Malaysian Journal of Mathematical Sciences, August 2016, Vol. 10(S)
Special Issue: The 7th International Conference on Research and Education in Mathematics (ICREM7)
Iterative Methods for Solving Split Feasibility Problem in Hilbert Space
A. Kilicman and L. B. Mohammed
Corresponding Email: akilic@upm.edu.my
Received date: -
Accepted date: -
Abstract:
Based on the recent work of Wang et al. (2012), in this paper, we construct a new algorithm for solving split feasibility problem for the class
of total quasi-asymptotically nonexpansive and uniformly $\tau$-Lipschitzian mappings in Hilbert space and prove its strong convergence result. The result presented in this paper, not only extend the result of Wang et al. Wang et al. (2012), but also extend, improve and generalize several well-known results in the literature.
Keywords: Iterative Algorithm, Total Quasi-Asymptotically Nonexpansive, Uniformly $\tau$-Lipschitzian, Split Feasibility Problem, Strong Convergence
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