Journal of applied mathematics & computing, ISSN 1865-2085, 2016, Volume 53, Issue 1-2, pp. 531 - 554

... -strictly pseudocontractive mappings $$\left\{ S_j\right\} _{j=1}^M$$ S j j = 1 M in Hilbert spaces...

Computational Mathematics and Numerical Analysis | Hybrid method | Equilibrium problem | Mathematics of Computing | Appl.Mathematics/Computational Methods of Engineering | 47H09 | Mathematics | Theory of Computation | Strictly pseudocontractive mapping | Parallel computation | 65Y05 | 91B50 | MATHEMATICS | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | Strictly pseudocontractive apping | CONVERGENCE | FIXED-POINTS | Studies | Parallel processing | Mapping | Mathematical analysis | Equilibrium | Asymptotic methods | Theorems | Fixed points (mathematics) | Asymptotic properties | Equilibrium methods | Hilbert space | Mathematical models | Mathematics - Optimization and Control

Computational Mathematics and Numerical Analysis | Hybrid method | Equilibrium problem | Mathematics of Computing | Appl.Mathematics/Computational Methods of Engineering | 47H09 | Mathematics | Theory of Computation | Strictly pseudocontractive mapping | Parallel computation | 65Y05 | 91B50 | MATHEMATICS | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | Strictly pseudocontractive apping | CONVERGENCE | FIXED-POINTS | Studies | Parallel processing | Mapping | Mathematical analysis | Equilibrium | Asymptotic methods | Theorems | Fixed points (mathematics) | Asymptotic properties | Equilibrium methods | Hilbert space | Mathematical models | Mathematics - Optimization and Control

Journal Article

数学物理学报：B辑英文版, ISSN 0252-9602, 2011, Volume 31, Issue 5, pp. 2041 - 2057

... of strictly pseudocontractive mappings.

广义 | 设置 | 平衡问题 | 严格伪压缩映射 | 强收敛 | 严格伪压缩映象 | 迭代序列 | strictly pseudocontractive mapping | inverse-strongly monotone mapping | equilibrium problem | 47H09 | nonexpansive mapping | 47H05 | 47J25 | Inverse-strongly monotone mapping | Strictly pseudocontractive mapping | Equilibrium problem | Nonexpansive mapping | COMMON SOLUTIONS | NONEXPANSIVE-MAPPINGS | STRONG-CONVERGENCE THEOREMS | ITERATIVE ALGORITHMS | MATHEMATICS | SCHEME | PSEUDO-CONTRACTIONS | VISCOSITY APPROXIMATION METHODS | FIXED-POINT PROBLEMS | Iterative methods | Mathematical analysis | Mapping

广义 | 设置 | 平衡问题 | 严格伪压缩映射 | 强收敛 | 严格伪压缩映象 | 迭代序列 | strictly pseudocontractive mapping | inverse-strongly monotone mapping | equilibrium problem | 47H09 | nonexpansive mapping | 47H05 | 47J25 | Inverse-strongly monotone mapping | Strictly pseudocontractive mapping | Equilibrium problem | Nonexpansive mapping | COMMON SOLUTIONS | NONEXPANSIVE-MAPPINGS | STRONG-CONVERGENCE THEOREMS | ITERATIVE ALGORITHMS | MATHEMATICS | SCHEME | PSEUDO-CONTRACTIONS | VISCOSITY APPROXIMATION METHODS | FIXED-POINT PROBLEMS | Iterative methods | Mathematical analysis | Mapping

Journal Article

Journal of Global Optimization, ISSN 0925-5001, 4/2011, Volume 49, Issue 4, pp. 679 - 693

... inequalities and in the fixed point set of strictly pseudocontractive mappings. It is proved that the iterative sequence generated in the purposed extragradient-type...

