Search results for " 47A55"

showing 5 items of 5 documents

Resonances over a potential well in an island

2020

In this paper we study the distribution of scattering resonances for a multidimensional semi-classical Schr\"odinger operator, associated to a potential well in an island at energies close to the maximal one that limits the separation of the well and the surrounding sea.

Condensed Matter::Quantum GasesDistribution (number theory)Condensed Matter::OtherScatteringGeneral MathematicsOperator (physics)FOS: Physical sciencesMathematical Physics (math-ph)Mathematics::Spectral TheoryCondensed Matter::Mesoscopic Systems and Quantum Hall Effectsymbols.namesakeMathematics - Analysis of PDEsQuantum mechanicssymbolsFOS: Mathematics35J10 35B34 35P20 47A55Schrödinger's catMathematical PhysicsMathematicsAnalysis of PDEs (math.AP)

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Interior eigenvalue density of large bi-diagonal matrices subject to random perturbations

2017

We study the spectrum of large a bi-diagonal Toeplitz matrix subject to a Gaussian random perturbation with a small coupling constant. We obtain a precise asymptotic description of the average density of eigenvalues in the interior of the convex hull of the range symbol.

Mathematics - Spectral Theory[ MATH ] Mathematics [math]MSC: 15B52 (47A10 47A55)FOS: Mathematics[MATH] Mathematics [math][MATH]Mathematics [math]Spectral Theory (math.SP)

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On a generalisation of Krein's example

2017

We generalise a classical example given by Krein in 1953. We compute the difference of the resolvents and the difference of the spectral projections explicitly. We further give a full description of the unitary invariants, i.e., of the spectrum and the multiplicity. Moreover, we observe a link between the difference of the spectral projections and Hankel operators.

Pure mathematicsClassical exampleApplied Mathematics010102 general mathematicsFOS: Physical sciencesMultiplicity (mathematics)Mathematical Physics (math-ph)01 natural sciencesUnitary stateFunctional Analysis (math.FA)Primary 47B15 Secondary 47A55 35J25 47A10 47B35Mathematics - Functional AnalysisMathematics - Spectral Theory0103 physical sciencesFOS: MathematicsComputer Science::Symbolic Computation010307 mathematical physics0101 mathematicsSpectral Theory (math.SP)Mathematical PhysicsAnalysisMathematicsJournal of Mathematical Analysis and Applications

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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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Interior Eigenvalue Density of Jordan Matrices with Random Perturbations

2017

International audience; We study the eigenvalue distribution of a large Jordan block subject to a small random Gaussian perturbation. A result by E. B. Davies and M. Hager shows that as the dimension of the matrix gets large, with probability close to 1, most of the eigenvalues are close to a circle.We study the expected eigenvalue density of the perturbed Jordan block in the interior of that circle and give a precise asymptotic description.; Nous étudions la distribution de valeurs propres d’un grand bloc de Jordan soumis à une petite perturbation gaussienne aléatoire. Un résultat de E. B. Davies et M. Hager montre que quand la dimension de la matrice devient grande, alors avec probabilité…

[ MATH ] Mathematics [math]Jordan matrixSpectral theoryGaussian010102 general mathematicsMathematical analysisPerturbation (astronomy)Mathematics::Spectral Theory01 natural sciences010104 statistics & probabilityMatrix (mathematics)symbols.namesakesymbolsRandom perturbations[MATH]Mathematics [math]MSC: 47A10 47B80 47H40 47A550101 mathematicsDivide-and-conquer eigenvalue algorithmSpectral theoryEigenvalue perturbationEigenvalues and eigenvectorsNon-self-adjoint operatorsMathematics

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