Abstract
Let $E$ be a uniformly convex real Banach space with uniformly Gâteaux differentiable norm and $E^*$ its dual space and let $A : E \rightarrow E^*$ be a bounded and uniformly monotone mapping such that $A^{-1}(0)\not= \varnothing$. In this paper, we introduce an new explicit iterative algorithm that converges strongly to the unique zeros of $A$. The results proved here are applied to the convex optimization problem.
Information
Published: 1 January 2018
First available in Project Euclid: 26 September 2019
Digital Object Identifier: 10.16929/sbs/2018.100-03-02
Subjects:
Primary:
47H04
,
47H06
,
47H15
,
47H17
,
47J25
Keywords:
iterative algorithms
,
uniformly monotone mapping
,
zeros of mappings
Rights: Copyright © 2018 The Statistics and Probability African Society
