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Newton-type methods for solving vertical linear complementarity problems Journal article
He, Jiewen, Vong, Seakweng. Newton-type methods for solving vertical linear complementarity problems[J]. Journal of Computational and Applied Mathematics, 2025, 460, 116418.
Authors:  He, Jiewen;  Vong, Seakweng
Favorite | TC[WOS]:0 TC[Scopus]:0  IF:2.1/2.1 | Submit date:2025/01/22
Vertical Linear Complementarity Problems  Newton's Method  Iteration Methods  Convergence  
The modulus-based nonsmooth Newton’s method for solving a class of nonlinear complementarity problems of P-matrices Journal article
Zheng H., Vong S.. The modulus-based nonsmooth Newton’s method for solving a class of nonlinear complementarity problems of P-matrices[J]. Calcolo, 2018, 55(3).
Authors:  Zheng H.;  Vong S.
Favorite | TC[WOS]:16 TC[Scopus]:18 | Submit date:2018/12/24
Modulus-based Method  Nonlinear Complementarity Problem  Nonsmooth Newton’s Method  P-matrix  
Convergence and uniqueness properties of Gauss-Newton's method Journal article
Li C., Zhang W.-H., Jin X.-Q.. Convergence and uniqueness properties of Gauss-Newton's method[J]. Computers and Mathematics with Applications, 2004, 47(2018-06-07), 1057.
Authors:  Li C.;  Zhang W.-H.;  Jin X.-Q.
Favorite | TC[WOS]:39 TC[Scopus]:48 | Submit date:2018/10/30
Convergence Ball  Gauss-newton's Method  Lipschitz Conditions With l Average  Uniqueness Ball