Search results for "Uniform continuity"

showing 7 items of 27 documents

Quasihyperbolic boundary conditions and capacity: Hölder continuity of quasiconformal mappings

2001

We prove that quasiconformal maps onto domains which satisfy a suitable growth condition on the quasihyperbolic metric are uniformly continuous when the source domain is equipped with the internal metric. The obtained modulus of continuity and the growth assumption on the quasihyperbolic metric are shown to be essentially sharp. As a tool, we prove a new capacity estimate.

Quasiconformal mappingUniform continuityMathematics::Complex VariablesGeneral MathematicsMathematical analysisMetric (mathematics)Mathematics::Metric GeometryHölder conditionBoundary value problemDomain (mathematical analysis)Modulus of continuityMathematicsCommentarii Mathematici Helvetici

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Can the Adaptive Metropolis Algorithm Collapse Without the Covariance Lower Bound?

2011

The Adaptive Metropolis (AM) algorithm is based on the symmetric random-walk Metropolis algorithm. The proposal distribution has the following time-dependent covariance matrix at step $n+1$ \[ S_n = Cov(X_1,...,X_n) + \epsilon I, \] that is, the sample covariance matrix of the history of the chain plus a (small) constant $\epsilon>0$ multiple of the identity matrix $I$. The lower bound on the eigenvalues of $S_n$ induced by the factor $\epsilon I$ is theoretically convenient, but practically cumbersome, as a good value for the parameter $\epsilon$ may not always be easy to choose. This article considers variants of the AM algorithm that do not explicitly bound the eigenvalues of $S_n$ away …

Statistics and ProbabilityFOS: Computer and information sciencesIdentity matrixMathematics - Statistics TheoryStatistics Theory (math.ST)Upper and lower boundsStatistics - Computation93E3593E15Combinatorics60J27Mathematics::ProbabilityLaw of large numbers65C40 60J27 93E15 93E35stochastic approximationFOS: MathematicsEigenvalues and eigenvectorsComputation (stat.CO)Metropolis algorithmMathematicsProbability (math.PR)Zero (complex analysis)CovariancestabilityUniform continuityBounded function65C40Statistics Probability and Uncertaintyadaptive Markov chain Monte CarloMathematics - Probability

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Menger curvature and Lipschitz parametrizations in metric spaces

2005

Uniform continuityAlgebra and Number TheoryInjective metric spaceMathematical analysisMenger curvatureMetric mapLipschitz continuityMetric differentialMathematicsConvex metric spaceIntrinsic metricFundamenta Mathematicae

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Quasihyperbolic boundary conditions and capacity: Uniform continuity of quasiconformal mappings

2005

Uniform continuityPartial differential equationMathematics::Complex VariablesGeneral MathematicsMathematical analysisMetric (mathematics)Mathematics::Metric GeometryBoundary value problemAnalysisModulus of continuityDomain (mathematical analysis)MathematicsJournal d'Analyse Mathématique

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Some Non-linear Geometrical Properties of Banach Spaces

2014

In this survey we report on very recent results about some non-linear geometrical properties of many classes of real and complex Banach spaces and uniform algebras, including the ball algebra $\fancyscript{A}_u(B_X)$ of all uniformly continuous functions on the closed unit ball and holomorphic on the open unit ball of a complex Banach space $X$. These geometrical properties are: Polynomial numerical index, Polynomial Daugavet property and Bishop-Phelp-Bollobas property for multilinear mappings.

Unit sphereMathematics::Functional AnalysisNonlinear systemPure mathematicsUniform continuityMultilinear mapBanach spaceHolomorphic functionBall (mathematics)Disk algebraMathematics

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On holomorphic functions attaining their norms

2004

Abstract We show that on a complex Banach space X , the functions uniformly continuous on the closed unit ball and holomorphic on the open unit ball that attain their norms are dense provided that X has the Radon–Nikodym property. We also show that the same result holds for Banach spaces having a strengthened version of the approximation property but considering just functions which are also weakly uniformly continuous on the unit ball. We prove that there exists a polynomial such that for any fixed positive integer k , it cannot be approximated by norm attaining polynomials with degree less than k . For X=d ∗ (ω,1) , a predual of a Lorentz sequence space, we prove that the product of two p…

Unit spherePure mathematicsMathematics::Functional AnalysisLorentz sequence spaceFunction spaceApproximation propertyApplied MathematicsMathematical analysisBanach spaceHolomorphic functionNorm attainingHolomorphic functionPolynomialUniform continuityNorm (mathematics)Ball (mathematics)AnalysisMathematicsJournal of Mathematical Analysis and Applications

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Isometries between spaces of multiple Dirichlet series

2019

Abstract In this paper we study spaces of multiple Dirichlet series and their properties. We set the ground of the theory of multiple Dirichlet series and define the spaces H ∞ ( C + k ) , k ∈ N , of convergent and bounded multiple Dirichlet series on C + k . We give a representation for these Banach spaces and prove that they are all isometrically isomorphic, independently of the dimension. The analogous result for A ( C + k ) , k ∈ N , which are the spaces of multiple Dirichlet series that are convergent on C + k and define uniformly continuous functions, is obtained.

symbols.namesakePure mathematicsUniform continuityApplied MathematicsBounded functionDimension (graph theory)symbolsBanach spaceRepresentation (mathematics)AnalysisDirichlet seriesMathematicsJournal of Mathematical Analysis and Applications

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