Fixed point approximation of Picard normal <Emphasis Type='Italic'>S</Emphasis>-iteration process for generalized nonexpansive mappings in hyperbolic spaces

Mohammad Imdad; Samir Dashputre

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Fixed point approximation of Picard normal S-iteration process for generalized nonexpansive mappings in hyperbolic spaces

机译：双曲空间中广义非扩张映象的Picard正规 S -迭代过程的不动点近似

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Abstract In this paper, we establish strong and $$Delta$$ Δ -convergence theorems for a relatively new iteration process generated by generalized nonexpansive mappings in uniformly convex hyperbolic spaces. The theorems presented in this paper generalizes corresponding theorems for uniformly convex normed spaces of Kadioglu and Yildirim (Approximating fixed points of nonexpansive mappings by faster iteration process, arXiv:1402.6530v1 [math.FA], 2014) and CAT(0)-spaces of Abbas et al. (J Inequal Appl 2014:212, 2014) and many others in this direction.

机译：摘要在本文中，我们为均匀凸双曲空间中的广义非扩张映射生成的一个相对较新的迭代过程，建立了强和$$ Delta $$Δ-收敛定理。本文提出的定理概括了Kadioglu和Yildirim的一致凸范数空间的相应定理（通过更快的迭代过程逼近非膨胀映射的不动点，arXiv：1402.6530v1 [math.FA]，2014年）和CAT（0）-空间阿巴斯等。（J Inequal Appl 2014：212，2014）和许多其他朝这个方向发展的人。

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《Mathematical Sciences》 |2016年第3期|共8页
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Mohammad Imdad; Samir Dashputre;
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5. Fixed point and ergodic theorems for nonexpansive mappings on ultrametric Banach spaces. [D] . Farrier, Sandra N. 2005

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6. Convergence theorems for generalized nonexpansive multivalued mappings in hyperbolic spaces [O] . Jong Kyu Kim, Ramesh Prasad Pathak, Samir Dashputre, -1

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7. Fixed point approximation of Picard normal S-iteration process for generalized nonexpansive mappings in hyperbolic spaces [O] . Mohammad Imdad, Samir Dashputre 2016

机译：双曲空间中广义非膨胀映射的Picard法正常S迭代过程的不动点逼近

Fixed point approximation of Picard normal S-iteration process for generalized nonexpansive mappings in hyperbolic spaces

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