PT-Symmetric Schrödinger Operators with Unbounded Potentials
Autor Jan Nesemannen Limba Engleză Paperback – 14 iul 2011
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Specificații
ISBN-13: 9783834817624
ISBN-10: 3834817627
Pagini: 92
Ilustrații: VIII, 83 p.
Dimensiuni: 148 x 210 x 6 mm
Greutate: 0.12 kg
Ediția:2011
Editura: Vieweg+Teubner Verlag
Colecția Vieweg+Teubner Verlag
Locul publicării:Wiesbaden, Germany
ISBN-10: 3834817627
Pagini: 92
Ilustrații: VIII, 83 p.
Dimensiuni: 148 x 210 x 6 mm
Greutate: 0.12 kg
Ediția:2011
Editura: Vieweg+Teubner Verlag
Colecția Vieweg+Teubner Verlag
Locul publicării:Wiesbaden, Germany
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Public țintă
ResearchNotă biografică
Dr. Jan Nesemann holds a master’s degree in mathematics as well as in business administration. He received his PhD in mathematics from the University of Bern under the guidance of Prof. Dr. Christiane Tretter. Currently he works as an actuarial and financial services consultant in Zurich.
Textul de pe ultima copertă
Following the pioneering work of Carl M. Bender et al. (1998), there has been an increasing interest in theoretical physics in so-called PT-symmetric Schrödinger operators. In the physical literature, the existence of Schrödinger operators with PT-symmetric complex potentials having real spectrum was considered a surprise and many examples of such potentials were studied in the sequel. From a mathematical point of view, however, this is no surprise at all – provided one is familiar with the theory of self-adjoint operators in Krein spaces.
Jan Nesemann studies relatively bounded perturbations of self-adjoint operators in Krein spaces with real spectrum. The main results provide conditions which guarantee the spectrum of the perturbed operator to remain real. Similar results are established for relatively form-bounded perturbations and for pseudo-Friedrichs extensions. The author pays particular attention to the case when the unperturbed self-adjoint operator has infinitely many spectral gaps, either between eigenvalues or, more generally, between separated parts of the spectrum.
Jan Nesemann studies relatively bounded perturbations of self-adjoint operators in Krein spaces with real spectrum. The main results provide conditions which guarantee the spectrum of the perturbed operator to remain real. Similar results are established for relatively form-bounded perturbations and for pseudo-Friedrichs extensions. The author pays particular attention to the case when the unperturbed self-adjoint operator has infinitely many spectral gaps, either between eigenvalues or, more generally, between separated parts of the spectrum.