Information Sciences, ISSN 0020-0255, 01/2018, Volume 424, pp. 104 - 117

In multicriteria decision tasks, certain features are linearly ordered according to the decision and are called criteria, whereas others, called regular...

Rank inconsistency | Partially monotonic | Decision tree | Monotonic directions | REGRESSION | ORDINAL CLASSIFICATION | APPROXIMATION | COMPUTER SCIENCE, INFORMATION SYSTEMS | INDUCTION | ALGORITHMS | DOMINANCE RELATIONS | FEATURE-SELECTION | ROUGH SET APPROACH | RULES | ENTROPY | Decision-making | Computer science | Algorithms

Rank inconsistency | Partially monotonic | Decision tree | Monotonic directions | REGRESSION | ORDINAL CLASSIFICATION | APPROXIMATION | COMPUTER SCIENCE, INFORMATION SYSTEMS | INDUCTION | ALGORITHMS | DOMINANCE RELATIONS | FEATURE-SELECTION | ROUGH SET APPROACH | RULES | ENTROPY | Decision-making | Computer science | Algorithms

Journal Article

Quantitative Economics, ISSN 1759-7323, 03/2014, Volume 5, Issue 1, pp. 175 - 194

This paper identifies sharp bounds on the mean treatment response and average treatment effect under the assumptions of both the concave‐monotone treatment...

Nonparametric methods | treatment response | sharp bounds | C14 | returns to schooling | J24 | partial identification | Partial identification | Returns to schooling | Treatment response | Sharp bounds | CONFIDENCE-INTERVALS | PARTIALLY IDENTIFIED PARAMETERS | INSTRUMENTAL VARIABLES | EDUCATION | INFERENCE | ECONOMETRIC-MODELS | MOMENT INEQUALITIES | CHILD HEALTH | NONPARAMETRIC BOUNDS ANALYSIS | DISABILITY | ECONOMICS | Drug therapy | Estimates

Nonparametric methods | treatment response | sharp bounds | C14 | returns to schooling | J24 | partial identification | Partial identification | Returns to schooling | Treatment response | Sharp bounds | CONFIDENCE-INTERVALS | PARTIALLY IDENTIFIED PARAMETERS | INSTRUMENTAL VARIABLES | EDUCATION | INFERENCE | ECONOMETRIC-MODELS | MOMENT INEQUALITIES | CHILD HEALTH | NONPARAMETRIC BOUNDS ANALYSIS | DISABILITY | ECONOMICS | Drug therapy | Estimates

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2011, Volume 2011, Issue 1, pp. 1 - 10

Matthews (1994) introduced a new distance on a nonempty set , which is called partial metric. If is a partial metric space, then may not be zero for . In the...

Mathematical and Computational Biology | Analysis | Mathematics, general | Mathematics | Applications of Mathematics | Topology | Differential Geometry | MATHEMATICS | EQUATIONS | MATHEMATICS, APPLIED | PARTIALLY ORDERED SETS | Studies | Ordinary differential equations | Mathematical models

Mathematical and Computational Biology | Analysis | Mathematics, general | Mathematics | Applications of Mathematics | Topology | Differential Geometry | MATHEMATICS | EQUATIONS | MATHEMATICS, APPLIED | PARTIALLY ORDERED SETS | Studies | Ordinary differential equations | Mathematical models

Journal Article

Proceedings of the American Mathematical Society, ISSN 0002-9939, 06/2018, Volume 146, Issue 6, pp. 2451 - 2456

Let C be a nonempty, bounded, closed, and convex subset of a Banach space X and T: C \rightarrow C be a monotone asymptotically nonexpansive mapping. In this...

