[PDF] Top 20 Strong convergence theorems for a common point of solution of variational inequality, solutions of equilibrium and fixed point problems

... weak convergence, in general, even for nonexpansive map- ...obtain strong convergence, some modifications of the normal Mann ’ s iteration algorithm has been ... See full document

... different problems and study the problem of finding the equilibrium problem coupled with fixed point ...the equilibrium problem and proved a strong convergence ...a common ... See full document

... of solutions of the variational ...the variational inequality problem (2.1) is equivalent to a fixed point problem, that is, an element u ∈ C is a solution of the ... See full document

... The set of solutions of 1.1 is denoted by EPF. Given a mapping T : C → H, let Fx, y Tx, y − x for all x, y ∈ C. Then, z ∈ EPF if and only if Tz, y − z ≥ 0 for all y ∈ C. Numerous problems in physics, ... See full document

... a common element of the set of solutions of a generalized equilibrium problem, the set of solutions of the variational inequality problem for a monotone, Lipschitz-continuous ... See full document

... a common fixed point problem of a finite family of asymptotically quasi- φ -nonexpansive mappings in the intermediate sense and an equilibrium ...problem. Strong convergence ... See full document

... fixed point problems of nonexpansive mappings and solution problems of the equilibrium problems ...consider common element problems based on a mean it- erative ... See full document

... tion, and economics reduce to finding a solution of (.); see [–]. In , Combettes and Hirstoaga [] introduced an iterative scheme of finding the best approximation to the initial data when EP(F) is ... See full document

... optimization problems, economics and transportation. The theory of variational inequalities has emerged as a rapidly growing area of research because of its applications; see [–] fore more details and ... See full document

... of variational inequality and the set of common fixed points of a countable family of nonexpansive mappings is introduced and ...A strong convergence theorem of the proposed ... See full document

... JK: Strong convergence theorems by hybrid projection methods for equilibrium problems and fixed point problems of the asymptotically quasi- φ -nonexpansive ...mappings. ... See full document

... above convergence theorems are ...a common solution to the zero point problems and fixed point problems based on hybrid iterative methods with ...errors. ... See full document

... a strong convergence theorem; for more details, see [] and the references ...treating solutions of the equilibrium problem and fixed points of generalized asymptoti- cally ... See full document

... Recently, variational inequalities, fixed point problems, and zero point problems have been investigated by many authors based on iterative methods; see, for example, [–] and the ... See full document

... The solution set of the variational inequality ...C. Variational inequality theory has been studied quite extensively and has emerged as an important tool in the study of a wide class ... See full document

... JK: Strong convergence theorems by hybrid projection methods for equilibrium problems and fixed point problems of the asymptotically quasi- φ -nonexpansive ...mappings. ... See full document

... Variational inequality problems have emerged as an effective and powerful tool for studying a wide class of problems which arise in economics, finance, image reconstruc- tion, ecology, ... See full document

... Lemma . Let C be nonempty closed and convex subset of a real Banach space E, and let T : C → C be a continuous pseudo-contraction. Let f : C → C be a fixed continuous bounded and strong pseudo-contraction with ... See full document

... a common solution of a finite family of variational inequality problems for monotone mappings with Bregman distance ...Our convergence theorem is applied to the convex ... See full document

... Recall that a closed convex subset C of a Banach space E is said to have a normal struc- ture if for each bounded closed convex subset K of C which contains at least two points, there exists an element x of K which is ... See full document