Your search keyword '"generalized viscosity implicit rule"' showing total 5 results

1. Strong Convergence of a New Generalized Viscosity Implicit Rule and Some Applications in Hilbert Space

Author

Mihai Postolache, Ashish Nandal, and Renu Chugh

Subjects

generalized viscosity implicit rule, zero point, fixed point, system of generalized equilibrium problems, constrained multiple-set split convex feasibility problem, monotone inclusion problem, minimization problem, Mathematics, QA1-939

Abstract

In this paper, based on the very recent work by Nandal et al. (Nandal, A.; Chugh, R.; Postolache, M. Iteration process for fixed point problems and zeros of maximal monotone operators. Symmetry 2019, 11, 655.), we propose a new generalized viscosity implicit rule for finding a common element of the fixed point sets of a finite family of nonexpansive mappings and the sets of zeros of maximal monotone operators. Utilizing the main result, we first propose and investigate a new general system of generalized equilibrium problems, which includes several equilibrium and variational inequality problems as special cases, and then we derive an implicit iterative method to solve constrained multiple-set split convex feasibility problem. We further combine forward-backward splitting method and generalized viscosity implicit rule for solving monotone inclusion problem. Moreover, we apply the main result to solve convex minimization problem.

Published

2019

2. Generalized Viscosity Implicit Iterative Process for Asymptotically Non-Expansive Mappings in Banach Spaces

Author

Chanjuan Pan and Yuanheng Wang

Subjects

fixed point, variational inequality, generalized viscosity implicit rule, asymptotically nonexpansive mapping, Banach spaces, Mathematics, QA1-939

Abstract

In this paper, we propose a generalized viscosity implicit iterative method for asymptotically non-expansive mappings in Banach spaces. The strong convergence theorem of this algorithm is proved, which solves the variational inequality problem. Moreover, we provide some applications to zero-point problems and equilibrium problems. Further, a numerical example is given to illustrate our convergence analysis. The results generalize and improve corresponding results in the literature.

Published

2019

3. Strong Convergence of a New Generalized Viscosity Implicit Rule and Some Applications in Hilbert Space

Author

Renu Chugh, Mihai Postolache, and Ashish Nandal

Subjects

system of generalized equilibrium problems, Iterative method, General Mathematics, 0211 other engineering and technologies, minimization problem, 02 engineering and technology, Fixed point, 01 natural sciences, symbols.namesake, Convergence (routing), Computer Science (miscellaneous), Applied mathematics, 0101 mathematics, Engineering (miscellaneous), Mathematics, monotone inclusion problem, 021103 operations research, lcsh:Mathematics, Regular polygon, Hilbert space, lcsh:QA1-939, zero point, 010101 applied mathematics, Monotone polygon, fixed point, Convex optimization, Variational inequality, symbols, generalized viscosity implicit rule, constrained multiple-set split convex feasibility problem

Abstract

In this paper, based on the very recent work by Nandal et al. (Nandal, A., Chugh, R., Postolache, M. Iteration process for fixed point problems and zeros of maximal monotone operators. Symmetry 2019, 11, 655.), we propose a new generalized viscosity implicit rule for finding a common element of the fixed point sets of a finite family of nonexpansive mappings and the sets of zeros of maximal monotone operators. Utilizing the main result, we first propose and investigate a new general system of generalized equilibrium problems, which includes several equilibrium and variational inequality problems as special cases, and then we derive an implicit iterative method to solve constrained multiple-set split convex feasibility problem. We further combine forward&ndash, backward splitting method and generalized viscosity implicit rule for solving monotone inclusion problem. Moreover, we apply the main result to solve convex minimization problem.

Published

2019

4. Strong Convergence of a New Generalized Viscosity Implicit Rule and Some Applications in Hilbert Space.

Author

Postolache, Mihai, Nandal, Ashish, and Chugh, Renu

Subjects

*HILBERT space, *VARIATIONAL inequalities (Mathematics), *NONEXPANSIVE mappings, *VISCOSITY, *MONOTONE operators, *POINT set theory, *POINT processes

Abstract

In this paper, based on the very recent work by Nandal et al. (Nandal, A.; Chugh, R.; Postolache, M. Iteration process for fixed point problems and zeros of maximal monotone operators. Symmetry2019, 11, 655.), we propose a new generalized viscosity implicit rule for finding a common element of the fixed point sets of a finite family of nonexpansive mappings and the sets of zeros of maximal monotone operators. Utilizing the main result, we first propose and investigate a new general system of generalized equilibrium problems, which includes several equilibrium and variational inequality problems as special cases, and then we derive an implicit iterative method to solve constrained multiple-set split convex feasibility problem. We further combine forward-backward splitting method and generalized viscosity implicit rule for solving monotone inclusion problem. Moreover, we apply the main result to solve convex minimization problem. [ABSTRACT FROM AUTHOR]

Published

2019

5. Generalized Viscosity Implicit Iterative Process for Asymptotically Non-Expansive Mappings in Banach Spaces.

Author

Pan, Chanjuan and Wang, Yuanheng

Subjects

*BANACH spaces, *VARIATIONAL inequalities (Mathematics), *VISCOSITY, *NONEXPANSIVE mappings

Abstract

In this paper, we propose a generalized viscosity implicit iterative method for asymptotically non-expansive mappings in Banach spaces. The strong convergence theorem of this algorithm is proved, which solves the variational inequality problem. Moreover, we provide some applications to zero-point problems and equilibrium problems. Further, a numerical example is given to illustrate our convergence analysis. The results generalize and improve corresponding results in the literature. [ABSTRACT FROM AUTHOR]

Published

2019