Maximally Accretive Differential Operators of First Order in the Weighted Hilbert Spaces

AKBABA, ÜMMÜGÜLSÜN; Al, P.

doi:10.1134/s1995080221120040

Maximally Accretive Differential Operators of First Order in the Weighted Hilbert Spaces

AKBABA Ü., Al P. I.

LOBACHEVSKII JOURNAL OF MATHEMATICS, vol.42, no.12, pp.2707-2713, 2021 (ESCI)

Publication Type: Article / Article
Volume: 42 Issue: 12
Publication Date: 2021
Doi Number: 10.1134/s1995080221120040
Journal Name: LOBACHEVSKII JOURNAL OF MATHEMATICS
Journal Indexes: Emerging Sources Citation Index (ESCI), Scopus, zbMATH
Page Numbers: pp.2707-2713
Keywords: accretive differential operator, self adjoint differential operator, deficiency index, space of boundary values, spectrum
Karadeniz Technical University Affiliated: Yes

Abstract

Our main goal in this paper is to investigate some spectral properties of all maximally accretive extensions of the minimal operator in the weighted Hilbert spaces of vector functions. We construct the minimal and maximal operators generated by the first order differential operator expression in the weighted Hilbert space of vector functions at finite interval with the use of standard technique. In this case, the minimal operator is accretive but not maximal. Using the Calkin-Gorbachuk method, the general form of all maximally accretive extensions of this minimal operator in terms of boundary conditions is obtained. We also investigate the structure of the spectrum set such maximally accretive extensions of this type of minimal operator.