Search results for "Mathematical analysis"

showing 10 items of 2409 documents

The generation of the ϱ-resonance by QCD

1992

By showing that the imaginary part of a suitable QCD amplitude, after extrapolation up to the cut, exhibits indeed a prominent bump structure where the ϱ-resonance is expected to be, a rather direct indication for the generation of the ϱ-resonance by QCD is given. This is achieved by using a mathematically rigorous method of stable analytic extrapolation, based on the theory of maximally converging sequences of polynomials and the application of conformal mappings.

Quantum chromodynamicsPhysicsTheoretical physicsAmplitudePhysics and Astronomy (miscellaneous)High Energy Physics::LatticeMathematical analysisStructure (category theory)ExtrapolationConformal mapEngineering (miscellaneous)Resonance (particle physics)Zeitschrift für Physik C Particles and Fields
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QCD generates the ϱ-resonance

1991

Abstract The question whether the asymptotic QCD amplitude contains potentially hadronic resonances is examined by a mathematically rigorous method, based on the theory of maximally converging sequences of polynomials and conformal mappings. It is shown that the extrapolated amplitude to the physical cut exhibits indeed a bump structure which corresponds to the ϱ-resonance.

Quantum chromodynamicsScattering amplitudeNuclear and High Energy PhysicsAmplitudeMathematical analysisConformal mapElementary particleInvariant massQuantum field theorySeries expansionAtomic and Molecular Physics and OpticsMathematicsMathematical physicsNuclear Physics B - Proceedings Supplements
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On the rigidity theorem for elliptic genera

2018

We give a detailed proof of the rigidity theorem for elliptic gen- era. Using the Lefschetz fixed point formula we carefully analyze the relation between the characteristic power series defining the elliptic genera and the equivariant elliptic genera. We show that equivariant elliptic genera converge to Jacobi functions which are holomorphic. This implies the rigidity of elliptic genera. Our approach can be easily modified to give a proof of the rigidity theorem for the elliptic genera of level N.

Quarter periodPure mathematicsApplied MathematicsGeneral MathematicsMathematical analysisElliptic functionHolomorphic functionMathematics::Geometric TopologyMathematics::Algebraic TopologySupersingular elliptic curveJacobi elliptic functionsHigh Energy Physics::TheoryMathematics::Algebraic GeometryModular elliptic curveElliptic integralSchoof's algorithmMathematics::Symplectic GeometryMathematicsTransactions of the American Mathematical Society
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A-superharmonic functions and supersolutions of degenerate elliptic equations

1988

Quarter periodSubharmonic functionNomeGeneral MathematicsMathematical analysisDegenerate energy levelsElliptic functionJacobi elliptic functionsMathematics
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Common fixed point results on quasi-Banach spaces and integral equations

2013

In this paper we obtain fixed and common fixed point theorems for self-mappings defined on a closed and convex subset C of a quasi-Banach space. We give also a constructive method for finding the common fixed points of the involved mappings. As an application we obtain a result of the existence of solutions of integral equations.

Quasi-Banach space metric-type space common fixed point weakly compatible mappings integral equations.Pure mathematicsSettore MAT/05 - Analisi MatematicaGeneral MathematicsMathematical analysisBanach spaceCommon fixed pointFunctional integrationLp spaceC0-semigroupFixed-point propertyIntegral equationMathematicsGeorgian Mathematical Journal
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Planar Mappings of Finite Distortion

2010

We review recent results on planar mappings of finite distortion. This class of mappings contains all analytic functions and quasiconformal mappings.

Quasiconformal mappingClass (set theory)Mathematics::Complex VariablesApplied MathematicsMathematical analysisDistortion (mathematics)symbols.namesakePlanarComputational Theory and MathematicsJacobian matrix and determinantsymbolsCoincidence pointAnalysisAnalytic functionMathematicsComputational Methods and Function Theory
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Boundary Hölder Continuity and Quasiconformal Mappings

1991

Quasiconformal mappingGeneral MathematicsMathematical analysisHölder conditionBoundary (topology)Modulus of continuityMathematicsJournal of the London Mathematical Society
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Asymptotic values and hölder continuity of quasiconformal mappings

1987

Quasiconformal mappingPartial differential equationTriangle inequalityGeneral MathematicsMathematical analysisHölder conditionAnalysisMathematicsJournal d'Analyse Mathématique
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Distortion of quasiconformal maps in terms of the quasihyperbolic metric

2013

Abstract We extend a theorem of Gehring and Osgood from 1979–relating to the distortion of the quasihyperbolic metric by a quasiconformal mapping between Euclidean domains–to the setting of metric measure spaces of Q -bounded geometry. When the underlying target space is bounded, we require that the boundary of the image has at least two points. We show that even in the manifold setting, this additional assumption is necessary.

Quasiconformal mappingPure mathematicsMathematics::Complex VariablesApplied MathematicsInjective metric space010102 general mathematicsMathematical analysista111Equivalence of metrics01 natural sciencesConvex metric spaceIntrinsic metric010101 applied mathematicsDistortion (mathematics)Metric space0101 mathematicsAnalysisFisher information metricMathematicsJournal of mathematical analysis and applications
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Quasiextremal distance domains and extension of quasiconformal mappings

1985

Quasiconformal mappingPure mathematicsPartial differential equationFunctional analysisGeneral MathematicsMathematical analysisExtension (predicate logic)AnalysisMathematicsJournal d'Analyse Mathématique
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