Optimization | Nonexpansive mapping | Economics / Management Science | Equilibrium problem | Variational inequality | Operations Research/Decision Theory | Inverse-strongly monotone mapping | 47H09 | Strictly pseudocontractive mapping | Computer Science, general | 47H05 | 47J25 | Real Functions | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | WEAK-CONVERGENCE THEOREMS | COUNTABLE FAMILY | PSEUDO-CONTRACTIONS | FIXED-POINT PROBLEMS | Studies | Mapping | Equilibrium

Optimization | Nonexpansive mapping | Economics / Management Science | Equilibrium problem | Variational inequality | Operations Research/Decision Theory | Inverse-strongly monotone mapping | 47H09 | Strictly pseudocontractive mapping | Computer Science, general | 47H05 | 47J25 | Real Functions | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | WEAK-CONVERGENCE THEOREMS | COUNTABLE FAMILY | PSEUDO-CONTRACTIONS | FIXED-POINT PROBLEMS | Studies | Mapping | Equilibrium

Journal Article

4.
Full Text
Iterative methods for mixed equilibrium problems and strictly pseudocontractive mappings

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2012, Volume 2012, Issue 1, pp. 1 - 19

...-strictly pseudocontractive non-self mapping in Hilbert spaces. We establish results of the strong convergence of the sequences generated by the proposed schemes to a common point of two sets, which is a solution of a certain variational inequality...

fixed points | Mathematical and Computational Biology | nonexpansive mapping | Mathematics | variational inequality | Topology | mixed equilibrium problem | k -strictly pseudocontractive mapping | Analysis | Mathematics, general | Applications of Mathematics | Differential Geometry | ρ -Lipschitzian and η -strongly monotone operator | Fixed points | Mixed equilibrium problem | K-strictly pseudocontractive mapping | Variational inequality | ρ-Lipschitzian and η-strongly monotone operator | Nonexpansive mapping | MATHEMATICS | rho-Lipschitzian and eta-strongly monotone operator | THEOREMS | k-strictly pseudocontractive mapping | PSEUDO-CONTRACTIVE MAPPINGS | FIXED-POINTS | STRONG-CONVERGENCE | Fixed point theory | Hilbert space | Research | Iterative methods (Mathematics) | Mappings (Mathematics) | Mapping | Iterative methods | Inequalities | Convergence

fixed points | Mathematical and Computational Biology | nonexpansive mapping | Mathematics | variational inequality | Topology | mixed equilibrium problem | k -strictly pseudocontractive mapping | Analysis | Mathematics, general | Applications of Mathematics | Differential Geometry | ρ -Lipschitzian and η -strongly monotone operator | Fixed points | Mixed equilibrium problem | K-strictly pseudocontractive mapping | Variational inequality | ρ-Lipschitzian and η-strongly monotone operator | Nonexpansive mapping | MATHEMATICS | rho-Lipschitzian and eta-strongly monotone operator | THEOREMS | k-strictly pseudocontractive mapping | PSEUDO-CONTRACTIVE MAPPINGS | FIXED-POINTS | STRONG-CONVERGENCE | Fixed point theory | Hilbert space | Research | Iterative methods (Mathematics) | Mappings (Mathematics) | Mapping | Iterative methods | Inequalities | Convergence

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2014, Volume 2014, Issue 1, pp. 1 - 16

... strictly pseudocontractive mappings and common solutions to a system of equilibrium problems in reflexive Banach space...

Mathematical and Computational Biology | fixed point | Analysis | quasi-Bregman strictly pseudocontractive map | Mathematics, general | Mathematics | Applications of Mathematics | Topology | Differential Geometry | Bregman distance | MATHEMATICS | NONEXPANSIVE-MAPPINGS | CONVEXITY | ITERATIVE METHODS | FIXED-POINTS | Fixed point theory | Banach spaces | Iterative methods (Mathematics) | Theorems | Mapping | Banach space | Mathematical analysis | Convergence

Mathematical and Computational Biology | fixed point | Analysis | quasi-Bregman strictly pseudocontractive map | Mathematics, general | Mathematics | Applications of Mathematics | Topology | Differential Geometry | Bregman distance | MATHEMATICS | NONEXPANSIVE-MAPPINGS | CONVEXITY | ITERATIVE METHODS | FIXED-POINTS | Fixed point theory | Banach spaces | Iterative methods (Mathematics) | Theorems | Mapping | Banach space | Mathematical analysis | Convergence

