Complexity Analysis of Primal-Dual Interior-Point  Methods for Linear Optimization Based on a New Parametric Kernel Function with a Trigonometric Barrier Term

X. Z. Cai; G. Q. Wang; M. El Ghami; Y. J. Yue

doi:10.1155/2014/710158

Abstract and Applied Analysis (Jan 2014)

Complexity Analysis of Primal-Dual Interior-Point Methods for Linear Optimization Based on a New Parametric Kernel Function with a Trigonometric Barrier Term

X. Z. Cai,
G. Q. Wang,
M. El Ghami,
Y. J. Yue

Affiliations

X. Z. Cai: College of Advanced Vocational Technology, Shanghai University of Engineering Science, Shanghai 200437, China
G. Q. Wang: College of Fundamental Studies, Shanghai University of Engineering Science, Shanghai 201620, China
M. El Ghami: Nesna University College, Mathematics Section, 8700 Nesna, Norway
Y. J. Yue: College of Advanced Vocational Technology, Shanghai University of Engineering Science, Shanghai 200437, China

DOI: https://doi.org/10.1155/2014/710158
Journal volume & issue: Vol. 2014

Abstract

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We introduce a new parametric kernel function, which is a combination of the classic kernel function and a trigonometric barrier term, and present various properties of this new kernel function. A class of large- and small-update primal-dual interior-point methods for linear optimization based on this parametric kernel function is proposed. By utilizing the feature of the parametric kernel function, we derive the iteration bounds for large-update methods, O(n2/3log⁡(n/ε)), and small-update methods, O(nlog⁡(n/ε)). These results match the currently best known iteration bounds for large- and small-update methods based on the trigonometric kernel functions.

Published in Abstract and Applied Analysis

ISSN: 1085-3375 (Print); 1687-0409 (Online)
Publisher: Wiley
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics
Website: https://onlinelibrary.wiley.com/journal/4058

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