A Class of Polynomial Interior Point Algorithms for the Cartesian P-Matrix Linear Complementarity Problem over Symmetric Cones

G. Q. Wang; Y. Q. Bai

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A Class of Polynomial Interior Point Algorithms for the Cartesian P-Matrix Linear Complementarity Problem over Symmetric Cones

机译：对称锥上笛卡尔P矩阵线性互补问题的一类多项式内点算法

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In this paper, we present a new class of polynomial interior point algorithms for the Cartesian P-matrix linear complementarity problem over symmetric cones based on a parametric kernel function, which determines both search directions and the proximity measure between the iterate and the center path. The symmetrization of the search directions used in this paper is based on the Nesterov and Todd scaling scheme. By using Euclidean Jordan algebras, we derive the iteration bounds that match the currently best known iteration bounds for large- and small-update methods.

机译：在本文中，我们基于参数核函数，针对对称锥上的笛卡尔P矩阵线性互补问题，提出了一类新的多项式内点算法，该算法确定搜索方向和迭代路径与中心路径之间的接近度。本文使用的搜索方向对称是基于Nesterov和Todd缩放方案的。通过使用欧几里得约旦代数，我们得出与大更新和小更新方法的当前已知迭代边界相匹配的迭代边界。

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来源
《Journal of Optimization Theory and Applications》 |2012年第3期|p.739-772|共34页
作者
G. Q. Wang; Y. Q. Bai;
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作者单位

College of Fundamental Studies, Shanghai University of Engineering Science, Shanghai, 201620, China;

Department of Mathematics, Shanghai University, Shanghai, 200444, China;

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正文语种 eng
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关键词
Symmetric cone linear complementarity problem; Euclidean Jordan algebra; Kernel function; Interior point method; Large- and small-update methods;

机译：对称锥线性互补问题;欧氏乔丹代数;核函数;内点法;大小更新法;

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专利

1. A Class of Polynomial Interior Point Algorithms for the Cartesian P-Matrix Linear Complementarity Problem over Symmetric Cones [J] . Wang G.Q., Bai Y.Q. Journal of Optimization Theory and Applications . 2012,第3期

机译：对称锥上笛卡尔P矩阵线性互补问题的多项式内点算法
2. A class of polynomial interior-point algorithms for the Cartesian P*(κ) second-order cone linear complementarity problem [J] . Wang G.Q., Zhu D.T. Nonlinear Analysis: An International Multidisciplinary Journal . 2010,第12期

机译：一类笛卡尔P *（κ）二阶锥线性互补问题的多项式内点算法
3. Infeasible path-following interior point algorithm for Cartesian P*(k) nonlinear complementarity problems over symmetric cones [J] . Zhao Huali, Liu Hongwei International journal of computer mathematics . 2018,第5a8期

机译：对称锥上笛卡尔P *（k）非线性互补问题的不可行路径跟踪内点算法
4. A new polynomial interior-point algorithm for the Cartesian P*(κ)-LCP over symmetric cones [C] . G.Q.Wang, D.T.Zhu The 8th international conference on optimization: Techniques and Applications . 2010

机译：对称锥上笛卡尔P *（κ）-LCP的多项式内点算法
5. CLASSIFICATION OF ALL THE MINIMAL BILINEAR ALGORITHMS FOR COMPUTING THE COEFFICIENTS OF TWO POLYNOMIALS MODULO A POLYNOMIAL [D] . AVERBUCH, AMIR. 1984

机译：所有最小双线性算法的分类，用于计算两种多项式模数的系数多项式
6. Analysis of Polynomial Nonlinearity Based on Measures of Nonlinearity Algorithms [O] . Mahendra Mallick, Xiaoqing Tian 2020

机译：基于非线性算法测度的多项式非线性分析
7. An interior-point method for the Cartesian P*(k)-linear complementarity problem over symmetric cones [O] . B Kheirfam 2014

机译：对称锥上笛卡尔p *（k） - 线性互补问题的内点法
8. Interior-point Method with Polynomial Complexity and Superlinear Convergence for Linear Complementarity Problems. [R] . Ji, J., Potra, F., Tapia, R. A., 1991

机译：线性互补问题的多项式复杂度和超线性收敛的内点法。

A Class of Polynomial Interior Point Algorithms for the Cartesian P-Matrix Linear Complementarity Problem over Symmetric Cones

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