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2014, Volume 2014, Issue 1, pp. 1 - 11

In this article, a mean iterative algorithm is investigated for finding a common element in the solution set of generalized equilibrium problems and in the fixed point set of strictly pseudocontractive mappings...

strictly pseudocontractive mapping | inverse-strongly monotone mapping | Mathematical and Computational Biology | Analysis | equilibrium problem | Mathematics, general | nonexpansive mapping | Mathematics | variational inequality | Applications of Mathematics | Topology | Differential Geometry | MATHEMATICS | WEAK-CONVERGENCE | ALGORITHM | PSEUDO-CONTRACTIONS | STRONG-CONVERGENCE THEOREMS | FIXED-POINTS | Fixed point theory | Usage | Hilbert space | Distributions, Theory of (Functional analysis) | Contraction operators | Iterative algorithms | Mapping | Convergence

strictly pseudocontractive mapping | inverse-strongly monotone mapping | Mathematical and Computational Biology | Analysis | equilibrium problem | Mathematics, general | nonexpansive mapping | Mathematics | variational inequality | Applications of Mathematics | Topology | Differential Geometry | MATHEMATICS | WEAK-CONVERGENCE | ALGORITHM | PSEUDO-CONTRACTIONS | STRONG-CONVERGENCE THEOREMS | FIXED-POINTS | Fixed point theory | Usage | Hilbert space | Distributions, Theory of (Functional analysis) | Contraction operators | Iterative algorithms | Mapping | Convergence

Journal Article

Journal of Inequalities and Applications, ISSN 1025-5834, 12/2013, Volume 2013, Issue 1, pp. 1 - 10

In this paper, a parallel iterative algorithm with mixed errors is investigated. Strong and weak convergence theorems of common fixed points of a finite family of strictly pseudocontractive mappings are established in a real Banach space...

strictly pseudocontractive mapping | fixed point | Analysis | Mathematics, general | Mathematics | Applications of Mathematics | pseudocontractive mapping | implicit iterative algorithm | Implicit iterative algorithm | Strictly pseudocontractive mapping | Pseudocontractive mapping | Fixed point | MATHEMATICS, APPLIED | APPROXIMATION | FINITE FAMILY | MATHEMATICS | COMMON FIXED-POINTS | CONVERGENCE THEOREMS | WEAK-CONVERGENCE | PSEUDO-CONTRACTIONS | EQUILIBRIUM PROBLEMS | Error analysis | Mathematical analysis | Classification | Inequalities | Iterative algorithms | Mapping | Banach space | Convergence

strictly pseudocontractive mapping | fixed point | Analysis | Mathematics, general | Mathematics | Applications of Mathematics | pseudocontractive mapping | implicit iterative algorithm | Implicit iterative algorithm | Strictly pseudocontractive mapping | Pseudocontractive mapping | Fixed point | MATHEMATICS, APPLIED | APPROXIMATION | FINITE FAMILY | MATHEMATICS | COMMON FIXED-POINTS | CONVERGENCE THEOREMS | WEAK-CONVERGENCE | PSEUDO-CONTRACTIONS | EQUILIBRIUM PROBLEMS | Error analysis | Mathematical analysis | Classification | Inequalities | Iterative algorithms | Mapping | Banach space | Convergence

Journal Article

Journal of Mathematical Analysis and Applications, ISSN 0022-247X, 04/2001, Volume 256, Issue 2, pp. 431 - 445

<∞) and K a nonempty closed convex subset of E. Let T:K→K be a strictly pseudocontractive mapping in the sense of F. E. Browder and W. V. Petryshyn (1967, J. Math. Anal. Appl.20, 197–228). It is proved that (I−T...

