Title :
A new type of solution method for the generalized complementarity problem over a polyhedral cone
Author :
Chen, Kaixun ; Sun, Min
Author_Institution :
Feixian Sch., Linyi Normal Univ., Feixian, China
Abstract :
In this paper, we propose a new type of solution method for the generalized complementarity problem over a polyhedral cone (GCP). The method ensures that the corrector step sizes have a uniformly positive bound from below. Under mild conditions, we prove its global convergence. Under the Lipschitz continuity and g- strong monotonicity of the underlying mapping, we give the global error bound for GCP, and prove that the predictor step sizes have a uniformly positive bound from below, and finally by virtue of the global error bound, we prove that the proposed method has a R-linear convergence rate.
Keywords :
convergence of numerical methods; optimisation; problem solving; GCP; Lipschitz continuity; R-linear convergence rate; g- strong monotonicity; generalized complementarity problem; global convergence; global error bound; polyhedral cone; Ear; R-linear convergence; generalized complementarity problem; global convergence; solution method;
Conference_Titel :
Industrial and Information Systems (IIS), 2010 2nd International Conference on
Conference_Location :
Dalian
Print_ISBN :
978-1-4244-7860-6
DOI :
10.1109/INDUSIS.2010.5565831
