| Item type | Current location | Collection | Call number | Copy number | Status | Date due | Barcode |
|---|---|---|---|---|---|---|---|
| E-Books | Biblioteca da FCTUNL | Não Ficção | QA614.8 FCT 97896 (Browse shelf) | 1 | Available |
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| QA614.8. FCT 97369 Maximum principles and geometric applications | QA614.8 FCT 97438 Geometry, analysis and probability | QA614.8. FCT 97803 Introduction to complex theory of differential equations | QA614.8 FCT 97896 Covariant schrödinger semigroups on riemannian manifolds | QA614.8. FCT 98413 Geometric methods in physics XXXV | QA614.8.SPR . FCT 95538 Stability of dynamical systems | QA614.8.SPR FCT Stabilization for some fractional-evolution systems |
Colocação: Online
This monograph discusses covariant Schrödinger operators and their heat semigroups on noncompact Riemannian manifolds and aims to fill a gap in the literature, given the fact that the existing literature on Schrödinger operators has mainly focused on scalar Schrödinger operators on Euclidean spaces so far. In particular, the book studies operators that act on sections of vector bundles. In addition, these operators are allowed to have unbounded potential terms, possibly with strong local singularities. The results presented here provide the first systematic study of such operators that is sufficiently general to simultaneously treat the natural operators from quantum mechanics, such as magnetic Schrödinger operators with singular electric potentials, and those from geometry, such as squares of Dirac operators that have smooth but endomorphism-valued and possibly unbounded potentials. The book is largely self-contained, making it accessible for graduate and postgraduate students alike. Since it also includes unpublished findings and new proofs of recently published results, it will also be interesting for researchers from geometric analysis, stochastic analysis, spectral theory, and mathematical physics.
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