Search results for "Mathematica"

showing 10 items of 7971 documents

Recurrence and genericity

2003

We prove a C^1-connecting lemma for pseudo-orbits of diffeomorphisms on compact manifolds. We explore some consequences for C^1-generic diffeomorphisms. For instance, C^1-generic conservative diffeomorphisms are transitive. Nous montrons un lemme de connexion C^1 pour les pseudo-orbites des diffeomorphismes des varietes compactes. Nous explorons alors les consequences pour les diffeomorphismes C^1-generiques. Par exemple, les diffeomorphismes conservatifs C^1-generiques sont transitifs.

Pure mathematicsMathematics::Dynamical SystemsRiemann manifold[ MATH.MATH-DS ] Mathematics [math]/Dynamical Systems [math.DS][MATH.MATH-DS]Mathematics [math]/Dynamical Systems [math.DS]Dynamical Systems (math.DS)01 natural sciences37C05 37C20FOS: Mathematics0101 mathematicsMathematics - Dynamical SystemsDynamical system (definition)Mathematics::Symplectic GeometryMathematicsLemma (mathematics)Transitive relationRecurrence relationgeneric properties010102 general mathematicsMathematical analysissmooth dynamical systemsGeneral Medicine16. Peace & justicechain recurrence010101 applied mathematicsconnecting lemmaDiffeomorphism
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Hyperbolicity as an obstruction to smoothability for one-dimensional actions

2017

Ghys and Sergiescu proved in the $80$s that Thompson's group $T$, and hence $F$, admits actions by $C^{\infty}$ diffeomorphisms of the circle . They proved that the standard actions of these groups are topologically conjugate to a group of $C^\infty$ diffeomorphisms. Monod defined a family of groups of piecewise projective homeomorphisms, and Lodha-Moore defined finitely presentable groups of piecewise projective homeomorphisms. These groups are of particular interest because they are nonamenable and contain no free subgroup. In contrast to the result of Ghys-Sergiescu, we prove that the groups of Monod and Lodha-Moore are not topologically conjugate to a group of $C^1$ diffeomorphisms. Fur…

Pure mathematicsMathematics::Dynamical Systems[ MATH.MATH-GR ] Mathematics [math]/Group Theory [math.GR][ MATH.MATH-DS ] Mathematics [math]/Dynamical Systems [math.DS][MATH.MATH-DS]Mathematics [math]/Dynamical Systems [math.DS]Group Theory (math.GR)Dynamical Systems (math.DS)Fixed pointPSL01 natural sciences[MATH.MATH-GR]Mathematics [math]/Group Theory [math.GR]57M60Homothetic transformationMathematics::Group Theorypiecewise-projective homeomorphisms0103 physical sciencesFOS: Mathematics0101 mathematicsMathematics - Dynamical SystemsMathematics::Symplectic GeometryMathematicsreal37C85 57M60 (Primary) 43A07 37D40 37E05 (Secondary)diffeomorphismsPrimary 37C85 57M60. Secondary 43A07 37D40 37E0543A07Group (mathematics)37C8537D40010102 general mathematicsMSC (2010) : Primary: 37C85 57M60Secondary: 37D40 37E05 43A0737E0516. Peace & justiceAction (physics)hyperbolic dynamicsrigidityc-1 actionsbaumslag-solitar groupshomeomorphismslocally indicable groupPiecewiseInterval (graph theory)010307 mathematical physicsGeometry and TopologyTopological conjugacyMathematics - Group Theoryintervalgroup actions on the interval
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A quantitative isoperimetric inequality for fractional perimeters

2011

Abstract Recently Frank and Seiringer have shown an isoperimetric inequality for nonlocal perimeter functionals arising from Sobolev seminorms of fractional order. This isoperimetric inequality is improved here in a quantitative form.

Pure mathematicsMathematics::Functional Analysis010102 general mathematicsFractional Sobolev spaces01 natural sciencesFunctional Analysis (math.FA)PerimeterSobolev spaceMathematics - Functional AnalysisQuantitative isoperimetric inequalityMathematics::Group TheoryMathematics - Analysis of PDEs0103 physical sciencesFractional perimeterFOS: MathematicsOrder (group theory)Mathematics::Metric Geometry010307 mathematical physicsMathematics::Differential Geometry0101 mathematicsIsoperimetric inequalityAnalysisMathematicsAnalysis of PDEs (math.AP)
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Tensor products of Fréchet or (DF)-spaces with a Banach space

1992

Abstract The aim of the present article is to study the projective tensor product of a Frechet space and a Banach space and the injective tensor product of a (DF)-space and a Banach space. The main purpose is to analyze the connection of the good behaviour of the bounded subsets of the projective tensor product and of the locally convex structure of the injective tensor product with the local structure of the Banach space.

