The Spectral Theory of Toeplitz Operators. (AM-99), Volume 99 / / L. Boutet de Monvel, Victor Guillemin
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| Autore: |
Boutet de Monvel L.
|
| Titolo: |
The Spectral Theory of Toeplitz Operators. (AM-99), Volume 99 / / L. Boutet de Monvel, Victor Guillemin
|
| Pubblicazione: | Princeton, NJ : , : Princeton University Press, , [2016] |
| ©1981 | |
| Descrizione fisica: | 1 online resource (168 pages) |
| Disciplina: | 515.7/246 |
| Soggetto topico: | Toeplitz operators |
| Spectral theory (Mathematics) | |
| Soggetto non controllato: | Algebraic variety |
| Asymptotic analysis | |
| Asymptotic expansion | |
| Big O notation | |
| Boundary value problem | |
| Change of variables | |
| Chern class | |
| Codimension | |
| Cohomology | |
| Compact group | |
| Complex manifold | |
| Complex vector bundle | |
| Connection form | |
| Contact geometry | |
| Corollary | |
| Cotangent bundle | |
| Curvature form | |
| Diffeomorphism | |
| Differentiable manifold | |
| Dimensional analysis | |
| Discrete spectrum | |
| Eigenvalues and eigenvectors | |
| Elaboration | |
| Elliptic operator | |
| Embedding | |
| Equivalence class | |
| Existential quantification | |
| Exterior (topology) | |
| Fourier integral operator | |
| Fourier transform | |
| Hamiltonian vector field | |
| Holomorphic function | |
| Homogeneous function | |
| Hypoelliptic operator | |
| Integer | |
| Integral curve | |
| Integral transform | |
| Invariant subspace | |
| Lagrangian (field theory) | |
| Lagrangian | |
| Limit point | |
| Line bundle | |
| Linear map | |
| Mathematics | |
| Metaplectic group | |
| Natural number | |
| Normal space | |
| One-form | |
| Open set | |
| Operator (physics) | |
| Oscillatory integral | |
| Parallel transport | |
| Parameter | |
| Parametrix | |
| Periodic function | |
| Polynomial | |
| Projection (linear algebra) | |
| Projective variety | |
| Pseudo-differential operator | |
| Q.E.D. | |
| Quadratic form | |
| Quantity | |
| Quotient ring | |
| Real number | |
| Scientific notation | |
| Self-adjoint | |
| Smoothness | |
| Spectral theorem | |
| Spectral theory | |
| Square root | |
| Submanifold | |
| Summation | |
| Support (mathematics) | |
| Symplectic geometry | |
| Symplectic group | |
| Symplectic manifold | |
| Symplectic vector space | |
| Tangent space | |
| Theorem | |
| Todd class | |
| Toeplitz algebra | |
| Toeplitz matrix | |
| Toeplitz operator | |
| Trace formula | |
| Transversal (geometry) | |
| Trigonometric functions | |
| Variable (mathematics) | |
| Vector bundle | |
| Vector field | |
| Vector space | |
| Volume form | |
| Wave front set | |
| Persona (resp. second.): | GuilleminVictor |
| Note generali: | Bibliographic Level Mode of Issuance: Monograph |
| Nota di bibliografia: | Includes bibliographical references. |
| Nota di contenuto: | Frontmatter -- TABLE OF CONTENTS -- §1. Introduction -- §2. GENERALIZED TOEPLITZ OPERATORS -- §3. FOURIER INTEGRAL OPERATORS OF HERMITE TYPE -- §4. THE METAPLECTIC REPRESENTATION -- §5. METALINEAR AND METAPLECTIC STRUCTURES ON MANIFOLDS -- §6. ISOTROPIC SUBSPACES OF SYMPLECTIC VECTOR SPACES -- §7. THE COMPOSITION THEOREM -- §8. THE PROOF OF THEOREM 7.5 -- §9. PULL-BACKS, PUSH-FORWARDS AND EXTERIOR TENSOR PRODUCTS -- §10. THE TRANSPORT EQUATION -- §11. SYMBOLIC PROPERTIES OF TOEPLITZ OPERATORS -- §12. THE TRACE FORMULA -- §13. SPECTRAL PROPERTIES OF TOEPLITZ OPERATORS -- §14. THE HILBERT POLYNOMIAL -- §15. SOME CONCLUDING REMARKS -- BIBLIOGRAPHY -- APPENDIX: QUANTIZED CONTACT STRUCTURES -- Backmatter |
| Sommario/riassunto: | The theory of Toeplitz operators has come to resemble more and more in recent years the classical theory of pseudodifferential operators. For instance, Toeplitz operators possess a symbolic calculus analogous to the usual symbolic calculus, and by symbolic means one can construct parametrices for Toeplitz operators and create new Toeplitz operators out of old ones by functional operations.If P is a self-adjoint pseudodifferential operator on a compact manifold with an elliptic symbol that is of order greater than zero, then it has a discrete spectrum. Also, it is well known that the asymptotic behavior of its eigenvalues is closely related to the behavior of the bicharacteristic flow generated by its symbol.It is natural to ask if similar results are true for Toeplitz operators. In the course of answering this question, the authors explore in depth the analogies between Toeplitz operators and pseudodifferential operators and show that both can be viewed as the "quantized" objects associated with functions on compact contact manifolds. |
| Titolo autorizzato: | The Spectral Theory of Toeplitz Operators. (AM-99), Volume 99 |
| ISBN: | 1-4008-8144-7 |
| Formato: | Materiale a stampa  |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione: | Inglese |
| Record Nr.: | 9910154743403321 |
| Lo trovi qui: | Univ. Federico II |
| Opac: | Controlla la disponibilità qui |
Serie:
Annals of mathematics studies ; ; Number 99.