Commutators, Spectral Trace Identities, and Universal Estimates for Eigenvalues |
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| Authors: | Michael LevitinLeonid Parnovski |
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| Affiliation: | a Department of Mathematics, Heriot-Watt University, Riccarton, Edinburgh, EH14 4AS, United Kingdomf1m.levitin@ma.hw.ac.ukf1b Department of Mathematics, University College London, Gower Street, London, WC1E 6BT, United Kingdomf2leonid@math.ucl.ac.ukf2 |
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| Abstract: | Using simple commutator relations, we obtain several trace identities involving eigenvalues and eigenfunctions of an abstract self-adjoint operator acting in a Hilbert space. Applications involve abstract universal estimates for the eigenvalue gaps. As particular examples, we present simple proofs of the classical universal estimates for eigenvalues of the Dirichlet Laplacian, as well as of some known and new results for other differential operators and systems. We also suggest an extension of the methods to the case of non-self-adjoint operators. |
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| Keywords: | eigenvalue estimates Dirichlet eigenvalues Neumann eigenvalues spectral gap elasticity commutator identities Payne-Pó lya-Weinberger inequalities Hile-Protter inequality Yang inequalities Schrö dinger operator Laplace operator Thomas-Reiche-Kuhn sum rule. |
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