Asymptotic nonexpansive mapping | Monotone mapping | Uniformly convex | Partially ordered | And phrases | Fixed point | monotone mapping | uniformly convex | MATHEMATICS | partially ordered | MATHEMATICS, APPLIED | fixed point | PARTIALLY ORDERED SETS

Asymptotic nonexpansive mapping | Monotone mapping | Uniformly convex | Partially ordered | And phrases | Fixed point | monotone mapping | uniformly convex | MATHEMATICS | partially ordered | MATHEMATICS, APPLIED | fixed point | PARTIALLY ORDERED SETS

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2015, Volume 2015, Issue 1, pp. 1 - 5

Let the set be nonempty, convex and compact for the convergence almost everywhere and be a monotone nonexpansive mapping. In this paper, we study the behavior...

monotone mapping | convergence almost everywhere | Lebesgue measure | fixed point | Krasnoselskii iteration | Ishikawa iteration | nonexpansive mapping | MATHEMATICS | PARTIALLY ORDERED SETS | EQUATIONS | FIXED-POINTS | BANACH-SPACE | Fixed point theory | Usage | Convergence (Mathematics) | Analysis | Iterative methods (Mathematics) | Mappings (Mathematics)

monotone mapping | convergence almost everywhere | Lebesgue measure | fixed point | Krasnoselskii iteration | Ishikawa iteration | nonexpansive mapping | MATHEMATICS | PARTIALLY ORDERED SETS | EQUATIONS | FIXED-POINTS | BANACH-SPACE | Fixed point theory | Usage | Convergence (Mathematics) | Analysis | Iterative methods (Mathematics) | Mappings (Mathematics)

Journal Article

Journal of the Australian Mathematical Society, ISSN 1446-7887, 12/2018, Volume 105, Issue 3, pp. 417 - 428

We prove the existence of common fixed points for monotone contractive and monotone nonexpansive semigroups of nonlinear mappings acting in Banach spaces...

dynamical systems | fixed point | monotone nonexpansive semigroup | common fixed point | semigroup of mappings | contraction | nonexpansive mapping | monotone nonexpansive mapping | differential equations | PARTIALLY ORDERED SETS | MATHEMATICS | nonexpansive mipping | MAPPINGS | MATRIX EQUATIONS

dynamical systems | fixed point | monotone nonexpansive semigroup | common fixed point | semigroup of mappings | contraction | nonexpansive mapping | monotone nonexpansive mapping | differential equations | PARTIALLY ORDERED SETS | MATHEMATICS | nonexpansive mipping | MAPPINGS | MATRIX EQUATIONS

Journal Article

Journal of Inequalities and Applications, ISSN 1025-5834, 12/2012, Volume 2012, Issue 1, pp. 1 - 19

In the setting of partially ordered metric spaces, using the notion of compatible mappings, we establish the existence and uniqueness of coupled common fixed...

partially ordered set | compatible mappings | Analysis | Mathematics, general | Mathematics | Applications of Mathematics | g -mixed monotone mappings | coupled coincidence point | coupled common fixed point | Coupled common fixed point | Compatible mappings | Partially ordered set | Coupled coincidence point | g-mixed monotone mappings | MATHEMATICS | MATHEMATICS, APPLIED | CONTRACTION | THEOREMS | MAPPINGS

partially ordered set | compatible mappings | Analysis | Mathematics, general | Mathematics | Applications of Mathematics | g -mixed monotone mappings | coupled coincidence point | coupled common fixed point | Coupled common fixed point | Compatible mappings | Partially ordered set | Coupled coincidence point | g-mixed monotone mappings | MATHEMATICS | MATHEMATICS, APPLIED | CONTRACTION | THEOREMS | MAPPINGS

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2016, Volume 2016, Issue 1, pp. 1 - 9

Let X be a Banach space or a complete hyperbolic metric space. Let C be a nonempty, bounded, closed, and convex subset of X and T : C → C $T: C \rightarrow C$...

monotone mapping | partially ordered | Mathematical and Computational Biology | 34A12 | 46B20 | hyperbolic metric spaces | nonexpansive mapping | Mathematics | Topology | uniformly convex | fixed point | Analysis | 47E10 | Krasnoselskii iteration | Mathematics, general | Applications of Mathematics | Differential Geometry | 45D05 | Fixed point theory | Usage | Metric spaces | Banach spaces | Texts | Theorems | Fixed points (mathematics) | Mapping | Metric space | Banach space

monotone mapping | partially ordered | Mathematical and Computational Biology | 34A12 | 46B20 | hyperbolic metric spaces | nonexpansive mapping | Mathematics | Topology | uniformly convex | fixed point | Analysis | 47E10 | Krasnoselskii iteration | Mathematics, general | Applications of Mathematics | Differential Geometry | 45D05 | Fixed point theory | Usage | Metric spaces | Banach spaces | Texts | Theorems | Fixed points (mathematics) | Mapping | Metric space | Banach space

Journal Article

Computers and Mathematics with Applications, ISSN 0898-1221, 09/2012, Volume 64, Issue 6, pp. 1770 - 1777

We obtain coupled coincidence and coupled common fixed point theorems for mixed -monotone nonlinear operators in partially ordered metric spaces. Our results...

