On the approximation of fixed points of non-self strict pseudocontractions
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- 作者:Vittorio Colao ; Giuseppe Marino…
- 关键词:Non ; self mappings ; Strict pseudocontractions ; Krasnoselskii ; Mann algorithm ; Fixed points
- 刊名:Revista de la Real Academia de Ciencias Exactas, Físicas y Naturales. Serie A. Matemáticas
- 出版年:2017
- 出版时间:January 2017
- 年:2017
- 卷:111
- 期:1
- 页码:159-165
- 全文大小:
- 刊物类别:Mathematics and Statistics
- 刊物主题:Mathematics, general; Applications of Mathematics; Theoretical, Mathematical and Computational Physics;
- 出版者:Springer Milan
- ISSN:1579-1505
- 卷排序:111
文摘
Let H be a Hilbert space and let C be a closed, convex and nonempty subset of H. If \(T:C\rightarrow H\) is a non-self and k-strict pseudocontractive mapping, we can define a map \(v:C\rightarrow \mathbb {R}\) by \(\, v(x):=\inf \{\lambda \ge 0:\lambda x+(1-\lambda )Tx\in C\}.\) Then, for a fixed \(x_{0}\in C\) and for \(\alpha _{0}:=\max \{k,v(x_{0})\},\) we define the Krasnoselskii–Mann algorithm \(x_{n+1}=\alpha _{n}x_{n}+(1-\alpha _{n})Tx_{n},\) where \(\alpha _{n+1}=\max \{\alpha _{n},v(x_{n+1})\}.\) So, here the coefficients \(\alpha _{n}\) are not chosen a priori, but built step by step. We prove both weak and strong convergence results when C is a strictly convex set and T is an inward mapping.