Search results for "Fixed point"

showing 10 items of 347 documents

Convergence of KAM iterations for counterterm problems

1998

Abstract We analyse two iterative KAM methods for counterterm problems for finite-dimensional matrices. The starting point for these methods is the KAM iteration for Hamiltonians linear in the action variable in classical mechanics. We compare their convergence properties when a perturbation parameter is varied. The first method has no fixed points beyond a critical value of the perturbation parameter. The second one has fixed points for arbitrarily large perturbations. We observe different domains of attraction separated by Julia sets.

Arbitrarily largeGeneral MathematicsApplied MathematicsMathematical analysisGeneral Physics and AstronomyPerturbation (astronomy)Statistical and Nonlinear PhysicsFixed pointAction variableCritical valueJulia setMathematicsChaos, Solitons & Fractals

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Attractors/Basin of Attraction

2020

It is a controversial issue to decide who first coined the term “attractor”. According to Peter Tsatsanis, the editor of the English version of Prédire n’est pas expliquer, it was René Thom who first introduced such a term. It is necessary, however, to remember that Thom thought that it was first introduced by the American mathe- matician Steven Smale, “although Smale says it was Thom that coined the neolo- gism “attractor”“(Tsatsanis 2010: 63–64 n. 20). From this point of view, Bob Williams expressed a more cautious opinion by saying that “the word “attractor” was invented by these guys, Thom and Smale” (Cucker and Wong 2000: 183). But other mathematicians are of the opinion that the term …

Attractor Basin of Attraction Fixed Point Limit Cycle Torus Strange Attractors Dynamical SystemsPhilosophyAttractorEnglish versionMathematical economicsAttractionSettore M-FIL/05 - Filosofia E Teoria Dei LinguaggiNeologismTerm (time)

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Trial Methods for Nonlinear Bernoulli Problem

1997

In this article we consider a free boundary problem which is related to formation of waves on a fluid surface (for example the ship waves). We study the possibility to construct ‘trial’ methods where one solves a sequence of standard flow problems formulated in different geometries that converge to the final free boundary. Furthermore, we use the shape optimization techniques to analyse the convergence of the fixed point iteration near a fixed point. For stream function case we conclude that the fast convergence can be obtained by using non-standard boundary conditions and we present numerical results to confirm the analysis.

Bernoulli's principleMathematical optimizationFlow (mathematics)Fixed-point iterationFree boundary problemApplied mathematicsBoundary (topology)Shape optimizationBoundary value problemFixed pointMathematics

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Host–virus evolutionary dynamics with specialist and generalist infection strategies: Bifurcations, bistability, and chaos

2019

In this work, we have investigated the evolutionary dynamics of a generalist pathogen, e.g., a virus population, that evolves toward specialization in an environment with multiple host types. We have particularly explored under which conditions generalist viral strains may rise in frequency and coexist with specialist strains or even dominate the population. By means of a nonlinear mathematical model and bifurcation analysis, we have determined the theoretical conditions for stability of nine identified equilibria and provided biological interpretation in terms of the infection rates for the viral specialist and generalist strains. By means of a stability diagram, we identified stable fixed…

BistabilityPopulationGeneral Physics and AstronomyDynamical Systems (math.DS)Fixed pointParameter spaceBiologyGeneralist and specialist speciesModels Biological01 natural sciencesStability (probability)010305 fluids & plasmas0103 physical sciencesFOS: MathematicsHumansQuantitative Biology::Populations and EvolutionComputer SimulationMathematics - Dynamical SystemsQuantitative Biology - Populations and Evolution010306 general physicsEvolutionary dynamicseducationMathematical Physicseducation.field_of_studyApplied MathematicsDegenerate energy levelsPopulations and Evolution (q-bio.PE)Statistical and Nonlinear Physics3. Good healthNonlinear DynamicsEvolutionary biologyFOS: Biological sciencesHost-Pathogen InteractionsVirusesVirus Physiological Phenomena

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Stochastic sensitivity of bull and bear states

2021

We study the price dynamics generated by a stochastic version of a Day–Huang type asset market model with heterogenous, interacting market participants. To facilitate the analysis, we introduce a methodology that allows us to assess the consequences of changes in uncertainty on the dynamics of an asset price process close to stable equilibria. In particular, we focus on noise-induced transitions between bull and bear states of the market under additive as well as parametric noise. Our results are obtained by combining the stochastic sensitivity function (SSF) approach, a mixture of analytical and numerical techniques, due to Mil’shtein and Ryashko (1995) with concepts and techniques from th…

CRITICAL INTENSITYEconomics and EconometricsVDP::Samfunnsvitenskap: 200::Økonomi: 210::Samfunnsøkonomi: 21205 social sciencesAsset marketNON-SMOOTH MAPSType (model theory)01 natural sciencesNON-INVERTIBLE MAPS010305 fluids & plasmasNoiseSTOCHASTIC PRICE PROCESSTRANSITIONS BETWEEN STOCHASTIC FIXED POINTS0502 economics and business0103 physical sciencesEconometricsSensitivity (control systems)Asset (economics)050207 economicsBusiness and International ManagementSTOCHASTIC SENSITIVITY FUNCTIONFocus (optics)Parametric statisticsMathematicsJournal of Economic Interaction and Coordination

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INTEGRAL SOLUTIONS TO A CLASS OF NONLOCAL EVOLUTION EQUATIONS

2010

We study the existence of integral solutions to a class of nonlinear evolution equations of the form [Formula: see text] where A : D(A) ⊆ X → 2X is an m-accretive operator on a Banach space X, and f : [0, T] × X → X and [Formula: see text] are given functions. We obtain sufficient conditions for this problem to have a unique integral solution.

