Fixed Point Theory and Applications, ISSN 1687-1820, 12/2013, Volume 2013, Issue 1, pp. 1 - 11

We consider the problem of the convergence of the three-steps iterative sequences for asymptotically nonexpansive mappings in a real Banach space. Under...

uniformly Gâteaux differentiable norm | fixed points | Mathematical and Computational Biology | Analysis | Mathematics, general | Mathematics | Applications of Mathematics | Topology | three-steps iteration | Differential Geometry | asymptotically nonexpansive mapping | Fixed points | Uniformly gâteaux differentiable norm | Three-steps iteration | Asymptotically nonexpansive mapping | MATHEMATICS | uniformly Gateaux differentiable norm | Fixed point theory | Usage | Convergence (Mathematics) | Banach spaces | Contraction operators

uniformly Gâteaux differentiable norm | fixed points | Mathematical and Computational Biology | Analysis | Mathematics, general | Mathematics | Applications of Mathematics | Topology | three-steps iteration | Differential Geometry | asymptotically nonexpansive mapping | Fixed points | Uniformly gâteaux differentiable norm | Three-steps iteration | Asymptotically nonexpansive mapping | MATHEMATICS | uniformly Gateaux differentiable norm | Fixed point theory | Usage | Convergence (Mathematics) | Banach spaces | Contraction operators

Journal Article

Journal of Global Optimization, ISSN 0925-5001, 2/2013, Volume 55, Issue 2, pp. 417 - 436

Let E be a real reflexive strictly convex Banach space which has uniformly Gâteaux differentiable norm. Let $${\mathcal{S} = \{T(s): 0 \leq s < \infty\}}$$ be...

General iterative method | Uniformly Gâteaux differentiable norm | Optimization | Economics / Management Science | Reflexive Banach space | Nonexpansive semigroup | Operations Research/Decision Theory | 47H09 | Computer Science, general | 47H05 | 47J25 | 65J15 | Real Functions | Fixed point | HILBERT-SPACES | RETRACTIONS | MATHEMATICS, APPLIED | Uniformly Gateaux differentiable norm | COMMON FIXED-POINTS | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | THEOREMS | CONSTRUCTION | MAPPINGS | OPERATORS | VISCOSITY APPROXIMATION | CONTRACTION-SEMIGROUPS | STRONG-CONVERGENCE | Studies | Iterative methods | Banach spaces | Real numbers | Group theory | Inequalities | Norms | Nonlinearity | Banach space

General iterative method | Uniformly Gâteaux differentiable norm | Optimization | Economics / Management Science | Reflexive Banach space | Nonexpansive semigroup | Operations Research/Decision Theory | 47H09 | Computer Science, general | 47H05 | 47J25 | 65J15 | Real Functions | Fixed point | HILBERT-SPACES | RETRACTIONS | MATHEMATICS, APPLIED | Uniformly Gateaux differentiable norm | COMMON FIXED-POINTS | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | THEOREMS | CONSTRUCTION | MAPPINGS | OPERATORS | VISCOSITY APPROXIMATION | CONTRACTION-SEMIGROUPS | STRONG-CONVERGENCE | Studies | Iterative methods | Banach spaces | Real numbers | Group theory | Inequalities | Norms | Nonlinearity | Banach space

Journal Article

Journal of Inequalities and Applications, ISSN 1025-5834, 12/2013, Volume 2013, Issue 1, pp. 1 - 44

In this paper, we propose and analyze some iterative algorithms by hybrid viscosity approximation methods for solving a general system of variational...

general system of variational inequalities | uniformly Gâteaux differentiable norm | sunny nonexpansive retraction | fixed point | Analysis | hybrid viscosity approximation method | Mathematics, general | nonexpansive mapping | Mathematics | Applications of Mathematics | uniform convexity | Hybrid viscosity approximation method | General system of variational inequalities | Uniformly Gâteaux differentiable norm | Nonexpansive mapping | Fixed point | Sunny nonexpansive retraction | Uniform convexity | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | uniformly G teaux differentiable norm | APPROXIMATION | SEQUENCES | ITERATIVE METHOD | ACCRETIVE-OPERATORS | ALGORITHMS | MATHEMATICS | THEOREMS | WEAK-CONVERGENCE | EXTRAGRADIENT METHOD | SPLIT FEASIBILITY