Coupled common fixed point | Partially ordered metric space | Coupled coincidence point | Mixed [formula omitted]-monotone nonlinear operator | Mixed g-monotone nonlinear operator | MATHEMATICS, APPLIED | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | SETS | FIXED-POINT | MAPPINGS | ORDINARY DIFFERENTIAL-EQUATIONS | ORDERED METRIC-SPACES | Mathematical models

Coupled common fixed point | Partially ordered metric space | Coupled coincidence point | Mixed [formula omitted]-monotone nonlinear operator | Mixed g-monotone nonlinear operator | MATHEMATICS, APPLIED | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | SETS | FIXED-POINT | MAPPINGS | ORDINARY DIFFERENTIAL-EQUATIONS | ORDERED METRIC-SPACES | Mathematical models

Journal Article

10.
Full Text
Fixed point theorems for mixed monotone operators and applications to integral equations

Nonlinear Analysis, ISSN 0362-546X, 2011, Volume 74, Issue 5, pp. 1749 - 1760

The purpose of this paper is to present some coupled fixed point theorems for a mixed monotone operator in a complete metric space endowed with a partial order...

Partially ordered set | Coupled fixed point | Integral equation | Altering distance function | Mixed monotone operator | EXISTENCE | MATHEMATICS | MATHEMATICS, APPLIED | GENERALIZED CONTRACTIONS | METRIC-SPACES | PARTIALLY ORDERED SETS | ORDINARY DIFFERENTIAL-EQUATIONS | Nonlinearity | Operators | Theorems | Fixed points (mathematics) | Metric space | Integral equations

Partially ordered set | Coupled fixed point | Integral equation | Altering distance function | Mixed monotone operator | EXISTENCE | MATHEMATICS | MATHEMATICS, APPLIED | GENERALIZED CONTRACTIONS | METRIC-SPACES | PARTIALLY ORDERED SETS | ORDINARY DIFFERENTIAL-EQUATIONS | Nonlinearity | Operators | Theorems | Fixed points (mathematics) | Metric space | Integral equations

Journal Article

Journal of Geotechnical and Geoenvironmental Engineering, ISSN 1090-0241, 05/2014, Volume 140, Issue 5, p. 4014003

AbstractDesaturation is a method for the mitigation of liquefaction of sand. This method has gained increasing interest in recent years as it may become a more...

Technical Papers | Triaxial tests | Bacteria | Soil liquefaction | Desaturation | LIQUEFACTION RESISTANCE | INSTABILITY | BEHAVIOR | STRENGTH | Sand (soil type) | Load factors | BUBBLES | GEOSCIENCES, MULTIDISCIPLINARY | LOOSE SAND | PARTIALLY SATURATED SAND | MITIGATION | ENGINEERING, GEOLOGICAL | STRAIN | P-WAVE VELOCITY | Shear (Mechanics) | Sand | Analysis | Mechanical properties | Chemical properties

Technical Papers | Triaxial tests | Bacteria | Soil liquefaction | Desaturation | LIQUEFACTION RESISTANCE | INSTABILITY | BEHAVIOR | STRENGTH | Sand (soil type) | Load factors | BUBBLES | GEOSCIENCES, MULTIDISCIPLINARY | LOOSE SAND | PARTIALLY SATURATED SAND | MITIGATION | ENGINEERING, GEOLOGICAL | STRAIN | P-WAVE VELOCITY | Shear (Mechanics) | Sand | Analysis | Mechanical properties | Chemical properties

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2015, Volume 2015, Issue 1, pp. 1 - 7

