Search results for "Identity function"

showing 4 items of 4 documents

Internal inverse limits and retractions

2015

We establish equivalences between compacta that admit a sequence of retractions that converge uniformly to the identity map and compacta that are inverse limits on subcompacta with retractions for bonding maps. We give partial answers to questions of Charatonik and Prajs, and of Krasinkiewicz. Our results are related to and use results from another paper of the authors \cite{mp}.

Discrete mathematicsSequenceGeneral Mathematics54A20Inverse$r$-maps54F6554C15retractions54F15CalculusIdentity functionInternal inverse limitMathematics
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Communication complexity in a 3-computer model

1996

It is proved that the probabilistic communication complexity of the identity function in a 3-computer model isO(√n).

Theoretical computer scienceGeneral Computer ScienceComputer scienceApplied MathematicsDivergence-from-randomness modelProbabilistic logicComputer Science ApplicationsProbabilistic CTLWorst-case complexityIdentity functionProbabilistic analysis of algorithmsPhysics::Chemical PhysicsCommunication complexityDecision tree modelAlgorithmica
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Generalized Metric Spaces and Locally Uniformly Rotund Renormings

2009

A class of generalized metric spaces is a class of spaces defined by a property shared by all metric αspaces which is close to metrizability in some sense [Gru84]. The s-spaces are defined by replacing the base by network in the Bing-Nagata-Smirnov metrization theorem; i.e. a topological space is a αspace if it has a αdiscrete network. Here we shall deal with a further re- finement replacing discrete by isolated or slicely isolated. Indeed we will see that the identity map from a subset A of a normed space is A of a normedslicely continuous if, and only if, the weak topology relative to A has a s-slicely isolated network. If A is also a radial set then we have that the identity map Id : (X,…

Unit sphereMetric spacePure mathematicsMetrization theoremNorm (mathematics)Banach spaceIdentity functionTopological spaceTopologyMathematicsNormed vector space
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Radial symmetry of p-harmonic minimizers

2017

"It is still not known if the radial cavitating minimizers obtained by Ball [J.M. Ball, Discontinuous equilibrium solutions and cavitation in nonlinear elasticity, Phil. Trans. R. Soc. Lond. A 306 (1982) 557--611] (and subsequently by many others) are global minimizers of any physically reasonable nonlinearly elastic energy". The quotation is from [J. Sivaloganathan and S. J. Spector, Necessary conditions for a minimum at a radial cavitating singularity in nonlinear elasticity, Ann. Inst. H. Poincare Anal. Non Lineaire 25 (2008), no. 1, 201--213] and seems to be still accurate. The model case of the $p$-harmonic energy is considered here. We prove that the planar radial minimizers are indee…

radial symmetryosittaisdifferentiaaliyhtälötMathematics - Complex VariablesMechanical Engineering010102 general mathematicsMathematical analysisSymmetry in biologyElastic energyp-harmonic minimizers01 natural sciencesfunktioteoria010101 applied mathematicssymbols.namesakeMathematics (miscellaneous)Poincaré conjecture35J60 30C70symbolsFOS: MathematicsIdentity functionBall (mathematics)0101 mathematicsComplex Variables (math.CV)AnalysisNon lineaireMathematics
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