general system of variational inequalities | uniformly Gâteaux differentiable norm | sunny nonexpansive retraction | fixed point | Analysis | hybrid viscosity approximation method | Mathematics, general | nonexpansive mapping | Mathematics | Applications of Mathematics | uniform convexity | Hybrid viscosity approximation method | General system of variational inequalities | Uniformly Gâteaux differentiable norm | Nonexpansive mapping | Fixed point | Sunny nonexpansive retraction | Uniform convexity | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | uniformly G teaux differentiable norm | APPROXIMATION | SEQUENCES | ITERATIVE METHOD | ACCRETIVE-OPERATORS | ALGORITHMS | MATHEMATICS | THEOREMS | WEAK-CONVERGENCE | EXTRAGRADIENT METHOD | SPLIT FEASIBILITY

Journal Article

Proceedings of the American Mathematical Society, ISSN 0002-9939, 03/2004, Volume 132, Issue 3, pp. 831 - 840

Let K be a nonempty closed convex subset of a real Banach space E and T be a Lipschitz pseudocontractive self-map of K with F(T):=\{x\in K:Tx=x\}\neq...

Integers | Mathematical theorems | Recursive functions | Lebesgue spaces | Hilbert spaces | Mathematical duality | Banach space | Fixed point property | Perceptron convergence procedure | Pseudocontractive maps | Normalized duality maps | Uniformly Gâteaux differentiable norm | MATHEMATICS | MATHEMATICS, APPLIED | NONLINEAR EQUATIONS | normalized duality maps | BANACH-SPACES | ITERATIVE SOLUTION | uniformly Gateaux differentiable norm | HILBERT-SPACE | PSEUDO-CONTRACTIVE MAPPINGS | pseudocontractive maps

Integers | Mathematical theorems | Recursive functions | Lebesgue spaces | Hilbert spaces | Mathematical duality | Banach space | Fixed point property | Perceptron convergence procedure | Pseudocontractive maps | Normalized duality maps | Uniformly Gâteaux differentiable norm | MATHEMATICS | MATHEMATICS, APPLIED | NONLINEAR EQUATIONS | normalized duality maps | BANACH-SPACES | ITERATIVE SOLUTION | uniformly Gateaux differentiable norm | HILBERT-SPACE | PSEUDO-CONTRACTIVE MAPPINGS | pseudocontractive maps

Journal Article

Computers and Mathematics with Applications, ISSN 0898-1221, 2007, Volume 53, Issue 9, pp. 1380 - 1389

Let E be a real strictly convex and reflexive Banach space with a uniformly Gâteaux differentiable norm and C be a nonempty closed convex subset of E ....

Strong convergence | An infinite countable family of nonexpansive mappings | Uniformly Gâteaux differentiable norm | Common fixed point | Viscosity approximation | MATHEMATICS, APPLIED | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | SEQUENCES | common fixed point | an infinite countable family of nonexpansive mappings | uniformly Gateaux differentiable norm | viscosity approximation | REFLEXIVE BANACH-SPACES | strong convergence | STRONG-CONVERGENCE | Fixed points (mathematics) | Approximation | Mathematical analysis | Norms | Mathematical models | Mapping | Gateaux | Banach space | Iterative methods | Inequalities

Strong convergence | An infinite countable family of nonexpansive mappings | Uniformly Gâteaux differentiable norm | Common fixed point | Viscosity approximation | MATHEMATICS, APPLIED | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | SEQUENCES | common fixed point | an infinite countable family of nonexpansive mappings | uniformly Gateaux differentiable norm | viscosity approximation | REFLEXIVE BANACH-SPACES | strong convergence | STRONG-CONVERGENCE | Fixed points (mathematics) | Approximation | Mathematical analysis | Norms | Mathematical models | Mapping | Gateaux | Banach space | Iterative methods | Inequalities

Journal Article

Journal of Mathematical Analysis and Applications, ISSN 0022-247X, 2006, Volume 324, Issue 2, pp. 1105 - 1114

We introduce a new class of uniformly R-subweakly commuting mappings and then using this class study the problem of approximation of common fixed points of...

