A Simple proof for the algorithms of relaxed $(u, v)$-cocoercive mappings and $α$-inverse strongly monotone mappings

8 Feb 2018 · Ravi P. Agarwal, Ebrahim Soori, Donal O'Regan ·

In this paper, a simple proof is presented for the convergence of the algorithms for the class of relaxed $(u, v)$-cocoercive mappings and $\alpha$-inverse strongly monotone mappings. Based on $\alpha$-expansive maps, for example, a simple proof of the convergence of the recent iterative algorithms by relaxed $(u, v)$-cocoercive mappings due to Kumam-Jaiboon is provided. Also a simple proof for the convergence of the iterative algorithms by inverse-strongly monotone mappings due to Iiduka-Takahashi in a special case is provided. These results are an improvement as well as a refinement of previously known results.

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A Simple proof for the algorithms of relaxed $(u, v)$-cocoercive mappings and $α$-inverse strongly monotone mappings

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