Ishikawa iteration | Mann iteration | fixed points | strictly pseudocontractive maps | Fixed points | Strictly pseudocontractive maps | MATHEMATICS | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | INEQUALITIES | BANACH-SPACES | FIXED-POINTS

Ishikawa iteration | Mann iteration | fixed points | strictly pseudocontractive maps | Fixed points | Strictly pseudocontractive maps | MATHEMATICS | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | INEQUALITIES | BANACH-SPACES | FIXED-POINTS

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2011, Volume 2011, Issue 1, pp. 1 - 11

... → K be an asymptotically κ-strictly pseudocontractive mapping with a nonempty fixed point set. We prove that (I - T...

the modified Mann's algorithm | fixed points | Mathematical and Computational Biology | Analysis | asymptotically κ -strictly pseudocontractive mappings | Mathematics, general | Mathematics | Applications of Mathematics | Topology | demiclosedness principle | Differential Geometry | Demiclosedness principle | Fixed points | Asymptotically κ-strictly pseudocontractive mappings | The modified Mann's algorithm | WEAK | MATHEMATICS | MATHEMATICS, APPLIED | asymptotically kappa-strictly pseudocontractive mappings | NONEXPANSIVE-MAPPINGS | THEOREMS | CONSTRUCTION | FIXED-POINTS | CONTRACTIONS

the modified Mann's algorithm | fixed points | Mathematical and Computational Biology | Analysis | asymptotically κ -strictly pseudocontractive mappings | Mathematics, general | Mathematics | Applications of Mathematics | Topology | demiclosedness principle | Differential Geometry | Demiclosedness principle | Fixed points | Asymptotically κ-strictly pseudocontractive mappings | The modified Mann's algorithm | WEAK | MATHEMATICS | MATHEMATICS, APPLIED | asymptotically kappa-strictly pseudocontractive mappings | NONEXPANSIVE-MAPPINGS | THEOREMS | CONSTRUCTION | FIXED-POINTS | CONTRACTIONS

Journal Article

Journal of Computational and Applied Mathematics, ISSN 0377-0427, 2009, Volume 233, Issue 4, pp. 1108 - 1116

To approximate a common fixed point of a countable family of continuous pseudocontractive mappings, we introduce an implicit iteration sequence...

Implicit iteration | Convergence theorem | Continuous pseudocontractive mapping | Strictly pseudocontractive mapping | COMMON FIXED-POINTS | NONLINEAR MAPPINGS | MATHEMATICS, APPLIED | BANACH-SPACES | FINITE FAMILY | ASYMPTOTICALLY NONEXPANSIVE-MAPPINGS | LIPSCHITZ PSEUDOCONTRACTIONS

Implicit iteration | Convergence theorem | Continuous pseudocontractive mapping | Strictly pseudocontractive mapping | COMMON FIXED-POINTS | NONLINEAR MAPPINGS | MATHEMATICS, APPLIED | BANACH-SPACES | FINITE FAMILY | ASYMPTOTICALLY NONEXPANSIVE-MAPPINGS | LIPSCHITZ PSEUDOCONTRACTIONS

Journal Article

11.
Full Text
Strong convergence of a CQ method for k-strictly asymptotically pseudocontractive mappings

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2012, Volume 2012, Issue 1, pp. 1 - 7

..., ), and C be a nonempty bounded closed convex subset of E. Let be a k-strictly asymptotically pseudocontractive map with a nonempty fixed point set...

Mathematical and Computational Biology | Analysis | CQ method | Mathematics, general | Mathematics | Applications of Mathematics | Topology | Differential Geometry | strong convergence | k -strictly asymptotically pseudocontractive mapping | Strong convergence | K-strictly asymptotically pseudocontractive mapping | METRIC PROJECTIONS | MATHEMATICS | HILBERT-SPACES | SEMIGROUPS | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | BANACH-SPACES | THEOREMS | k-strictly asymptotically pseudocontractive mapping | APPROXIMATING FIXED-POINTS | Fixed point theory | Usage | Convergence (Mathematics) | Banach spaces | Contraction operators | Construction | Algorithms | Approximation | Asymptotic properties | Mapping | Banach space | Convergence

Mathematical and Computational Biology | Analysis | CQ method | Mathematics, general | Mathematics | Applications of Mathematics | Topology | Differential Geometry | strong convergence | k -strictly asymptotically pseudocontractive mapping | Strong convergence | K-strictly asymptotically pseudocontractive mapping | METRIC PROJECTIONS | MATHEMATICS | HILBERT-SPACES | SEMIGROUPS | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | BANACH-SPACES | THEOREMS | k-strictly asymptotically pseudocontractive mapping | APPROXIMATING FIXED-POINTS | Fixed point theory | Usage | Convergence (Mathematics) | Banach spaces | Contraction operators | Construction | Algorithms | Approximation | Asymptotic properties | Mapping | Banach space | Convergence