Strong convergence | Banach space | Uniformly R-subweakly commuting mappings | Asymptotically S-nonexpansive mappings | Gâteaux differentiable norm | Gateaux differentiable norm | MATHEMATICS, APPLIED | ACCRETIVE-OPERATORS | asymptotically S-nonexpansive mappings | STRONG-CONVERGENCE THEOREMS | strong convergence | WEAK | MATHEMATICS | MAPS | BANACH-SPACES | uniformly R-subweakly commuting mappings | ASYMPTOTICALLY NONEXPANSIVE-MAPPINGS | Engineering schools | Management science

Strong convergence | Banach space | Uniformly R-subweakly commuting mappings | Asymptotically S-nonexpansive mappings | Gâteaux differentiable norm | Gateaux differentiable norm | MATHEMATICS, APPLIED | ACCRETIVE-OPERATORS | asymptotically S-nonexpansive mappings | STRONG-CONVERGENCE THEOREMS | strong convergence | WEAK | MATHEMATICS | MAPS | BANACH-SPACES | uniformly R-subweakly commuting mappings | ASYMPTOTICALLY NONEXPANSIVE-MAPPINGS | Engineering schools | Management science

Journal Article

Journal of Mathematical Analysis and Applications, ISSN 0022-247X, 2006, Volume 323, Issue 1, pp. 88 - 99

Let K be a nonempty closed convex subset of a real Banach space E and let T : K → K be a uniformly continuous pseudocontraction. Fix any u ∈ K . Let { x n } be...

f.p.p | Banach spaces | Uniformly Gâteaux differentiable norm | Pseudocontractions | Uniformly continuous maps | pseudocontractions | MATHEMATICS | MATHEMATICS, APPLIED | APPROXIMATION | uniformly continuous maps | MAPPINGS | uniformly Gateaux differentiable norm | FIXED-POINTS

f.p.p | Banach spaces | Uniformly Gâteaux differentiable norm | Pseudocontractions | Uniformly continuous maps | pseudocontractions | MATHEMATICS | MATHEMATICS, APPLIED | APPROXIMATION | uniformly continuous maps | MAPPINGS | uniformly Gateaux differentiable norm | FIXED-POINTS

Journal Article

Nonlinear Analysis, ISSN 0362-546X, 2008, Volume 69, Issue 4, pp. 1200 - 1207

A new iteration process is introduced and proved to converge strongly to a common fixed point for a finite family of generalized Lipschitz nonlinear mappings...

Accretive operators | Reflexive Banach space | Generalized Lipschitz mappings | Uniformly Gâteaux differentiable norm | Pseudo-contractive mappings | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | SEQUENCES | APPROXIMATION | reflexive Banach space | differentiable norm | MATHEMATICS | SEMIGROUPS | FIXED-POINT THEOREMS | CONVERGENCE THEOREMS | generalized Lipschitz mappings | pseudo-contractive mappings | accretive operators | uniformly gateaux | OPERATORS

Accretive operators | Reflexive Banach space | Generalized Lipschitz mappings | Uniformly Gâteaux differentiable norm | Pseudo-contractive mappings | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | SEQUENCES | APPROXIMATION | reflexive Banach space | differentiable norm | MATHEMATICS | SEMIGROUPS | FIXED-POINT THEOREMS | CONVERGENCE THEOREMS | generalized Lipschitz mappings | pseudo-contractive mappings | accretive operators | uniformly gateaux | OPERATORS

Journal Article

Operators and Matrices, ISSN 1846-3886, 06/2012, Volume 6, Issue 2, pp. 201 - 232

It is a classical fact, due to Day, that every separable Banach space admits an equivalent Gateaux smooth renorming. In fact, it admits an equivalent uniformly...

