Solving Box Constrained Variational Inequalities by Using the Natural Residual with D-Gap Function Globalization
Abstract
We present a new method for the solution of the box constrained variational inequality problem, BVIP for short. Basically, this method is a nonsmooth Newton method applied to a reformulation of BVIP as a system of nonsmooth equations involving the natural residual. The method is globalized by using the D-gap function. We show that the proposed algorithm is globally and fast locally convergent. Moreover, if the problem is described by an affine function, the algorithm has a finite termination property. Numerical results for some large-scale variational inequality problems are reported.
Subject
finite termination
quadratic convergence
global convergence
Newton's method
D-gap function
natural residual
mixed complementarity problem
variational inequality problem
Permanent Link
http://digital.library.wisc.edu/1793/66062Type
Technical Report
Citation
97-14