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2012, Volume 2012, Issue 1, pp. 1 - 12

.... We obtain a weak convergence theorem of the explicit averaging cyclic algorithm for a finite family of asymptotically strictly pseudocontractive mappings of K under suitable control conditions...

asymptotically strictly pseudocontractive mappings | fixed points | Mathematical and Computational Biology | Analysis | q -uniformly smooth Banach spaces | Mathematics, general | Mathematics | weak and strong convergence | Applications of Mathematics | Topology | Differential Geometry | explicit averaging cyclic algorithm | Weak and strong convergence | Fixed points | Asymptotically strictly pseudocontractive mappings | Explicit averaging cyclic algorithm | q-uniformly smooth Banach spaces | MATHEMATICS | HILBERT-SPACES | MATHEMATICS, APPLIED | PSEUDO-CONTRACTIONS | Usage | Fixed point theory | Convergence (Mathematics) | Banach spaces | Research | Mappings (Mathematics) | Theorems | Fixed points (mathematics) | Algorithms | Asymptotic properties | Mathematical analysis | Mapping | Banach space | Convergence

asymptotically strictly pseudocontractive mappings | fixed points | Mathematical and Computational Biology | Analysis | q -uniformly smooth Banach spaces | Mathematics, general | Mathematics | weak and strong convergence | Applications of Mathematics | Topology | Differential Geometry | explicit averaging cyclic algorithm | Weak and strong convergence | Fixed points | Asymptotically strictly pseudocontractive mappings | Explicit averaging cyclic algorithm | q-uniformly smooth Banach spaces | MATHEMATICS | HILBERT-SPACES | MATHEMATICS, APPLIED | PSEUDO-CONTRACTIONS | Usage | Fixed point theory | Convergence (Mathematics) | Banach spaces | Research | Mappings (Mathematics) | Theorems | Fixed points (mathematics) | Algorithms | Asymptotic properties | Mathematical analysis | Mapping | Banach space | Convergence

Journal Article

数学学报：英文版, ISSN 1439-8516, 2011, Volume 27, Issue 7, pp. 1367 - 1378

The purpose of this paper is by using CSQ method to study the strong convergence problem of iterative sequences for a pair of strictly asymptotically pseudocontractive mappings to approximate a common...

Hilbert空间 | 严格伪压缩映射 | 任意Banach空间 | 非扩张半群 | 渐近伪压缩映象 | 迭代序列 | 强收敛定理 | 公共不动点 | 47H02 | Strictly asymptotically pseudocontractive mapping | CSQ methods | common fixed point | Mathematics, general | Mathematics | 60H25 | strictly pseudocontractive mapping of Browder-Petryshyn type | MATHEMATICS | SEMIGROUPS | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | PSEUDO-CONTRACTIONS | Studies | Mapping | Hilbert space | Mathematical analysis | Asymptotic methods | Theorems | Asymptotic properties | Nonlinearity | Iterative methods | Convergence

Hilbert空间 | 严格伪压缩映射 | 任意Banach空间 | 非扩张半群 | 渐近伪压缩映象 | 迭代序列 | 强收敛定理 | 公共不动点 | 47H02 | Strictly asymptotically pseudocontractive mapping | CSQ methods | common fixed point | Mathematics, general | Mathematics | 60H25 | strictly pseudocontractive mapping of Browder-Petryshyn type | MATHEMATICS | SEMIGROUPS | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | PSEUDO-CONTRACTIONS | Studies | Mapping | Hilbert space | Mathematical analysis | Asymptotic methods | Theorems | Asymptotic properties | Nonlinearity | Iterative methods | Convergence

Journal Article

Applied Mathematics and Computation, ISSN 0096-3003, 2008, Volume 197, Issue 2, pp. 548 - 558

In this paper, we introduce a new iterative scheme for finding the common element of the set of fixed points of a nonexpansive mapping, the set of solutions of an equilibrium problem and the set...

