, Budapest, Hungary;(3) Department of Commercial and Industrial Economics, University of Geneva, Geneva, Switzerland |
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| Abstract: | In this paper, we deal with primal-dual interior point methods for solving the linear programming problem. We present a short-step and a long-step path-following primal-dual method and derive polynomial-time bounds for both methods. The iteration bounds are as usual in the existing literature, namely iterations for the short-step variant andO(nL) for the long-step variant. In the analysis of both variants, we use a new proximity measure, which is closely related to the Euclidean norm of the scaled search direction vectors. The analysis of the long-step method depends strongly on the fact that the usual search directions form a descent direction for the so-called primal-dual logarithmic barrier function.This work was supported by a research grant from Shell, by the Dutch Organization for Scientific Research (NWO) Grant 611-304-028, by the Hungarian National Research Foundation Grant OTKA-2116, and by the Swiss National Foundation for Scientific Research Grant 12-26434.89. |
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| Keywords: | Linear programming primal-dual interior point methods logarithmic barrier function polynomial algorithms |
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