Let ( X , ∥ ⋅ ∥ ) $(X,\|\cdot\|)$ be a Banach space. Let C be a nonempty, bounded, closed, and convex subset of X and T : C → C $T: C \rightarrow C$ be a...

uniformly convex Banach space | 06F30 | Mathematical and Computational Biology | 46B20 | Mann iteration process | nonexpansive mapping | Mathematics | Topology | fixed point | Analysis | 47E10 | Mathematics, general | Applications of Mathematics | Differential Geometry | uniformly Lipschitzian mapping | MATHEMATICS | MATHEMATICS, APPLIED | PARTIALLY ORDERED SETS | EQUATIONS | FIXED-POINT THEOREM | WEAK CONVERGENCE | BANACH-SPACE | Fixed point theory | Usage | Banach spaces | Iterative methods (Mathematics) | Banach space | Texts | Mapping

uniformly convex Banach space | 06F30 | Mathematical and Computational Biology | 46B20 | Mann iteration process | nonexpansive mapping | Mathematics | Topology | fixed point | Analysis | 47E10 | Mathematics, general | Applications of Mathematics | Differential Geometry | uniformly Lipschitzian mapping | MATHEMATICS | MATHEMATICS, APPLIED | PARTIALLY ORDERED SETS | EQUATIONS | FIXED-POINT THEOREM | WEAK CONVERGENCE | BANACH-SPACE | Fixed point theory | Usage | Banach spaces | Iterative methods (Mathematics) | Banach space | Texts | Mapping

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2015, Volume 2015, Issue 1, pp. 1 - 11

In this paper, we obtain sufficient conditions for the existence of fixed points for monotone quasi-contraction mappings in metric and modular metric spaces...

Mathematical and Computational Biology | Mathematics | Topology | quasi-contraction | 47H10 | modular metric space | fixed point | Analysis | directed graph | 47H09 | Mathematics, general | Applications of Mathematics | Differential Geometry | monotone mappings | MATHEMATICS | MATHEMATICS, APPLIED | PARTIALLY ORDERED SETS | EQUATIONS | PRINCIPLE | Fixed point theory | Usage | Mappings (Mathematics)

Mathematical and Computational Biology | Mathematics | Topology | quasi-contraction | 47H10 | modular metric space | fixed point | Analysis | directed graph | 47H09 | Mathematics, general | Applications of Mathematics | Differential Geometry | monotone mappings | MATHEMATICS | MATHEMATICS, APPLIED | PARTIALLY ORDERED SETS | EQUATIONS | PRINCIPLE | Fixed point theory | Usage | Mappings (Mathematics)

Journal Article

Fixed Point Theory and Applications, ISSN 1687-1820, 12/2015, Volume 2015, Issue 1, pp. 1 - 6

In this paper, we study the existence of fixed points of monotone nonexpansive mappings defined in Banach spaces endowed with a graph. This work is a...

06F30 | Mathematical and Computational Biology | 46B20 | Mathematics | Topology | Banach space | monotone nonexpansive mappings | fixed point | Analysis | 47E10 | directed graph | Mathematics, general | Applications of Mathematics | Differential Geometry | MATHEMATICS | PARTIALLY ORDERED SETS | THEOREMS | EQUATIONS | BANACH-SPACE | Cartography | Fixed point theory | Usage | Metric spaces | Graphs | Mapping | Continuity | Metric space

06F30 | Mathematical and Computational Biology | 46B20 | Mathematics | Topology | Banach space | monotone nonexpansive mappings | fixed point | Analysis | 47E10 | directed graph | Mathematics, general | Applications of Mathematics | Differential Geometry | MATHEMATICS | PARTIALLY ORDERED SETS | THEOREMS | EQUATIONS | BANACH-SPACE | Cartography | Fixed point theory | Usage | Metric spaces | Graphs | Mapping | Continuity | Metric space

Journal Article

HSCC 2016 - Proceedings of the 19th International Conference on Hybrid Systems: Computation and Control, 04/2016, pp. 21 - 30

Conference Proceeding

Applied Mathematics Letters, ISSN 0893-9659, 11/2012, Volume 25, Issue 11, pp. 1803 - 1808

It is shown that a mixed monotone property in coupled fixed point results can be replaced by another property which is automatically satisfied in the case of a...