Strictly pseudocontractive mapping | Equilibrium problem | Variational inequality | α-Inverse-strongly monotone mapping | Nonexpansive mapping | Fixed point | MATHEMATICS, APPLIED | strictly pseudocontractive mapping | INEQUALITIES | equilibrium problem | nonexpansive mapping | alpha-inverse-strongly monotone mapping | variational inequality | WEAK | fixed point | THEOREMS | EXTRAGRADIENT METHOD | VISCOSITY APPROXIMATION METHODS | STRONG-CONVERGENCE

Strictly pseudocontractive mapping | Equilibrium problem | Variational inequality | α-Inverse-strongly monotone mapping | Nonexpansive mapping | Fixed point | MATHEMATICS, APPLIED | strictly pseudocontractive mapping | INEQUALITIES | equilibrium problem | nonexpansive mapping | alpha-inverse-strongly monotone mapping | variational inequality | WEAK | fixed point | THEOREMS | EXTRAGRADIENT METHOD | VISCOSITY APPROXIMATION METHODS | STRONG-CONVERGENCE

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2012, Volume 2012, Issue 1, pp. 1 - 26

... of asymptotically strictly pseudocontractive mappings in the intermediate sense, the set of solutions of the cocoercive quasivariational inclusions problems, and the set of solutions of the mixed equilibrium problems in Hilbert spaces...

Mathematical and Computational Biology | asymptotically strictly pseudocontractive in the intermediate sense | Mathematics | Topology | variational inequalities | strong convergence | fixed point | Analysis | Mathematics, general | Hilbert space | Applications of Mathematics | mixed equilibrium | Differential Geometry | Asymptotically strictly pseudocontractive in the intermediate sense | Strong convergence | Mixed equilibrium | Fixed point | Variational inequalities | COMMON SOLUTIONS | NONEXPANSIVE-MAPPINGS | STRONG-CONVERGENCE THEOREMS | WEAK | MATHEMATICS | GENERALIZED EQUILIBRIUM | SYSTEMS | PSEUDO-CONTRACTIONS | Fixed point theory | Usage | Contraction operators | Theorems | Fixed points (mathematics) | Approximation | Asymptotic properties | Projection | Mapping | Inclusions | Convergence

Mathematical and Computational Biology | asymptotically strictly pseudocontractive in the intermediate sense | Mathematics | Topology | variational inequalities | strong convergence | fixed point | Analysis | Mathematics, general | Hilbert space | Applications of Mathematics | mixed equilibrium | Differential Geometry | Asymptotically strictly pseudocontractive in the intermediate sense | Strong convergence | Mixed equilibrium | Fixed point | Variational inequalities | COMMON SOLUTIONS | NONEXPANSIVE-MAPPINGS | STRONG-CONVERGENCE THEOREMS | WEAK | MATHEMATICS | GENERALIZED EQUILIBRIUM | SYSTEMS | PSEUDO-CONTRACTIONS | Fixed point theory | Usage | Contraction operators | Theorems | Fixed points (mathematics) | Approximation | Asymptotic properties | Projection | Mapping | Inclusions | Convergence

Journal Article

Computers and Mathematics with Applications, ISSN 0898-1221, 2010, Volume 59, Issue 11, pp. 3472 - 3480

... of a strictly pseudocontractive mapping in a real Hilbert space. Furthermore, we prove that the studied iterative method strongly converges to a common element of the set...

Strictly pseudocontractive mapping | Monotone mapping | Variational inequality | Fixed point | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | THEOREMS | STRONG-CONVERGENCE | Algorithms | Mathematical analysis | Inequalities | Hilbert space | Mapping | Mathematical models | Iterative methods

Strictly pseudocontractive mapping | Monotone mapping | Variational inequality | Fixed point | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | THEOREMS | STRONG-CONVERGENCE | Algorithms | Mathematical analysis | Inequalities | Hilbert space | Mapping | Mathematical models | Iterative methods

Journal Article

Journal of Mathematical Analysis and Applications, ISSN 0022-247X, 2006, Volume 320, Issue 2, pp. 882 - 891

Let E be a real Banach space and let K be a nonempty closed convex subset of E. Let { T i } i = 1 N be N strictly pseudocontractive self-maps of K such that F...

