Search results for "Mathematics::Metric Geometry"

showing 10 items of 139 documents

Space of signatures as inverse limits of Carnot groups

2021

We formalize the notion of limit of an inverse system of metric spaces with 1-Lipschitz projections having unbounded fibers. The construction is applied to the sequence of free Carnot groups of fixed rank n and increasing step. In this case, the limit space is in correspondence with the space of signatures of rectifiable paths in ℝn, as introduced by Chen. Hambly-Lyons’s result on the uniqueness of signature implies that this space is a geodesic metric tree. As a particular consequence we deduce that every path in ℝn can be approximated by projections of some geodesics in some Carnot group of rank n, giving an evidence that the complexity of sub-Riemannian geodesics increases with the step.…

Carnot groupsignature of pathsryhmäteoriametric treeinverse limitsub-Riemannian distancedifferentiaaligeometria510 Mathematicspath lifting propertysubmetryMathematics::Metric GeometryMathematics::Differential Geometrymittateoriafree nilpotent groupstokastiset prosessit
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Local minimizers and gamma-convergence for nonlocal perimeters in Carnot groups

2020

We prove the local minimality of halfspaces in Carnot groups for a class of nonlocal functionals usually addressed as nonlocal perimeters. Moreover, in a class of Carnot groups in which the De Giorgi's rectifiability Theorem holds, we provide a lower bound for the $\Gamma$-liminf of the rescaled energy in terms of the horizontal perimeter.

Class (set theory)Pure mathematicsControl and OptimizationCarnot groups calibrations nonlocal perimeters/ Γ-convergence sets of finite perimeter rectifiabilityMathematics::Analysis of PDEssets of finite perimetervariaatiolaskentaComputer Science::Computational Geometry01 natural sciencesUpper and lower boundsdifferentiaaligeometriasymbols.namesakeMathematics - Analysis of PDEs510 MathematicsMathematics - Metric GeometryComputer Science::Logic in Computer ScienceConvergence (routing)FOS: MathematicsMathematics::Metric Geometry0101 mathematicscalibrationsMathematicsnonlocal perimeters010102 general mathematicsrectifiabilityryhmäteoriaMetric Geometry (math.MG)matemaattinen optimointi010101 applied mathematicsComputational MathematicsΓ-convergenceΓ-convergenceCarnot groupsControl and Systems EngineeringsymbolsCarnot cycleAnalysis of PDEs (math.AP)ESAIM: Control, Optimisation and Calculus of Variations
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Rigidity of quasisymmetric mappings on self-affine carpets

2016

We show that the class of quasisymmetric maps between horizontal self-affine carpets is rigid. Such maps can only exist when the dimensions of the carpets coincide, and in this case, the quasisymmetric maps are quasi-Lipschitz. We also show that horizontal self-affine carpets are minimal for the conformal Assouad dimension.

Class (set theory)Pure mathematicsMathematics::Dynamical SystemsGeneral Mathematicsquasisymmetric mapsMathematics::General TopologyPhysics::OpticsConformal mapRigidity (psychology)01 natural sciencesDimension (vector space)0103 physical sciencesClassical Analysis and ODEs (math.CA)FOS: MathematicsMathematics::Metric Geometry0101 mathematicsself-affine carpetsMathematicsta111010102 general mathematicsPhysics::Classical PhysicsMathematics - Classical Analysis and ODEs010307 mathematical physicsAffine transformation28A80 37F35 30C62 30L10
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Semmes surfaces and intrinsic Lipschitz graphs in the Heisenberg group

2018

A Semmes surface in the Heisenberg group is a closed set $S$ that is upper Ahlfors-regular with codimension one and satisfies the following condition, referred to as Condition B. Every ball $B(x,r)$ with $x \in S$ and $0 < r < \operatorname{diam} S$ contains two balls with radii comparable to $r$ which are contained in different connected components of the complement of $S$. Analogous sets in Euclidean spaces were introduced by Semmes in the late $80$'s. We prove that Semmes surfaces in the Heisenberg group are lower Ahlfors-regular with codimension one and have big pieces of intrinsic Lipschitz graphs. In particular, our result applies to the boundary of chord-arc domains and of redu…

Closed setApplied MathematicsGeneral Mathematics010102 general mathematicsBoundary (topology)Metric Geometry (math.MG)CodimensionLipschitz continuitySurface (topology)01 natural sciencesCombinatorics28A75 (Primary) 28A78 (Secondary)Mathematics - Metric GeometryMathematics - Classical Analysis and ODEsClassical Analysis and ODEs (math.CA)FOS: MathematicsHeisenberg groupMathematics::Metric Geometrymittateoria[MATH]Mathematics [math]0101 mathematicsIsoperimetric inequalityComputingMilieux_MISCELLANEOUSMathematicsComplement (set theory)Transactions of the American Mathematical Society
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A Dual Version of Huppert's  -  Conjecture

2010

Huppert’s ρ-σ conjecture asserts that any finite group has some character degree that is divisible by “many” primes. In this note, we consider a dual version of this problem, and we prove that for any finite group there is some prime that divides “many” character degrees.