Partially ordered metric space | Coupled fixed point | Mixed monotone property | MATHEMATICS, APPLIED | THEOREMS | COMPATIBLE MAPPINGS | NONLINEAR CONTRACTIONS | ORDERED METRIC-SPACES

Partially ordered metric space | Coupled fixed point | Mixed monotone property | MATHEMATICS, APPLIED | THEOREMS | COMPATIBLE MAPPINGS | NONLINEAR CONTRACTIONS | ORDERED METRIC-SPACES

Journal Article

Numerical Functional Analysis and Optimization, ISSN 0163-0563, 07/2018, Volume 39, Issue 10, pp. 1092 - 1101

In this paper, we introduce the monotone Caristi inward mappings. As an example, we show that monotone inward contraction mappings are monotone Caristi inward...

monotone mapping | Secondary 46B20 | 47H10 | fixed point | contraction mapping | Primary 47H09 | Caristi | partially ordered metric space | multivalued mapping | inward mapping | MATHEMATICS, APPLIED | METRIC-SPACES | PARTIALLY ORDERED SETS | EQUATIONS | CONTRACTIONS | Theorems | Fixed points (mathematics)

monotone mapping | Secondary 46B20 | 47H10 | fixed point | contraction mapping | Primary 47H09 | Caristi | partially ordered metric space | multivalued mapping | inward mapping | MATHEMATICS, APPLIED | METRIC-SPACES | PARTIALLY ORDERED SETS | EQUATIONS | CONTRACTIONS | Theorems | Fixed points (mathematics)

Journal Article

Statistics and its Interface, ISSN 1938-7989, 2018, Volume 11, Issue 1, pp. 19 - 29

A kernel-based method is proposed for the monotone estimation of the nonparametric function component of a partially linear regression model. The estimated...

Density estimation | Kernel estimation | Monotone function | Partially linear models | Nonparametric function | Asymptotic normality | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | REGRESSION FUNCTION | MATHEMATICAL & COMPUTATIONAL BIOLOGY | BARDET-BIEDL-SYNDROME | LIKELIHOOD

Density estimation | Kernel estimation | Monotone function | Partially linear models | Nonparametric function | Asymptotic normality | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | REGRESSION FUNCTION | MATHEMATICAL & COMPUTATIONAL BIOLOGY | BARDET-BIEDL-SYNDROME | LIKELIHOOD

Journal Article

Journal of Mathematical Inequalities, ISSN 1846-579X, 2016, Volume 10, Issue 2, pp. 511 - 519

We prove the existence of fixed points of monotone quasi-contraction mappings in metric and modular metric spaces. This is the extension of Ran and Reurings...

Modular metric space | Quasi-contraction | Monotone mappings | Fixed point | MATHEMATICS | MATHEMATICS, APPLIED | modular metric space | PARTIALLY ORDERED SETS | EQUATIONS | PRINCIPLE | monotone mappings | quasi-contraction

Modular metric space | Quasi-contraction | Monotone mappings | Fixed point | MATHEMATICS | MATHEMATICS, APPLIED | modular metric space | PARTIALLY ORDERED SETS | EQUATIONS | PRINCIPLE | monotone mappings | quasi-contraction

Journal Article

Fundamenta Informaticae, ISSN 0169-2968, 2017, Volume 151, Issue 1-4, pp. 241 - 253

We present monotone convergence results for general iterative methods in order to approximate a solution of a nonlinear equation defined on a partially ordered...

Fractional Calculus | Monotone convergence | Caputo and Canavati type fractional derivatives | Partially ordered linear topological space | COMPUTER SCIENCE, SOFTWARE ENGINEERING | MATHEMATICS, APPLIED | partially ordered linear topological space | Nonlinear equations | Calculus | Approximation | Iterative methods | Convergence

Fractional Calculus | Monotone convergence | Caputo and Canavati type fractional derivatives | Partially ordered linear topological space | COMPUTER SCIENCE, SOFTWARE ENGINEERING | MATHEMATICS, APPLIED | partially ordered linear topological space | Nonlinear equations | Calculus | Approximation | Iterative methods | Convergence

Journal Article

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