Altering points and applications
Abstract
It is well known that the rate of convergence of S-iteration process introduced by Agarwal et al. [J. Nonlinear Convex Anal., 8 (1) (2007), 61-79.] is faster than Picard iteration process for
contraction operators. Following the ideas of S-iteration process, we introduce a parallel S-iteration process for finding altering points of nonlinear operators. We apply our algorithms to solve a system of operator equations in Banach space setting. This work also includes convergence analysis of hybrid
steepest-descent-like method and hybrid Newton-like method in the context of altering points.
Published
2014-05-25
Issue
Section
Articles
How to Cite
Altering points and applications. (2014). Nonlinear Studies, 21(2). https://nonlinearstudies.com/index.php/nonlinear/article/view/1006