Radon-Nikodým property | Superreflexive spaces | Hilbertian spaces | Extreme points | Gâteaux differentiable norms | superreflexive spaces | DIFFERENTIABILITY | NORMS | DENTABILITY | Radon-Nikodym property | BUMP FUNCTIONS | Gateaux differentiable norms | CONVEX-FUNCTIONS | MATHEMATICS | KREIN-MILMAN PROPERTY | CONJUGATE | POINTS | extreme points | EQUIVALENT

Radon-Nikodým property | Superreflexive spaces | Hilbertian spaces | Extreme points | Gâteaux differentiable norms | superreflexive spaces | DIFFERENTIABILITY | NORMS | DENTABILITY | Radon-Nikodym property | BUMP FUNCTIONS | Gateaux differentiable norms | CONVEX-FUNCTIONS | MATHEMATICS | KREIN-MILMAN PROPERTY | CONJUGATE | POINTS | extreme points | EQUIVALENT

Journal Article

数学物理学报：B辑英文版, ISSN 0252-9602, 2014, Volume 34, Issue 2, pp. 409 - 423

Let K be a nonempty, closed and convex subset of a real reflexive Banach space E which has a uniformly Gateaux differentiable norm. Assume that every nonempty...

变分解 | 强伪压缩映射 | 自反Banach空间 | 变分不等式问题 | 逼近 | 不动点性质 | Gateaux可微 | 伪压缩映象 | uniformly Gâteaux differentiable norm | Pseudo-contractive mappings | 47H09 | reflexive Banach spaces | variational inequality | 47J05 | 47J25 | 47H06 | Reflexive Banach spaces | Uniformly Gâteaux differentiable norm | Variational inequality | INEQUALITIES | LIPSCHITZIAN PSEUDOCONTRACTIVE MAPPINGS | ACCRETIVE-OPERATORS | ITERATIVE SOLUTION | STRONG-CONVERGENCE THEOREMS | MATHEMATICS | NONLINEAR EQUATIONS | MAPS | MONOTONE | uniformly Gateaux differentiable norm | HILBERT-SPACE | Fixed points (mathematics) | Approximation | Mathematical analysis | Inequalities | Norms | Mapping | Banach space | Optimization | Convergence

变分解 | 强伪压缩映射 | 自反Banach空间 | 变分不等式问题 | 逼近 | 不动点性质 | Gateaux可微 | 伪压缩映象 | uniformly Gâteaux differentiable norm | Pseudo-contractive mappings | 47H09 | reflexive Banach spaces | variational inequality | 47J05 | 47J25 | 47H06 | Reflexive Banach spaces | Uniformly Gâteaux differentiable norm | Variational inequality | INEQUALITIES | LIPSCHITZIAN PSEUDOCONTRACTIVE MAPPINGS | ACCRETIVE-OPERATORS | ITERATIVE SOLUTION | STRONG-CONVERGENCE THEOREMS | MATHEMATICS | NONLINEAR EQUATIONS | MAPS | MONOTONE | uniformly Gateaux differentiable norm | HILBERT-SPACE | Fixed points (mathematics) | Approximation | Mathematical analysis | Inequalities | Norms | Mapping | Banach space | Optimization | Convergence

Journal Article

Nonlinear Analysis, ISSN 0362-546X, 2007, Volume 67, Issue 1, pp. 307 - 315

Let K be a nonempty closed convex subset of a real Banach space E . Let T : K → K be a generalized Lipschitz pseudo-contractive mapping such that F ( T ) ≔ { x...

f.p.p | Banach spaces | Uniformly Gâteaux differentiable norm | Pseudo-contractions | Uniformly continuous maps | MATHEMATICS, APPLIED | PSEUDOCONTRACTIVE MAPS | uniformly continuous maps | EQUATIONS | MATHEMATICS | pseudo-contractions | CONVERGENCE THEOREMS | BANACH-SPACES | uniformly Gateaux differentiable norm | OPERATORS | FIXED-POINTS

f.p.p | Banach spaces | Uniformly Gâteaux differentiable norm | Pseudo-contractions | Uniformly continuous maps | MATHEMATICS, APPLIED | PSEUDOCONTRACTIVE MAPS | uniformly continuous maps | EQUATIONS | MATHEMATICS | pseudo-contractions | CONVERGENCE THEOREMS | BANACH-SPACES | uniformly Gateaux differentiable norm | OPERATORS | FIXED-POINTS

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2011, Volume 2011, Issue 1, pp. 1 - 15

The purpose of this article is to study the fixed point and weak convergence problem for the new defined class of point-dependent λ-hybrid mappings relative to...

