Search results for "Applied Mathematics"

showing 10 items of 4379 documents

Complex ecological models with simple dynamics: From individuals to populations

1994

The aim of this work is to study complex ecological models exhibiting simple dynamics. We consider large scale systems which can be decomposed into weakly coupled subsystems. Perturbation Theory is used in order to get a reduced set of differential equations governing slow time varying global variables. As examples, we study the influence of the individual behaviour of animals in competition and predator-prey models. The animals are assumed to do many activities all day long such as searching for food of different types. The degree of competition as well as the predation pressure are dependent upon these activities. Preys are more vulnerable when doing some activities during which they are …

Differential equationEcologyApplied Mathematicsmedia_common.quotation_subjectScale (descriptive set theory)General MedicineInterspecific competitionBiologyDegree (music)General Biochemistry Genetics and Molecular BiologyCompetition (biology)Global variablePhilosophySimple (abstract algebra)General Agricultural and Biological SciencesSet (psychology)General Environmental Sciencemedia_commonActa Biotheoretica
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Global Non-monotonicity of Solutions to Nonlinear Second-Order Differential Equations

2018

We study behavior of solutions to two classes of nonlinear second-order differential equations with a damping term. Sufficient conditions for the first derivative of a solution x(t) to change sign at least once in a given interval (in a given infinite sequence of intervals) are provided. These conditions imply global non-monotone behavior of solutions.

Differential equationGeneral Mathematics010102 general mathematicsMonotonic functionInterval (mathematics)01 natural sciencesNonlinear differential equationsTerm (time)010101 applied mathematicsSecond order differential equationsNonlinear systemApplied mathematics0101 mathematicsNonlinear differential equations ; non-monotone behaviour ; second order ; damping term ; reciprocal equationSign (mathematics)MathematicsMediterranean Journal of Mathematics
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On global regularity and solvability of linear pseudo-differential equations

1990

Differential equationGeneral MathematicsApplied mathematicsMathematicsActa Mathematica Hungarica
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A Unifying Framework for Perturbative Exponential Factorizations

2021

We propose a framework where Fer and Wilcox expansions for the solution of differential equations are derived from two particular choices for the initial transformation that seeds the product expansion. In this scheme, intermediate expansions can also be envisaged. Recurrence formulas are developed. A new lower bound for the convergence of theWilcox expansion is provided, as well as some applications of the results. In particular, two examples are worked out up to a high order of approximation to illustrate the behavior of the Wilcox expansion.

Differential equationGeneral MathematicsEquacions diferencials01 natural sciencesUpper and lower bounds010305 fluids & plasmas0103 physical sciencesConvergence (routing)Fer expansionComputer Science (miscellaneous)Applied mathematicsZassenhaus formula010306 general physicsEngineering (miscellaneous)Mathematicslcsh:MathematicsBellman problemWilcox expansionOrder (ring theory)lcsh:QA1-939Exponential functionTransformation (function)sequences of linear transformationsProduct (mathematics)Scheme (mathematics)MatemàticaMathematics
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On the construction of lusternik-schnirelmann critical values with application to bifurcation problems

1987

An iterative method to construct Lusternik-Schnirelmann critical values is presented. Examples of its use to obtain numerical solutions to nonlinear eigenvalue problems and their bifurcation branches are given

Differential equationIterative methodApplied MathematicsMathematical analysisMathematics::General TopologyBifurcation diagramMathematics::Algebraic TopologyNonlinear systemBifurcation theoryTranscritical bifurcationAnalysisEigenvalues and eigenvectorsBifurcationMathematicsApplicable Analysis
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Gaussian and non-Gaussian stochastic sensitivity analysis of discrete structural systems

2000

Abstract The derivatives of the response of a structural system with respect to the system parameters are termed sensitivities. They play an important role in assessing the effect of uncertainties in the mathematical model of the system and in predicting changes of the response due to changes of the design parameters. In this paper, a time domain approach for evaluating the sensitivity of discrete structural systems to deterministic, as well as to Gaussian or non-Gaussian stochastic input is presented. In particular, in the latter case, the stochastic input has been assumed to be a delta-correlated process and, by using Kronecker algebra extensively, cumulant sensitivities of order higher t…

