Please use this identifier to cite or link to this item: http://localhost:8080/xmlui/handle/123456789/293
Title: SOME FIXED POINT RESULTS FOR TAC-SUZUKI CONTRACTIVE MAPPINGS
Authors: Mebawondu, A. A
Mewomo, O. T
Keywords: Suzuki mapping, fixed point, TAC-Suzuki Berinde F-contraction, TAC-(ψ, φ)-Suzuki type rational contraction, metric space.
Issue Date: 2019
Publisher: Commun. Korean Math. Soc
Citation: Mebawondu, A. A. & Mewomo, O. T. (2019). SOME FIXED POINT RESULTS FOR TAC-SUZUKI CONTRACTIVE. Commun. Korean Math. Soc. 34 (2019), No. 4, pp. 1201–1222 https://doi.org/10.4134/CKMS.c180426 pISSN: 1225-1763 / eISSN: 2234-3024 MAPPINGS.
Series/Report no.: 34;4
Abstract: Banach contraction principle [2] can be seen as the pivot of the theory of fixed point and its applications. The theory of fixed point plays an important role in nonlinear functional analysis and it is very useful for showing the existence and uniqueness theorems for nonlinear differential and integral equations. The importance of the Banach contraction principle cannot be over emphasized in the study of fixed point theory and its applications. The Banach contraction principle have been extended and generalized by researchers in this area by considering classes of nonlinear mappings and spaces which are more general than the class of a contraction mappings and metric spaces (see [1,7,10,14–16, 19, 22] and the references therein). For example, Geraghty [11] introduced a generalized contraction mapping called Geraghty-contraction and established the fixed point theorem for this class of contraction mappings in the frame work of metric spaces. We recall that for a metric space (X, d), a mapping T : X → X is said to be an α-contraction if there exists α ∈ [0, 1) such that (1.1) d(T x, T y) ≤ αd(x, y), ∀ x, y ∈ X.
URI: http://localhost:8080/xmlui/handle/123456789/293
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