论文信息 - Convergence and Error Bound of a Method for Solving Variational Inequality Problems via the Generalized D-Gap Function

Convergence and Error Bound of a Method for Solving Variational Inequality Problems via the Generalized D-Gap Function

The variational inequality problem (VIP) can be reformulated as an unconstrained minimization problem through the generalized D-gap function. Recently, a hybrid Newton-type method was proposed by Peng and Fukushima for minimizing a special form of the generalized D-gap function. In this paper, the hybrid Newton-type algorithm is extended to minimize the general form gαβ of the generalized D-gap function. It is shown that the algorithm has nice convergence properties. Under some reasonable conditions, it is proved that the algorithm is locally and globally convergent. Moreover, it is proved that the function gαβ has bounded level sets for strongly monotone VIP. An error bound of the algorithm is obtained.

J. Z. Zhang | B. Qu | C. Wang | J. Zhang

[1] A. Auslender. Optimisation : méthodes numériques , 1976 .

[2] Giles Auchmuty. Variational principles for variational inequalities , 1989 .

[3] Patrick T. Harker,et al. Finite-dimensional variational inequality and nonlinear complementarity problems: A survey of theory, algorithms and applications , 1990, Math. Program..

[4] G. Isac. Complementarity Problems , 1992 .

[5] Masao Fukushima,et al. Equivalent differentiable optimization problems and descent methods for asymmetric variational inequality problems , 1992, Math. Program..

[6] Jia Hao Wu,et al. A general descent framework for the monotone variational inequality problem , 1990, Math. Program..

[7] M. Fukushima. Merit Functions for Variational Inequality and Complementarity Problems , 1996 .

[8] K. Taji,et al. Unconstrained Optimization Reformulations of Variational Inequality Problems , 1997 .

[9] M. Fukushima,et al. Equivalent Unconstrained Minimization and Global Error Bounds for Variational Inequality Problems , 1997 .

[10] Ji-Ming Peng,et al. Equivalence of variational inequality problems to unconstrained minimization , 1997, Math. Program..

[11] Michael C. Ferris,et al. Engineering and Economic Applications of Complementarity Problems , 1997, SIAM Rev..

[12] Masao Fukushima,et al. A hybrid Newton method for solving the variational inequality problem via the D-gap function , 1999, Math. Program..