Implicit iteration process | Strictly pseudocontractive maps | Common fixed points | MATHEMATICS | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | CONVERGENCE | common fixed points | HILBERT-SPACE | strictly pseudocontractive maps | implicit iteration process

Implicit iteration process | Strictly pseudocontractive maps | Common fixed points | MATHEMATICS | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | CONVERGENCE | common fixed points | HILBERT-SPACE | strictly pseudocontractive maps | implicit iteration process

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2013, Volume 2013, Issue 1, pp. 1 - 14

We prove weak and strong convergence theorems and the demiclosedness property for classes of multivalued mappings T such that...

pseudocontractive-type mappings | nonexpansive-type mappings | Mathematical and Computational Biology | Analysis | Mathematics, general | Hilbert spaces | Mathematics | Applications of Mathematics | Topology | k -strictly pseudocontractive-type mappings | Differential Geometry | proximinal sets | k-strictly pseudocontractive-type mappings | NONEXPANSIVE-MAPPINGS | WEAK | MATHEMATICS | ISHIKAWA ITERATION | CONSTRUCTION | MANN | CONVERGENCE | FIXED-POINTS | Fixed point theory | Usage | Hilbert space | Contraction operators

pseudocontractive-type mappings | nonexpansive-type mappings | Mathematical and Computational Biology | Analysis | Mathematics, general | Hilbert spaces | Mathematics | Applications of Mathematics | Topology | k -strictly pseudocontractive-type mappings | Differential Geometry | proximinal sets | k-strictly pseudocontractive-type mappings | NONEXPANSIVE-MAPPINGS | WEAK | MATHEMATICS | ISHIKAWA ITERATION | CONSTRUCTION | MANN | CONVERGENCE | FIXED-POINTS | Fixed point theory | Usage | Hilbert space | Contraction operators

Journal Article

Proceedings of the Estonian Academy of Sciences, ISSN 1736-6046, 2011, Volume 60, Issue 1, pp. 12 - 24

In this paper, we consider a general iterative process for a generalized equilibrium problem and a strictly pseudocontractive mapping...

WEAK | HILBERT-SPACES | strictly pseudocontractive mapping | NONEXPANSIVE-MAPPINGS | inverse-strongly monotone mapping | MULTIDISCIPLINARY SCIENCES | equilibrium problem | ITERATIVE METHOD | nonexpansive mapping | PSEUDO-CONTRACTIONS | FIXED-POINT PROBLEMS

WEAK | HILBERT-SPACES | strictly pseudocontractive mapping | NONEXPANSIVE-MAPPINGS | inverse-strongly monotone mapping | MULTIDISCIPLINARY SCIENCES | equilibrium problem | ITERATIVE METHOD | nonexpansive mapping | PSEUDO-CONTRACTIONS | FIXED-POINT PROBLEMS

Journal Article

Numerical functional analysis and optimization, ISSN 1532-2467, 2019, Volume 40, Issue 10, pp. 1194 - 1214

Let K be a nonempty closed convex subset of a real Hilbert space H 1 . Let be N multivalued strictly pseudocontractive mappings...

split feasibility problem | fixed point | pseudomonotone equilibrium problem | Multivalued strictly pseudocontractive | WEAK | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | MANN | ALGORITHMS | VISCOSITY APPROXIMATION METHODS | FIXED-POINT PROBLEMS | ITERATIVE SCHEME | Feasibility | Hilbert space | Iterative methods | Convergence

split feasibility problem | fixed point | pseudomonotone equilibrium problem | Multivalued strictly pseudocontractive | WEAK | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | MANN | ALGORITHMS | VISCOSITY APPROXIMATION METHODS | FIXED-POINT PROBLEMS | ITERATIVE SCHEME | Feasibility | Hilbert space | Iterative methods | Convergence

Journal Article

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