Cauchy problemClass (set theory)Pure mathematicsApplied MathematicsGeneral MathematicsOperator (physics)Mathematical analysisBanach spaceIntegral solutionFixed pointNonlinear evolutionFourier integral operatorMathematicsCommunications in Contemporary Mathematics

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Process-independent strong running coupling

2016

We unify two widely different approaches to understanding the infrared behaviour of quantum chromodynamics (QCD), one essentially phenomenological, based on data, and the other computational, realised via quantum field equations in the continuum theory. Using the latter, we explain and calculate a process-independent running-coupling for QCD, a new type of effective charge that is an analogue of the Gell-Mann--Low effective coupling in quantum electrodynamics. The result is almost identical to the process-dependent effective charge defined via the Bjorken sum rule, which provides one of the most basic constraints on our knowledge of nucleon spin structure. This reveals the Bjorken sum to be…

Chiral perturbation theoryNuclear TheoryFOS: Physical sciences01 natural sciencesEffective nuclear chargeNuclear Theory (nucl-th)High Energy Physics - LatticeHigh Energy Physics - Phenomenology (hep-ph)Quantum mechanics0103 physical sciencesBeta function (physics)Quantum field theoryNuclear Experiment (nucl-ex)010306 general physicsNuclear ExperimentPhysicsCoupling constantQuantum chromodynamics010308 nuclear & particles physicsHigh Energy Physics - Lattice (hep-lat)High Energy Physics::PhenomenologyHigh Energy Physics - PhenomenologySum rule in quantum mechanicsUltraviolet fixed pointProcess-independentRunning coupling

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Some new fixed point results in non-Archimedean fuzzy metric spaces

2013

In this paper, we introduce the notions of fuzzy $(\alpha,\beta,\varphi)$-contractive mapping, fuzzy $\alpha$-$\phi$-$\psi$-contractive mapping and fuzzy $\alpha$-$\beta$-contractive mapping and establish some results of fixed point for this class of mappings in the setting of non-Archimedean fuzzy metric spaces. The results presented in this paper generalize and extend some recent results in fuzzy metric spaces. Also, some examples are given to support the usability of our results.

Class (set theory)Computer sciencebusiness.industryMathematics::General Mathematicsfuzzy α-φ-ψ-contractive mappingsApplied Mathematicsfuzzy (α β ϕ)-contractive mappingslcsh:QA299.6-433Usabilitylcsh:AnalysisFixed pointFuzzy logicFuzzy metric spacefuzzy α-β-contractive mappingsAlgebrafuzzy metric spacesSettore MAT/05 - Analisi Matematicanon-Archimedean fuzzy metric spacesFuzzy metric spaces non-Archimedean fuzzy metric spaces fuzzy $(\alpha\beta\varphi)$-contractive mappings fuzzy $\alpha$-$\phi$-$\psi$-contractive mappings fuzzy $\alpha$-$\beta$-contractive mappings.businessAnalysisNonlinear Analysis

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A New Approach to the Generalization of Darbo’s Fixed Point Problem by Using Simulation Functions with Application to Integral Equations

2019

We investigate the existence of fixed points of self-mappings via simulation functions and measure of noncompactness. We use different classes of additional functions to get some general contractive inequalities. As an application of our main conclusions, we survey the existence of a solution for a class of integral equations under some new conditions. An example will be given to support our results.

Class (set theory)Mathematics (miscellaneous)Fixed point problemSettore MAT/05 - Analisi MatematicaGeneralizationApplied MathematicsMeasure (physics)Applied mathematicsFixed pointIntegral equationFixed point measure of noncompactness simulation function integral equation.MathematicsResults in Mathematics

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On the structure of the set of equivalent norms on ℓ1 with the fixed point property

2012

Abstract Let A be the set of all equivalent norms on l 1 which satisfy the FPP. We prove that A contains rays. In fact, every renorming in l 1 which verifies condition (⁎) in Theorem 2.1 is the starting point of a (closed or open) ray composed by equivalent norms on l 1 with the FPP. The standard norm ‖ ⋅ ‖ 1 or P.K. Linʼs norm defined in Lin (2008) [12] are examples of such norms. Moreover, we study some topological properties of the set A with respect to some equivalent metrics defined on the set of all norms on l 1 equivalent to ‖ ⋅ ‖ 1 .

CombinatoricsDiscrete mathematicsRenorming theoryApplied MathematicsNorm (mathematics)Fixed-point theoremNonexpansive mappingsFixed point theoryEquivalence of metricsFixed-point propertyStabilityAnalysisMathematicsJournal of Mathematical Analysis and Applications

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