Search results for "Names"

showing 10 items of 6843 documents

Robustness of the Gaussian concentration inequality and the Brunn–Minkowski inequality

2016

We provide a sharp quantitative version of the Gaussian concentration inequality: for every $r>0$, the difference between the measure of the $r$-enlargement of a given set and the $r$-enlargement of a half-space controls the square of the measure of the symmetric difference between the set and a suitable half-space. We also prove a similar estimate in the Euclidean setting for the enlargement with a general convex set. This is equivalent to the stability of the Brunn-Minkowski inequality for the Minkowski sum between a convex set and a generic one.

Pure mathematicsGaussianConvex setkvantitatiivinen tutkimus01 natural sciencesMeasure (mathematics)Square (algebra)010104 statistics & probabilitysymbols.namesakeMathematics - Analysis of PDEsQuantitative Isoperimetric InequalitiesFOS: MathematicsMathematics::Metric Geometry0101 mathematicsConcentration inequalitySymmetric differenceMathematicsmatematiikkaApplied MathematicsProbability (math.PR)010102 general mathematicsMinkowski inequalityMinkowski additionBrunn–Minkowski inequalityGaussian concentration inequalitysymbols49Q20 52A40 60E15Mathematics - ProbabilityAnalysisAnalysis of PDEs (math.AP)Calculus of Variations and Partial Differential Equations
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Lower Semi-frames, Frames, and Metric Operators

2020

AbstractThis paper deals with the possibility of transforming a weakly measurable function in a Hilbert space into a continuous frame by a metric operator, i.e., a strictly positive self-adjoint operator. A necessary condition is that the domain of the analysis operator associated with the function be dense. The study is done also with the help of the generalized frame operator associated with a weakly measurable function, which has better properties than the usual frame operator. A special attention is given to lower semi-frames: indeed, if the domain of the analysis operator is dense, then a lower semi-frame can be transformed into a Parseval frame with a (special) metric operator.

Pure mathematicsGeneral Mathematics010102 general mathematicsFrame (networking)Hilbert spacelower semi-framesWeakly measurable functionFunction (mathematics)01 natural sciencesDomain (mathematical analysis)Parseval's theoremFramessymbols.namesakeOperator (computer programming)Settore MAT/05 - Analisi Matematica0103 physical sciencesMetric (mathematics)symbolsmetric operators0101 mathematics010306 general physicsMathematicsMediterranean Journal of Mathematics
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Rigidity of commutators and elementary operators on Calkin algebras

1998

LetA=(A 1,...,A n ),B=(B 1,...,B n )eL(l p ) n be arbitraryn-tuples of bounded linear operators on (l p ), with 1<p<∞. The paper establishes strong rigidity properties of the corresponding elementary operators e a,b on the Calkin algebraC(l p )≡L(l p )/K(l p ); $$\varepsilon _{\alpha ,b} (s) = \sum\limits_{i = 1}^n {a_i sb_i } $$ , where quotient elements are denoted bys=S+K(l p ) forSeL(l p ). It is shown among other results that the kernel Ker(e a,b ) is a non-separable subspace ofC(l p ) whenever e a,b fails to be one-one, while the quotient $$C(\ell ^p )/\overline {\operatorname{Im} \left( {\varepsilon _{\alpha ,b} } \right)} $$ is non-separable whenever e a,b fails to be onto. These re…

Pure mathematicsGeneral Mathematics010102 general mathematicsLinear operatorsHilbert spaceCompact operator01 natural sciencesCombinatoricssymbols.namesakeBounded function0103 physical sciencessymbols010307 mathematical physics0101 mathematicsQuotientMathematicsIsrael Journal of Mathematics
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Dorronsoro's theorem in Heisenberg groups

2020

A theorem of Dorronsoro from the 1980s quantifies the fact that real-valued Sobolev functions on Euclidean spaces can be approximated by affine functions almost everywhere, and at all sufficiently small scales. We prove a variant of Dorronsoro's theorem in Heisenberg groups: functions in horizontal Sobolev spaces can be approximated by affine functions which are independent of the last variable. As an application, we deduce new proofs for certain vertical vs. horizontal Poincare inequalities for real-valued functions on the Heisenberg group, originally due to Austin-Naor-Tessera and Lafforgue-Naor.

Pure mathematicsGeneral Mathematics010102 general mathematicsMathematical proof01 natural sciencesSobolev spacesymbols.namesakeEuclidean geometryPoincaré conjectureHeisenberg groupsymbolsAlmost everywhereAffine transformation0101 mathematicsVariable (mathematics)MathematicsBulletin of the London Mathematical Society
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Distributions Frames and bases

2018

In this paper we will consider, in the abstract setting of rigged Hilbert spaces, distribution valued functions and we will investigate, in particular, conditions for them to constitute a "continuous basis" for the smallest space $\mathcal D$ of a rigged Hilbert space. This analysis requires suitable extensions of familiar notions as those of frame, Riesz basis and orthonormal basis. A motivation for this study comes from the Gel'fand-Maurin theorem which states, under certain conditions, the existence of a family of generalized eigenvectors of an essentially self-adjoint operator on a domain $\mathcal D$ which acts like an orthonormal basis of the Hilbert space $\mathcal H$. The correspond…

Pure mathematicsGeneral Mathematics02 engineering and technologyBaseDistributionSpace (mathematics)01 natural sciencessymbols.namesakeSettore MAT/05 - Analisi MatematicaGeneralized eigenvector0202 electrical engineering electronic engineering information engineeringFOS: MathematicsFrameOrthonormal basisRigged Hilbert spaces0101 mathematicsMathematicsBasis (linear algebra)Applied MathematicsOperator (physics)010102 general mathematics47A70 42C15 42C30Hilbert space020206 networking & telecommunicationsRigged Hilbert spaceFunctional Analysis (math.FA)Mathematics - Functional AnalysisDistribution (mathematics)symbolsAnalysis
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Fourier analysis of periodic Radon transforms

2019

We study reconstruction of an unknown function from its $d$-plane Radon transform on the flat $n$-torus when $1 \leq d \leq n-1$. We prove new reconstruction formulas and stability results with respect to weighted Bessel potential norms. We solve the associated Tikhonov minimization problem on $H^s$ Sobolev spaces using the properties of the adjoint and normal operators. One of the inversion formulas implies that a compactly supported distribution on the plane with zero average is a weighted sum of its X-ray data.

