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Accretive Canonical Type Quasi-Differential Operators for First Order

Yıl 2018, Cilt: 10, 43 - 49, 29.12.2018

Öz

It is known that a linear closed densely defined operator in any Hilbert space   is called accretive if its real part is non-negative and maximal accretive if it is accretive and it does not have any proper accretive extension [1].

Note that the study of abstract extension problems for operators on Hilbert spaces goes at least back to J.von Neumann [2] such that in [2] a full characterization of all selfadjoint extensions of a given closed symmetric operator with equal deficiency indices was investigated.  

Class of accretive operators is an important class of non-selfadjoint operators in the operator theory. Note that spectrum set of the accretive operators lies in right half-plane.

The maximal accretive extensions of the minimal operator generated by regular differential-operator expression in Hilbert space of vector-functions defined in one finite interval case and their spectral analysis have been studied by V. V. Levchuk [3].

In this work, using the method Calkin-Gorbachuk all maximal accretive extensions of the minimal operator generated by linear canonical type quasi-differential operator expression in the weighted Hilbert space of the vector functions defined at right semi-axis are described. Lastly, geometry of spectrum set of these type extensions will be investigated.

Kaynakça

  • Arlinskii, Yu. M., On proper accretive extensions of positive linear relations , Ukrainian Mat. Zh. 47(6) (1995), 723-730.
  • Arlinskii, Yu. M., Abstract boundary conditions for maximal sectorial extensions of sectorial operators , Math. Nachr. 209 (2000), 5-36.
  • Arlinskii, Yu. M., Operator Methods for Boundary Value Problems, London Math. Soc. Lecture Note Ser., 404, Cambridge Univ. Press, Londan, 2012.
  • Arlinskii, Yu. M., Kovalev, Yu., Tsekanovskii, E., Accretive and sectorial extensions of nonnegative symmetric operators , Complex Anal. Oper. Theory 6 (2012), 677-718.
  • Arlinskii, Yu. M., Popov, A. B., m-Accretive extensions of a sectorial operator , Sbornik: Mathematics 204 (2013), 1085-1121.
  • Evans, W. D., On the extension problem for accretive di_erential operators, Journal of Functional Analysis 63 (1985), 276-298.
  • Fischbacher, C., The nonproper dissipative extensions of a dual pair , Trans. Amer. Math. Soc. 370 (2018), 8895-8920.
  • Gorbachuk, V. I., Gorbachuk, M. L., Boundary Value Problems for Operator Di_erential Equations, Kluwer Academic Publisher, Dordrecht, 1991.
  • Hörmander, L., On the theory of general partial di_erential operators, Acta Mathematica 94(1955), 161-248.
  • Kato, T., Perturbation Theory for Linear Operators, Springer-Verlag Inc., New York, 1966.
  • Levchuk, V. V., Smooth maximally dissipative boundary-value problems for a parabolic equation in a Hilbert space, Ukrainian Mathematic Journal 35(4) (1983), 502-507.
  • Von Neumann, J., Allgemeine eigenwerttheorie hermitescher funktionaloperatoren, Math. Ann. 102 (1929-1931), 49-131.
Yıl 2018, Cilt: 10, 43 - 49, 29.12.2018

Öz

Kaynakça

  • Arlinskii, Yu. M., On proper accretive extensions of positive linear relations , Ukrainian Mat. Zh. 47(6) (1995), 723-730.
  • Arlinskii, Yu. M., Abstract boundary conditions for maximal sectorial extensions of sectorial operators , Math. Nachr. 209 (2000), 5-36.
  • Arlinskii, Yu. M., Operator Methods for Boundary Value Problems, London Math. Soc. Lecture Note Ser., 404, Cambridge Univ. Press, Londan, 2012.
  • Arlinskii, Yu. M., Kovalev, Yu., Tsekanovskii, E., Accretive and sectorial extensions of nonnegative symmetric operators , Complex Anal. Oper. Theory 6 (2012), 677-718.
  • Arlinskii, Yu. M., Popov, A. B., m-Accretive extensions of a sectorial operator , Sbornik: Mathematics 204 (2013), 1085-1121.
  • Evans, W. D., On the extension problem for accretive di_erential operators, Journal of Functional Analysis 63 (1985), 276-298.
  • Fischbacher, C., The nonproper dissipative extensions of a dual pair , Trans. Amer. Math. Soc. 370 (2018), 8895-8920.
  • Gorbachuk, V. I., Gorbachuk, M. L., Boundary Value Problems for Operator Di_erential Equations, Kluwer Academic Publisher, Dordrecht, 1991.
  • Hörmander, L., On the theory of general partial di_erential operators, Acta Mathematica 94(1955), 161-248.
  • Kato, T., Perturbation Theory for Linear Operators, Springer-Verlag Inc., New York, 1966.
  • Levchuk, V. V., Smooth maximally dissipative boundary-value problems for a parabolic equation in a Hilbert space, Ukrainian Mathematic Journal 35(4) (1983), 502-507.
  • Von Neumann, J., Allgemeine eigenwerttheorie hermitescher funktionaloperatoren, Math. Ann. 102 (1929-1931), 49-131.
Toplam 12 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Konular Mühendislik
Bölüm Makaleler
Yazarlar

Pembe Ipek Al

Zameddin Ismaılov

Yayımlanma Tarihi 29 Aralık 2018
Yayımlandığı Sayı Yıl 2018 Cilt: 10

Kaynak Göster

APA Ipek Al, P., & Ismaılov, Z. (2018). Accretive Canonical Type Quasi-Differential Operators for First Order. Turkish Journal of Mathematics and Computer Science, 10, 43-49.
AMA Ipek Al P, Ismaılov Z. Accretive Canonical Type Quasi-Differential Operators for First Order. TJMCS. Aralık 2018;10:43-49.
Chicago Ipek Al, Pembe, ve Zameddin Ismaılov. “Accretive Canonical Type Quasi-Differential Operators for First Order”. Turkish Journal of Mathematics and Computer Science 10, Aralık (Aralık 2018): 43-49.
EndNote Ipek Al P, Ismaılov Z (01 Aralık 2018) Accretive Canonical Type Quasi-Differential Operators for First Order. Turkish Journal of Mathematics and Computer Science 10 43–49.
IEEE P. Ipek Al ve Z. Ismaılov, “Accretive Canonical Type Quasi-Differential Operators for First Order”, TJMCS, c. 10, ss. 43–49, 2018.
ISNAD Ipek Al, Pembe - Ismaılov, Zameddin. “Accretive Canonical Type Quasi-Differential Operators for First Order”. Turkish Journal of Mathematics and Computer Science 10 (Aralık 2018), 43-49.
JAMA Ipek Al P, Ismaılov Z. Accretive Canonical Type Quasi-Differential Operators for First Order. TJMCS. 2018;10:43–49.
MLA Ipek Al, Pembe ve Zameddin Ismaılov. “Accretive Canonical Type Quasi-Differential Operators for First Order”. Turkish Journal of Mathematics and Computer Science, c. 10, 2018, ss. 43-49.
Vancouver Ipek Al P, Ismaılov Z. Accretive Canonical Type Quasi-Differential Operators for First Order. TJMCS. 2018;10:43-9.