Pure mathematicsMathematics::Functional AnalysisApproximation propertyApplied MathematicsMathematical analysisEberlein–Šmulian theoremInfinite-dimensional vector functionBanach spaceTensor product of Hilbert spacesBanach manifoldTensor productTensor product of modulesAnalysisMathematicsJournal of Mathematical Analysis and Applications
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Weighted Hardy inequalities beyond Lipschitz domains

2014

It is a well-known fact that in a Lipschitz domain \Omega\subset R^n a p-Hardy inequality, with weight d(x,\partial\Omega)^\beta, holds for all u\in C_0^\infty(\Omega) whenever \beta<p-1. We show that actually the same is true under the sole assumption that the boundary of the domain satisfies a uniform density condition with the exponent \lambda=n-1. Corresponding results also hold for smaller exponents, and, in fact, our methods work in general metric spaces satisfying standard structural assumptions.

Pure mathematicsMathematics::Functional AnalysisHausdorff-sisältöApplied MathematicsGeneral Mathematicsmetric spaceBoundary (topology)LambdaLipschitz continuityOmega46E35 26D15Domain (mathematical analysis)Functional Analysis (math.FA)Mathematics - Functional AnalysisMetric spacemetrinen avaruusHardyn epäyhtälöuniform fatnessLipschitz domainHardy inequalityHausdorff contenttasainen paksuusExponentFOS: MathematicsMathematics
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Orlicz-Hardy inequalities

2004

We relate Orlicz-Hardy inequalities on a bounded Euclidean domain to certain fatness conditions on the complement. In the case of certain log-scale distortions of Ln, this relationship is necessary and sufficient, thus extending results of Ancona, Lewis, and Wannebo. peerReviewed

Pure mathematicsMathematics::Functional AnalysisInequalityGeneral Mathematicsmedia_common.quotation_subjectOrlicz-HardyMathematical statisticsMathematics::Classical Analysis and ODEsMathematics & StatisticsComplement (complexity)Algebra26D1546E30inequalitiesBounded functionEuclidean domainMathematicsmedia_common
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Unbounded C$^*$-seminorms and $*$-Representations of Partial *-Algebras

2009

The main purpose of this paper is to construct *-representations from unbounded C*-seminorms on partial *-algebras and to investigate their *-representations. © Heldermann Verlag.

Pure mathematicsMathematics::Functional AnalysisMathematics::Commutative AlgebraMathematics::Operator AlgebrasApplied MathematicsUnbounded C*-seminormFOS: Physical sciencesMathematical Physics (math-ph)Quasi *-algebraComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATIONMathematics::Metric GeometryPartial *-algebraConstruct (philosophy)Mathematics::Representation TheorySettore MAT/07 - Fisica Matematica(unbounded) *-representationAnalysisMathematical PhysicsMathematics
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Cohomology and Deformation of Leibniz Pairs

1995

Cohomology and deformation theories are developed for Poisson algebras starting with the more general concept of a Leibniz pair, namely of an associative algebra $A$ together with a Lie algebra $L$ mapped into the derivations of $A$. A bicomplex (with both Hochschild and Chevalley-Eilenberg cohomologies) is essential.

Pure mathematicsMathematics::Rings and AlgebrasStatistical and Nonlinear PhysicsDeformation (meteorology)Poisson distributionMathematics::Algebraic TopologyCohomologysymbols.namesakeMathematics::K-Theory and HomologyLie algebraAssociative algebraMathematics - Quantum AlgebrasymbolsFOS: MathematicsQuantum Algebra (math.QA)Mathematical PhysicsMathematics
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Decomposition numbers and local properties

2020

Abstract If G is a finite group and p is a prime, we give evidence that the p-decomposition matrix encodes properties of p-Sylow normalizers.

Pure mathematicsMatrix (mathematics)Finite groupAlgebra and Number TheoryCharacter table010102 general mathematics0103 physical sciencesDecomposition (computer science)010307 mathematical physics0101 mathematics01 natural sciencesPrime (order theory)MathematicsJournal of Algebra
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Hypersurfaces of prescribed mean curvature over obstacles

1973

Let ~2 be a bounded domain in the euclidean space IR", n-> 2, with Lipschitz boundary ~ . We shall consider surfaces which are graphs of functions u defined on f2 having prescribed mean curvature H=H(x, u) with the side condition that they should be bounded from below by an obstacle ~b. The case H = 0 (minimal surfaces) has been discussed in detail by several authors, compare [6, 7, 12, 13, 17, 18, 20, 21, 24] of the references. Tomi [-31] has also investigated parametric surfaces with variable H. More general variational problems with obstructions have been discussed in [-9] and [-10]. During the session on "Variationsrechnung", held from June 18th to June 24th, 1972 in Oberwolfach, Mirand…

Pure mathematicsMean curvature flowMinimal surfaceMean curvatureEuclidean spaceGeneral MathematicsBounded functionBoundary (topology)Lipschitz continuityDomain (mathematical analysis)MathematicsMathematische Zeitschrift
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