[PDF] Top 20 Strong convergence theorem for a class of multiple-sets split variational inequality problems in Hilbert spaces

... of Variational Inequality Problems (VIP) is well known, developed and appears to be one of the most important aspect in optimization and nonlinear analysis, since most mathematical problems ... See full document

... the class of T mappings in Hilbert ...the strong convergence theorem and gave a numerical test to illustrate our main ...point problems and equilibrium problems which will ... See full document

... ergodic theorem of Baillon’s type [] for nonspreading mappings in Hilbert ...a strong- convergence theorem somewhat related to Halpern’s type [] for this class of mappings ... See full document

... a strong convergence theorem of the proposed algorithm is proved under suitable ...a strong convergence theorem for the split feasibility ... See full document

... the problems of finding a common element in the set of solution of variational inequalities for an inverse-strongly monotone mapping and in the set of fixed points of nonexpansive mappings or strict ... See full document

... hand, variational inclusion problems are being used as mathematical pro- gramming models to study a large number of optimization problems arising in finance, economics, network, transportation and ... See full document

... The set of solution of 1.1 is denoted by EPF. Given a mapping A : C → H, let Fx, y Ax, y − x for all x, y ∈ C. Then, z ∈ EPF if and only if Az, y − z ≥ 0 for all y ∈ C, that is, z is a solution of the variational ... See full document

... a split monotone variational inclusion with the constraints of a variational inequality and a fixed point problem of a finite family of strict pseudo-contractions in real Hilbert ...a ... See full document

... Theorem 2 . (Meir and Keeler [11]) Let (X,d) be a complete metric space and let j be a Meir-Keeler contraction (MKC) on X, i.e., for every ε > 0, there exists δ > 0 such that d(x, y) < ε + δ implies ... See full document

... The split feasibility problem (SFP) is also important in nonlinear analysis and optimiza- tion. In , Censor and Elfving [] first proposed it for modeling in medical image recon- struction. Recently, the SFP ... See full document

... The problem (.) is very general in the sense that it includes, as special cases, optimization problems, variational inequality problems, the Nash equilibrium problems and others, see, ... See full document

... Let H be a real Hilbert space with the inner product ·, ·, which induces the norm · . Let C be a nonempty, closed, and convex subset of H. Let T be a nonlinear mapping of C into itself; we denote with Fix(T ) the ... See full document

... real Hilbert space with inner product ·, · and the norm · ...’ strong convergence, by ‘’ weak ...our convergence theorems, we need the following ... See full document

... world problems, including inverse problems; for instance, it is not hard to show that the split feasibility problem and the convex feasibility problem in signal processing and image reconstruction ... See full document

... Numerous problems in physics, optimization, and economics reduce to find a solution of equilibrium ...equilibrium problems in Hilbert space, see, for instance, Blum and Oettli 1, Combettes and ... See full document

... Equilibrium problems theory provides us a natural, novel and unified framework to study a wide class of problems arising in economics, finance, transportation, network and struc- tural analysis, ... 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, optimization, ... See full document

... In this section, we establish the equivalence between the new general system of variational inequalities 1.17 and some fixed point problem involving a nonexpansive mapping. Using the demiclosedness principle for ... See full document

... satisfied for A-valued norms if and only if hE, Ei is commutative, where hE, Ei = clspan{hx, yi|x, y ∈ E} (see [6]). A-valued norm is very important because of its applications also it may motivate us to study the ... See full document

... general split feasibility problem, general split equality problem, and split variational inclusion problem in real Hilbert ...some strong convergence theorems are ...on ... See full document