Pure mathematicsGeneral MathematicsBessel potential01 natural sciencesTikhonov regularizationsymbols.namesakeFOS: Mathematics0101 mathematicsperiodic distributionsMathematicsRadon transformRadon transformApplied Mathematics44A12 42B05 46F12 45Q05010102 general mathematicsZero (complex analysis)Function (mathematics)Fourier analysisFunctional Analysis (math.FA)010101 applied mathematicsSobolev spaceregularizationMathematics - Functional AnalysisDistribution (mathematics)Fourier analysissymbolsAnalysis
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Actions de IR et courbure de ricci du Fibré unitaire tangent des surfaces

1986

Characterisation of 2-dimensional Riemannian manifolds (M, g) (in particular, of surfaces with constant gaussian curvatureK=1/c2, o,−1/c2, respectively) whose tangent circle bundle (TcM, gs) (gs=Sasaki metric) admit an «almost-regular» vector field belonging to an eigenspace of the Ricci operator.

Pure mathematicsGeneral MathematicsCircle bundleGaussianMathematical analysisTangentsymbols.namesakeUnit tangent bundlesymbolsVector fieldMathematics::Differential GeometryExponential map (Riemannian geometry)Ricci curvatureEigenvalues and eigenvectorsMathematicsRendiconti del Circolo Matematico di Palermo
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Expecting the unexpected: Quantifying the persistence of unexpected hypersurfaces

2021

If $X \subset \mathbb P^n$ is a reduced subscheme, we say that $X$ admits an unexpected hypersurface of degree $t$ for multiplicity $m$ if the imposition of having multiplicity $m$ at a general point $P$ fails to impose the expected number of conditions on the linear system of hypersurfaces of degree $t$ containing $X$. Conditions which either guarantee the occurrence of unexpected hypersurfaces, or which ensure that they cannot occur, are not well understand. We introduce new methods for studying unexpectedness, such as the use of generic initial ideals and partial elimination ideals to clarify when it can and when it cannot occur. We also exhibit algebraic and geometric properties of $X$ …

Pure mathematicsGeneral MathematicsComplete intersectionVector bundleAlgebraic geometrysymbols.namesakeMathematics - Algebraic GeometryAV-sequence; Complete intersection; Generic initial ideal; Hilbert function; Partial elimination ideal; Unexpected hypersurfaceUnexpected hypersurfaceFOS: MathematicsAlgebraic numberAV-sequenceAlgebraic Geometry (math.AG)Complete intersectionGeneric initial idealMathematicsHilbert series and Hilbert polynomialSequencePartial elimination idealSettore MAT/02 - AlgebraHypersurfaceHyperplanePrimary: 14C20 13D40 14Q10 14M10 Secondary: 14M05 14M07 13E10Hilbert functionsymbolsSettore MAT/03 - GeometriaAV-sequence Complete intersection Generic initial ideal Hilbert function Partial elimination ideal Unexpected hypersurface
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Local Spectral Properties Under Conjugations

2021

AbstractIn this paper, we study some local spectral properties of operators having form JTJ, where J is a conjugation on a Hilbert space H and $$T\in L(H)$$ T ∈ L ( H ) . We also study the relationship between the quasi-nilpotent part of the adjoint $$T^*$$ T ∗ and the analytic core K(T) in the case of decomposable complex symmetric operators. In the last part we consider Weyl type theorems for triangular operator matrices for which one of the entries has form JTJ, or has form $$JT^*J$$ J T ∗ J . The theory is exemplified in some concrete cases.

Pure mathematicsGeneral MathematicsConjugations010102 general mathematicsSpectral propertiesLocal spectral propertiesHilbert space010103 numerical & computational mathematicsType (model theory)01 natural sciencesWeyl-type theorems for upper triangular operator matricessymbols.namesakeOperator matrixSettore MAT/05 - Analisi MatematicaCore (graph theory)symbols0101 mathematicsMathematics
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Representation Theorems for Indefinite Quadratic Forms Revisited

2010

The first and second representation theorems for sign-indefinite, not necessarily semi-bounded quadratic forms are revisited. New straightforward proofs of these theorems are given. A number of necessary and sufficient conditions ensuring the second representation theorem to hold is proved. A new simple and explicit example of a self-adjoint operator for which the second representation theorem does not hold is also provided.

Pure mathematicsGeneral MathematicsFOS: Physical sciencesMathematical proofDirac operator01 natural sciencesMathematics - Spectral Theorysymbols.namesakeOperator (computer programming)Simple (abstract algebra)0103 physical sciencesFOS: Mathematics0101 mathematicsSpectral Theory (math.SP)Mathematical PhysicsMathematicsRepresentation theorem010102 general mathematicsRepresentation (systemics)Mathematical Physics (math-ph)16. Peace & justice47A07 47A55 15A63 46C20Functional Analysis (math.FA)Mathematics - Functional AnalysisTheoryofComputation_MATHEMATICALLOGICANDFORMALLANGUAGESsymbolsIndefinite quadratic forms ; representation theorems ; perturbation theory ; Krein spaces ; Dirac operator010307 mathematical physicsPerturbation theory (quantum mechanics)
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