A globally convergent method based on Fischer-Burmeister operators for solving second-order cone constrained variational inequality problems
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[1] A. Fischer. A special newton-type optimization method , 1992 .
[2] J. Faraut,et al. Analysis on Symmetric Cones , 1995 .
[3] Paul Tseng,et al. Merit functions for semi-definite complemetarity problems , 1998, Math. Program..
[4] Defeng Sun,et al. Complementarity Functions and Numerical Experiments on Some Smoothing Newton Methods for Second-Order-Cone Complementarity Problems , 2003, Comput. Optim. Appl..
[5] H. Upmeier. ANALYSIS ON SYMMETRIC CONES (Oxford Mathematical Monographs) , 1996 .
[6] Defeng Sun,et al. Strong Semismoothness of the Fischer-Burmeister SDC and SOC Complementarity Functions , 2005, Math. Program..
[7] Jong-Shi Pang,et al. Nonsmooth Equations: Motivation and Algorithms , 1993, SIAM J. Optim..
[8] S. D. Chatterji. Proceedings of the International Congress of Mathematicians , 1995 .
[9] Steve Smale,et al. Algorithms for Solving Equations , 2010 .
[10] F. Facchinei,et al. Finite-Dimensional Variational Inequalities and Complementarity Problems , 2003 .
[11] Masao Fukushima,et al. Smoothing Functions for Second-Order-Cone Complementarity Problems , 2002, SIAM J. Optim..
[12] Jein-Shan Chen,et al. A semismooth Newton method for SOCCPs based on a one-parametric class of SOC complementarity functions , 2010, Comput. Optim. Appl..
[13] Liqun Qi,et al. A nonsmooth version of Newton's method , 1993, Math. Program..