Some general convergence theorems on fixed points

Panicker, Rekha Manoj

Title: Some general convergence theorems on fixed points
Creator: Panicker, Rekha Manoj
ThesisAdvisor: Murali, V
ThesisAdvisor: Mishra, S N
Subject: Fixed point theory
Subject: Convergence
Subject: Coincidence theory (Mathematics)
Date: 2014
Type: Thesis
Type: Doctoral
Type: PhD
Identifier: vital:5426
Identifier: http://hdl.handle.net/10962/d1013112
Description: In this thesis, we first obtain coincidence and common fixed point theorems for a pair of generalized non-expansive type mappings in a normed space. Then we discuss two types of convergence theorems, namely, the convergence of Mann iteration procedures and the convergence and stability of fixed points. In addition, we discuss the viscosity approximations generated by (ψ ,ϕ)-weakly contractive mappings and a sequence of non-expansive mappings and then establish Browder and Halpern type convergence theorems on Banach spaces. With regard to iteration procedures, we obtain a result on the convergence of Mann iteration for generalized non-expansive type mappings in a Banach space which satisfies Opial's condition. And, in the case of stability of fixed points, we obtain a number of stability results for the sequence of (ψ,ϕ)- weakly contractive mappings and the sequence of their corresponding fixed points in metric and 2-metric spaces. We also present a generalization of Fraser and Nadler type stability theorems in 2-metric spaces involving a sequence of metrics.
Format: 104 leaves, pdf
Publisher: Rhodes University, Faculty of Science, Mathematics
Language: English
Rights: Panicker, Rekha Manoj

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