CombinatoricsFinite groupConjectureCharacter (mathematics)Mathematics::Number TheoryGeneral MathematicsMathematics::Metric GeometryDegree (angle)Prime (order theory)Dual (category theory)MathematicsInternational Mathematics Research Notices
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Historical Notes on Star Geometry in Mathematics, Art and Nature

2018

Gamma: “I can. Look at this Counterexample 3: a star-polyhedron I shall call it urchin. This consists of 12 star-pentagons. It has 12 vertices, 30 edges, and 12 pentagonal faces-you may check it if you like by counting. Thus the Descartes-Euler thesis is not true at all, since for this polyhedron \(V - E + F = - 6\)”. Delta: “Why do you think that your ‘urchin’ is a polyhedron?” Gamma: “Do you not see? This is a polyhedron, whose faces are the twelve star-pentagons”. Delta: “But then you do not even know what a polygon is! A star-pentagon is certainly not a polygon!”

CombinatoricsPolyhedronMathematics::History and OverviewPolygonMathematics::Metric GeometryComputer Science::Computational GeometryStar (graph theory)History of Mathematics Star polygons and polyhedra.MathematicsCounterexample
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Intertwining operators between different Hilbert spaces: connection with frames

2009

In this paper we generalize a strategy recently proposed by the author concerning intertwining operators. In particular we discuss the possibility of extending our previous results in such a way to construct (almost) isospectral self-adjoint operators living in different Hilbert spaces. Many examples are discussed in details. Many of them arise from the theory of frames in Hilbert spaces, others from the so-called g-frames.

Computer scienceHilbert spaceFOS: Physical sciencesStatistical and Nonlinear PhysicsMathematical Physics (math-ph)Operator theoryConnection (mathematics)Mathematical OperatorsAlgebrasymbols.namesakeIntertwining operatorsIsospectralOperator (computer programming)Linear algebrasymbolsMathematics::Metric GeometryFrameSettore MAT/07 - Fisica MatematicaEigenvalues and eigenvectorsMathematical Physics
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Simulating quantum-optical phenomena with optical lattices

2011

Cold atoms trapped in optical lattices have been proved to be very versatile quantum systems in which a large class of many-body condensed-matter Hamiltonians can be simulated [1].

Condensed Matter::Quantum GasesQuantum opticsPhysicsOptical latticePhotonPhotodetectionOptical microcavitylaw.inventionOptical phenomenaOptical phase spacelawQuantum mechanicsMathematics::Metric GeometryPhysics::Atomic PhysicsQuantumComputer Science::Databases2011 Conference on Lasers and Electro-Optics Europe and 12th European Quantum Electronics Conference (CLEO EUROPE/EQEC)
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R Code for Hausdorff and Simplex Dispersion Orderings in the 2D Case

2010

This paper proposes a software implementation using R of the Hausdorff and simplex dispersion orderings. A copy can be downloaded from http://www.uv.es/~ayala/software/fun-disp.R . The paper provides some examples using the functions exactHausdorff for the Hausdorff dispersion ordering and the function simplex for the simplex dispersion orderings. Some auxiliary functions are commented too.

Convex hullDiscrete mathematicsSimplexMultivariate random variableMathematicsofComputing_NUMERICALANALYSISHausdorff spaceAuxiliary functionFunction (mathematics)CombinatoricsTheoryofComputation_ANALYSISOFALGORITHMSANDPROBLEMCOMPLEXITYMathematics::Metric GeometryHausdorff measureStatistical dispersionMathematics
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Geometry and analysis of Dirichlet forms (II)

2014

Abstract Given a regular, strongly local Dirichlet form E , under assumption that the lower bound of the Ricci curvature of Bakry–Emery, the local doubling and local Poincare inequalities are satisfied, we obtain that: (i) the intrinsic differential and distance structures of E coincide; (ii) the Cheeger energy functional Ch d E is a quadratic norm. This shows that (ii) is necessary for the Riemannian Ricci curvature defined by Ambrosio–Gigli–Savare to be bounded from below. This together with some recent results of Ambrosio–Gigli–Savare yields that the heat flow gives a gradient flow of Boltzman–Shannon entropy under the above assumptions. We also obtain an improvement on Kuwada's duality …

Dirichlet formta111Mathematical analysisGeometryCurvatureUpper and lower boundsDirichlet distributionsymbols.namesakeBounded functionsymbolsMathematics::Metric GeometryMathematics::Differential GeometryAnalysisRicci curvatureEnergy functionalScalar curvatureMathematicsJournal of Functional Analysis
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