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Zbl 1061.47060
Xu, Hong-Kun
Viscosity approximation methods for nonexpansive mappings. (English)
[J] J. Math. Anal. Appl. 298, No. 1, 279-291 (2004). ISSN 0022-247X

The author extends Moudafi's result in Hilbert spaces [{\it A. Moudafi}, J. Math. Anal. Appl. 241, 46--55 (2000; Zbl 0957.47039)] and further proves the strong convergence of a continuous scheme of Theorem 1.4. Further the hypotheses (H1)-(H3) for the iteration process (19) (or (38)) are refinements of those of Moudafi. The author provides a remarkable proof for the iterative scheme $x_{n+1} = \alpha _{n}f(x_{n}) + (1-\alpha _{n})Tx_{n}$ in uniformly smooth Banach spaces. These two results are of independent interest in both the theories of nonlinear operator equations and optimization. Reviewer's remarks: (i) There is an omission of a vital term on pp 280 (line 13). The inequality should read: $\leq \alpha t\Vert x-y\Vert + (1-t)\Vert x-y\Vert = (1-t(1-\alpha ))\Vert x-y\Vert .$ (ii) Under Remark on p. 290 (line 17), it should read: For the iteration process (19) (or (38)).
[Edward Prempeh (Kumasi)]

MSC 2000:: *47J25 Methods for solving nonlinear operator equations (general)
47H09 Mappings defined by "shrinking" properties
47H10 Fixed point theorems for nonlinear operators on topol.linear spaces

Keywords: viscosity approximation; nonexpansive mapping; fixed point

Citations: Zbl 0957.47039

Cited in: Zbl 1235.49055 Zbl 1168.65350 Zbl 1172.47054 Zbl 1167.47052 Zbl 1213.47060 Zbl 1137.47058 Zbl 1124.47049 Zbl 1121.47057 Zbl 1111.47059 Zbl 1206.47068 Zbl 1139.47050 Zbl 1131.47059 Zbl 1103.47053

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