subdifferential | Mathematical and Computational Biology | fixed point | Analysis | Mathematics, general | Mathematics | Applications of Mathematics | Topology | Gâteaux differentiable | Differential Geometry | Bregman distance | Subdifferential | Fixed point

subdifferential | Mathematical and Computational Biology | fixed point | Analysis | Mathematics, general | Mathematics | Applications of Mathematics | Topology | Gâteaux differentiable | Differential Geometry | Bregman distance | Subdifferential | Fixed point

Journal Article

Bulletin of the Iranian Mathematical Society, ISSN 1018-6301, 07/2013, Volume 39, Issue 4, pp. 765 - 777

Journal Article

Nonlinear Analysis, ISSN 0362-546X, 2011, Volume 74, Issue 17, pp. 6012 - 6023

In this paper we deal with fixed point computational problems by strongly convergent methods involving strictly pseudocontractive mappings in smooth Banach...

[formula omitted]-iteration process | [formula omitted]-strictly pseudocontractive | Metric projection mapping | Uniformly Gâteaux differentiable norm | Strongly pseudocontractive | Uniformly Gteaux differentiable norm | S-iteration process | λ-strictly pseudocontractive | FEASIBILITY PROBLEMS | HILBERT-SPACES | MATHEMATICS, APPLIED | APPROXIMATION | ACCRETIVE-OPERATORS | VARIATIONAL-INEQUALITIES | MATHEMATICS | Uniformly Gateaux differentiable norm | RESOLVENTS | THEOREMS | lambda-strictly pseudocontractive | WEAKLY CONTRACTIVE MAPS | PSEUDO-CONTRACTIONS | FIXED-POINTS | Theorems | Mathematical analysis | Steepest descent method | Inequalities | Nonlinearity | Mapping | Banach space | Convergence

[formula omitted]-iteration process | [formula omitted]-strictly pseudocontractive | Metric projection mapping | Uniformly Gâteaux differentiable norm | Strongly pseudocontractive | Uniformly Gteaux differentiable norm | S-iteration process | λ-strictly pseudocontractive | FEASIBILITY PROBLEMS | HILBERT-SPACES | MATHEMATICS, APPLIED | APPROXIMATION | ACCRETIVE-OPERATORS | VARIATIONAL-INEQUALITIES | MATHEMATICS | Uniformly Gateaux differentiable norm | RESOLVENTS | THEOREMS | lambda-strictly pseudocontractive | WEAKLY CONTRACTIVE MAPS | PSEUDO-CONTRACTIONS | FIXED-POINTS | Theorems | Mathematical analysis | Steepest descent method | Inequalities | Nonlinearity | Mapping | Banach space | Convergence

Journal Article

Studia Scientiarum Mathematicarum Hungarica, ISSN 0081-6906, 03/2014, Volume 51, Issue 1, pp. 17 - 23

Applying certain convexity arguments we investigate the existence of a classical solution for a Dirichlet problem for which the Euler action functional is not...

Dirichlet Problem | coercivity | 58E30 | Fenchel-Young conjugate | Primary 34B15 | MATHEMATICS | Dirichlet problem | Convexity | Gateaux | Mathematical analysis | Coercive force

Dirichlet Problem | coercivity | 58E30 | Fenchel-Young conjugate | Primary 34B15 | MATHEMATICS | Dirichlet problem | Convexity | Gateaux | Mathematical analysis | Coercive force

Journal Article

ScienceAsia, ISSN 1513-1874, 06/2011, Volume 37, Issue 2, pp. 145 - 151

Using a new proof technique which is independent of the approximation fixed point of T (lim(n-infinity) parallel to x(n) - Tx(n)parallel to = 0) and the...

