C. Fischbacher, S. N. Naboko, I. Wood, “Complete nonselfadjointness for Schrödinger operators on the semi-axis”, Algebra i Analiz, 35:1 (2023), 283–303; St. Petersburg Math. J., 35:1 (2024), 217

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Algebra i Analiz, 2023, Volume 35, Issue 1, Pages 283–303 (Mi aa1855)

Research Papers

Complete nonselfadjointness for Schrödinger operators on the semi-axis

C. Fischbacher^a, S. N. Naboko^b, I. Wood^c

^a Department of Mathematics, Baylor University, Sid Richhardson Bldg., 1410 S., 4th Street, Waco, TX 76706, USA
^b Department of Math. Physics, Institute of Physics, St. Petersburg State University, 1 Ulianovskaia, St. Petergoff, St. Petersburg, 198504, Russia
^c School of Mathematics, Statistics and Actuarial Sciences, University of Kent, Canterbury, CT2 7FS, UK

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Abstract: This note is devoted to the study of complete nonselfadjointness for all maximally dissipative extensions of a Schrödinger operator on a half-line with dissipative bounded potential and dissipative boundary condition. It is shown that all maximally dissipative extensions that preserve the differential expression are completely nonselfadjoint. However, it is possible for maximally dissipative extensions to have a one-dimensional reducing subspace on which the operator is selfadjoint. A characterisation of these extensions and the corresponding subspaces is given, accompanied by a specific example.

Keywords: maximally dissipative extension, limit-point Schrödinger operator, selfadjoint dilation, dissipative potential.

Received: 22.08.2021

English version:
St. Petersburg Mathematical Journal, 2024, Volume 35, Issue 1, Pages 217–232
DOI: https://doi.org/10.1090/spmj/1802

Document Type: Article

Language: English

Citation: C. Fischbacher, S. N. Naboko, I. Wood, “Complete nonselfadjointness for Schrödinger operators on the semi-axis”, Algebra i Analiz, 35:1 (2023), 283–303; St. Petersburg Math. J., 35:1 (2024), 217–232

Citation in format AMSBIB

\Bibitem{FisNabWoo23}

\by C.~Fischbacher, S.~N.~Naboko, I.~Wood

\paper Complete nonselfadjointness for Schr\"odinger operators on the semi-axis

\jour Algebra i Analiz

\yr 2023

\vol 35

\issue 1

\pages 283--303

\mathnet{http://mi.mathnet.ru/aa1855}

\transl

\jour St. Petersburg Math. J.

\yr 2024

\vol 35

\issue 1

\pages 217--232

\crossref{https://doi.org/10.1090/spmj/1802}

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References:	22
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