[PDF] Top 20 Approximation of fixed point for multi-valued nonexpansive mapping in Banach spaces

... the Banach contraction map- ping theorem, the Picard iteration converges at unique fixed point of T , but it fails to approxi- mate fixed point for nonexpansive mappings, even ... See full document

... fixed point of a single-valued nonexpansive mapping and a multivalued nonexpansive mapping on a uniformly convex Banach ...single-valued mapping to a ... See full document

... asymptotically nonexpansive mappings on a nonlinear domain ((UC) hyperbolic spaces) which includes both (UC) Banach spaces and CAT() ...(UC) Banach space and are also valid in CAT() ... See full document

... Hilbert spaces. The three-step iterative approximation problems were studied extensively by Noor [5, 6], Glowinski and Le Tallec [1], and Haubruge et ... See full document

... relatively nonexpansive mapping which is distinct from Bregman relatively nonexpansive ...find fixed points of weak Bregman relatively nonexpansive mappings and Bregman relatively ... See full document

... exists for each x, y on the unit sphere S(E) of E. Moreover, if for each y in S(E) the limit defined by (.) is uniformly attained for x in S(E), we say that the norm of E is uniformly Gâteaux differentiable. It is also ... See full document

... where the initial guess x 1  D is arbitrary and    n is a real sequence in   0 1  . It is known that under appro- priate settings the sequence  x n  converges weakly to a fixed point of T . ... See full document

... and nonexpansive if [15] H (T x, Ty) ≤ kx − yk, x, y ∈ D and quasi-nonexpansive if F (T ) 6= φ and H (T x, Ty) ≤ kx − yk for all x, y ∈ D and all p ∈ F (T ) ...A point x ∈ D is called a fixed ... See full document

... Chen, “Iterative approximation to common fixed points of nonexpansive mapping se- quences in reflexive Banach spaces,” Nonlinear Analysis: Theory, Methods & Applications , vol. Khan,[r] ... See full document

... asymptotically nonexpansive mappings was introduced by Goebel and Kirk 1 as a generalization of the class of nonexpansive ...real Banach space and T is an asymptotically nonexpansive ... See full document

... Panyanak, Nonexpansive set-valued mappings in metric and Banach spaces,. Nonlinear Convex Anal[r] ... See full document

... Dhage, BC: A fixed point theorem for multi-valued mappings in ordered Banach spaces with applications I. Yogesh Kumar : continuation methods for contractive and non expansive mapping (fu[r] ... See full document

... a Banach space (X, k · k), and let T : K → K be a nonexpansive mapping or a generalized nonexpansive ...a fixed point for T has been investigated, and some fixed ... See full document

... a multi-normed space was introduced by Dales and Polyakov ...operator spaces and Banach lattices. Motivations for the study of multi-normed spaces and many examples are given in ... See full document

... Fixed point theory in CAT(0) spaces was first studied by Kirk ...every nonexpansive (single-valued) mapping defined on a bounded closed convex sub- set of a complete CAT(0) space ... See full document

... convex Banach space endowed with a tran- sitive directed graph G = (V (G),E (G)), such that V (G) = C and E (G) is ...G-asymptotically nonexpansive self-mapping on ...mon fixed point of ... See full document

... Fixed point theory plays one of the important roles in nonlinear ...Stefan Banach proved a famous fixed point theorem for contractive mappings in complete metric ...b-metric ... See full document

... common fixed points of two quasi-nonexpansive multi- valued maps in Banach ...for multi-valued maps in Banach spaces, Nonlinear Analysis 71 (2009) 838- ... See full document

... In this paper, we propose an algorithms for finding a common fixed point of an infinite family of multi-valued generalized nonexpansive mappings in uniformly convex Banach spaces. ... See full document

... A classical question in the theory of functional equations is the following: “When is it true that a function, which approximately satisfies a functional equation E must be close to an exact solution of E ?” If the ... See full document