Convergence analysis of generalized iterative methods for some variational inequalities involving pseudomonotone operators in Banach spaces

Convergence analysis of generalized iterative methods for some variational inequalities involving pseudomonotone operators in Banach spaces

0.00 Avg rating0 Votes
Article ID: iaor20112149
Volume: 217
Issue: 10
Start Page Number: 4856
End Page Number: 4865
Publication Date: Jan 2011
Journal: Applied Mathematics and Computation
Authors:
Keywords: convergence, iterative methods, bandwidth allocation, Banach space
Abstract:

This work is concerned with the analysis of convergence of generalized iterative methods for solving some variational inequalities with pseudomonotone operators and convex nondifferentiable functionals in Banach spaces. Such inequalities occur, in particular, in descriptions of steady‐state filtration processes and equilibrium problems for soft shells. The results obtained in this paper include and extend the results of B. Badriev et al. (2001).

Reviews

Required fields are marked *. Your email address will not be published.