Teaux differentiable norm | Strong convergence | Uniformly convex | Uniformly gâ | NON-EXPANSIVE MAPPINGS | MULTIDISCIPLINARY SCIENCES | STRONG-CONVERGENCE THEOREMS | NONSELF-MAPPINGS | strong convergence | FAMILY | uniformly convex | FIXED-POINT THEOREMS | MAPS | BANACH-SPACES | uniformly Gateaux differentiable norm | AVERAGED APPROXIMANTS | HILBERT-SPACE | NONLINEAR CONTRACTIONS

Teaux differentiable norm | Strong convergence | Uniformly convex | Uniformly gâ | NON-EXPANSIVE MAPPINGS | MULTIDISCIPLINARY SCIENCES | STRONG-CONVERGENCE THEOREMS | NONSELF-MAPPINGS | strong convergence | FAMILY | uniformly convex | FIXED-POINT THEOREMS | MAPS | BANACH-SPACES | uniformly Gateaux differentiable norm | AVERAGED APPROXIMANTS | HILBERT-SPACE | NONLINEAR CONTRACTIONS

Journal Article

Mathematical Inequalities and Applications, ISSN 1331-4343, 2009, Volume 12, Issue 3, pp. 611 - 624

In this paper, we established the strong convergence of Browder type iteration {x(t)} for the multivalued nonexpansive nonself-mapping T satisfying the weakly...

Strong convergence | Uniformly Gáteaux differentiable norm | Multivalued nonexpansive mapping | Reflexive and strictly convex Banach space | Weakly sequentially continuous duality mapping | MATHEMATICS | FIXED-POINT THEOREMS | SET | weakly sequentially continuous duality mapping | ACCRETIVE-OPERATORS | VALUED MAPPINGS | uniformly Gateaux differentiable norm | STRONG-CONVERGENCE THEOREMS | NONSELF-MAPPINGS | strong convergence | reflexive and strictly convex Banach space

Strong convergence | Uniformly Gáteaux differentiable norm | Multivalued nonexpansive mapping | Reflexive and strictly convex Banach space | Weakly sequentially continuous duality mapping | MATHEMATICS | FIXED-POINT THEOREMS | SET | weakly sequentially continuous duality mapping | ACCRETIVE-OPERATORS | VALUED MAPPINGS | uniformly Gateaux differentiable norm | STRONG-CONVERGENCE THEOREMS | NONSELF-MAPPINGS | strong convergence | reflexive and strictly convex Banach space

Journal Article

Mathematical Communications, ISSN 1331-0623, 12/2010, Volume 15, Issue 2, pp. 393 - 400

Suppose K is a closed convex subset of a real reflexive Banach space E which has a uniformly Gateaux differentiable norm and every nonempty closed convex...

Strong convergence | Accretive mapping | Uniformly Gâteaux differentiable norm | MATHEMATICS | ITERATION | ZERO | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | OPERATOR-EQUATIONS | APPROXIMATION | ISHIKAWA | accretive mapping | uniformly Gateaux differentiable norm

Strong convergence | Accretive mapping | Uniformly Gâteaux differentiable norm | MATHEMATICS | ITERATION | ZERO | MATHEMATICS, APPLIED | NONEXPANSIVE-MAPPINGS | OPERATOR-EQUATIONS | APPROXIMATION | ISHIKAWA | accretive mapping | uniformly Gateaux differentiable norm

Journal Article

Colloquium Mathematicum, ISSN 0010-1354, 2013, Volume 131, Issue 1, pp. 29 - 40

Journal Article

Nonlinear Analysis, ISSN 0362-546X, 2011, Volume 74, Issue 13, pp. 4293 - 4299

Let E be a 2 -uniformly real Banach space and F , K : E → E be nonlinear-bounded accretive operators. Assume that the Hammerstein equation u + K F u = 0 has a...

Accretive operators | Uniformly Gâteaux differentiable norm | Equations of Hammerstein type | Generalized duality maps | Modulus of smoothness | Uniformly Gteaux differentiable norm | EXISTENCE | MATHEMATICS | Uniformly Gateaux differentiable norm | MATHEMATICS, APPLIED | BANACH-SPACES | MONOTONE OPERATORS | Nonlinearity | Operators | Banach space | Integral equations | Mathematical analysis | Convergence

Accretive operators | Uniformly Gâteaux differentiable norm | Equations of Hammerstein type | Generalized duality maps | Modulus of smoothness | Uniformly Gteaux differentiable norm | EXISTENCE | MATHEMATICS | Uniformly Gateaux differentiable norm | MATHEMATICS, APPLIED | BANACH-SPACES | MONOTONE OPERATORS | Nonlinearity | Operators | Banach space | Integral equations | Mathematical analysis | Convergence

Journal Article

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