Differential equationStochastic processGaussianMechanical EngineeringStructural systemstochastic analysisComputer Science Applications1707 Computer Vision and Pattern RecognitionComputer Science Applicationssymbols.namesakeControl theoryKronecker deltaModeling and SimulationsymbolsApplied mathematicsGeneral Materials ScienceSensitivity (control systems)Time domainMaterials Science (all)Sensitivity analysis; stochastic analysis; Non-Gaussian stochastic analysisSensitivity analysisGaussian processNon-Gaussian stochastic analysisMathematicsCivil and Structural Engineering
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An Application of the Fixed Point Theory to the Study of Monotonic Solutions for Systems of Differential Equations

2020

In this paper, we establish some conditions for the existence and uniqueness of the monotonic solutions for nonhomogeneous systems of first-order linear differential equations, by using a result of the fixed points theory for sequentially complete gauge spaces.

Differential equationfixed point theorylcsh:MathematicsGeneral Mathematics010102 general mathematicsMathematical analysisFixed-point theoremMonotonic functionGauge (firearms)Fixed pointlcsh:QA1-939sequentially complete gauge spaces.01 natural sciences010101 applied mathematicsLinear differential equationComputer Science (miscellaneous)systems of differential equationsexistence and uniqueness theoremsUniqueness0101 mathematicsEngineering (miscellaneous)monotonic solutionsMathematicsMathematics
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Approximating the solutions of differential inclusions driven by measures

2019

The matter of approximating the solutions of a differential problem driven by a rough measure by solutions of similar problems driven by “smoother” measures is considered under very general assumptions on the multifunction on the right-hand side. The key tool in our investigation is the notion of uniformly bounded $$\varepsilon $$-variations, which mixes the supremum norm with the uniformly bounded variation condition. Several examples to motivate the generality of our outcomes are included.

Differential inclusionGeneralityApplied MathematicsRegulated functionε-VariationMeasure (mathematics)BV functionUniform normDifferential inclusionSettore MAT/05 - Analisi MatematicaBV functionsApplied mathematicsUniform boundednessε-VariationsRegulated functionsDifferential (infinitesimal)MathematicsAnnali di Matematica Pura ed Applicata (1923 -)
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Extremal solutions and strong relaxation for nonlinear multivalued systems with maximal monotone terms

2018

Abstract We consider differential systems in R N driven by a nonlinear nonhomogeneous second order differential operator, a maximal monotone term and a multivalued perturbation F ( t , u , u ′ ) . For periodic systems we prove the existence of extremal trajectories, that is solutions of the system in which F ( t , u , u ′ ) is replaced by ext F ( t , u , u ′ ) (= the extreme points of F ( t , u , u ′ ) ). For Dirichlet systems we show that the extremal trajectories approximate the solutions of the “convex” problem in the C 1 ( T , R N ) -norm (strong relaxation).

Differential inclusionPure mathematicsApplied Mathematics010102 general mathematicsRegular polygonMaximal monotone mapAnalysiPerturbation (astronomy)Bang-bang controlExtremal trajectorieDifferential operator01 natural sciencesDirichlet distribution010101 applied mathematicsNonlinear systemsymbols.namesakeMonotone polygonSettore MAT/05 - Analisi MatematicaNorm (mathematics)symbols0101 mathematicsExtreme pointStrong relaxationAnalysisMathematicsJournal of Mathematical Analysis and Applications
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ON THE FUNDAMENTAL THEOREM OF CALCULUS FOR FRACTAL SETS

2015

The aim of this paper is to formulate the best version of the Fundamental theorem of Calculus for real functions on a fractal subset of the real line. In order to do that an integral of Henstock–Kurzweil type is introduced.

Differentiation under the integral signReal analysisFundamental theoremApplied Mathematicss-SetMathematics::Classical Analysis and ODEss-HK IntegralDifferential calculusTime-scale calculusIntegration by substitutionAlgebraSettore MAT/05 - Analisi MatematicaModeling and SimulationFundamental theorem of calculusFunctions Hs-ACGδ.CalculusGeometry and TopologyGradient theoremMathematicsFractals
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