Title :
Primal-Dual Interior-Point Methods for Second-Order Cone Complementarity Based on a New Class of Kernel Function
Author :
Yang, Xue-Mei ; Zhao, Hua-Li ; Hu, Guo-ling
Author_Institution :
Coll. of Math. & Inf. Sci., Xianyang Normal Univ., Xianyang, China
Abstract :
In this paper we study primal-dual interior point methods (IPMs) based on a new class of kernel functions which were designed by M. El Ghami, J.B.M Melissen and C. Roos for linear optimization, we extend the functions to second-order cone complementarity (SOCCP). The complexity bound of the method is shown, and the complexity bound of small-update interior-point methods matches the best known complexity bounds obtained for these methods, the complexity bound of large-update interior-point methods is currently the best known bound for primal-dual IPMs.
Keywords :
algebra; linear programming; set theory; complexity bound; kernel function; large update interior point methods; linear optimization; primal dual interior point methods; second order cone complementarity; small update interior point methods; Algebra; Algorithm design and analysis; Design optimization; Educational institutions; Equations; Information science; Iterative algorithms; Kernel; Mathematics; Meteorology; comple- xity; kernel function; primal-dual interior-point; second-order cone complementarity;
Conference_Titel :
Computational Science and Optimization (CSO), 2010 Third International Joint Conference on
Conference_Location :
Huangshan, Anhui
Print_ISBN :
978-1-4244-6812-6
Electronic_ISBN :
978-1-4244-6813-3
DOI :
10.1109/CSO.2010.84
