Advanced Algorithms and Common Solutions to Variational Inequalities

The paper aims to present advanced algorithms arising out of adding the inertial technical and shrinking projection terms to ordinary parallel and cyclic hybrid inertial sub-gradient extra-gradient algorithms (for short, PCHISE). Via these algorithms, common solutions of variational inequality problems (CSVIP) and strong convergence results are obtained in Hilbert spaces. The structure of this problem is to find a solution to a system of unrelated VI fronting for set-valued mappings. To clarify the acceleration, effectiveness, and performance of our parallel and cyclic algorithms, numerical contributions have been incorporated. In this direction, our results unify and generalize some related papers in the literature.

[1]  Pham Ky Anh,et al.  Parallel and sequential hybrid methods for a finite family of asymptotically quasi $$\phi $$ϕ-nonexpansive mappings , 2015 .

[2]  Yair Censor,et al.  The Subgradient Extragradient Method for Solving Variational Inequalities in Hilbert Space , 2011, J. Optim. Theory Appl..

[3]  Y. Censor,et al.  Common Solutions to Variational Inequalities , 2012 .

[4]  R. Rockafellar On the maximality of sums of nonlinear monotone operators , 1970 .

[5]  Pham Ky Anh,et al.  Modified hybrid projection methods for finding common solutions to variational inequality problems , 2017, Comput. Optim. Appl..

[6]  Pham Ngoc Anh,et al.  A Fixed Point Scheme for Nonexpansive Mappings, Variational Inequalities and Equilibrium Problems , 2015 .

[7]  Dang Van Hieu Parallel hybrid methods for generalized equilibrium problems and asymptotically strictly pseudocontractive mappings , 2016 .

[8]  Dang Van Hieu,et al.  Parallel and cyclic hybrid subgradient extragradient methods for variational inequalities , 2016, Afrika Matematika.

[9]  G. Stampacchia,et al.  On some non-linear elliptic differential-functional equations , 1966 .

[10]  Yeong-Cheng Liou,et al.  Weak and strong convergence of Krasnoselski–Mann iteration for hierarchical fixed point problems , 2008 .

[11]  Yair Censor,et al.  Strong convergence of subgradient extragradient methods for the variational inequality problem in Hilbert space , 2011, Optim. Methods Softw..

[12]  Heinz H. Bauschke,et al.  On Projection Algorithms for Solving Convex Feasibility Problems , 1996, SIAM Rev..

[13]  Hong-Kun Xu,et al.  Strong convergence of the CQ method for fixed point iteration processes , 2006 .

[14]  Patrick L. Combettes,et al.  On the effectiveness of projection methods for convex feasibility problems with linear inequality constraints , 2009, Computational Optimization and Applications.