Araştırma Makalesi
BibTex RIS Kaynak Göster

Characterization of a New Type of Topological Sequence Spaces and Some Properties

Yıl 2024, Sayı: 1, 116 - 122, 01.10.2024
https://doi.org/10.46810/tdfd.1413732

Öz

Examination of spaces in the field of functional analysis, especially revealing their topological and algebraic structures, is very important in terms of forming a basis for studies in the field of pure mathematics and applied sciences. In this context, topology, which was widely used only in the field of geometry at the beginning, gave a solid foundation to the fields in which it was used by causing methodological changes in all branches of mathematics over time. Frechet-Coordinate space (FK space) is a concept that has a functional role in fields such as topological sequence spaces and summability. Topological vector spaces are described as linear spaces defined by a topology that provides continuous vector space operations. If this vector space has a complete metric space structure, it is called Frechet space, and if it has a topology with continuous coordinate functions, it is called Frechet-Coordinate (FK) space. The theory of FK spaces has gained more importance in recent years and has found applications in various fields thanks to the efforts of many researchers. If the topology of an FK space can be derived from the norm, this space is called as a BK space. In this study, cs_0^λ (Δ), cs^λ (Δ), and bs^λ (Δ) difference sequence spaces are defined, and it is revealed that these spaces are BK spaces. In addition, considering the topological properties of these spaces, some spaces that are isomorphic and their duals have been determined.

Kaynakça

  • Ng PN, Lee PY. Cesaro sequence spaces of non-absolute type. Commentationes Mathematicae Prace Matematyczne. 1978; 20(2): 429-433.
  • Wang CS. On Nörlund sequence spaces. Tamkang Journal of Mathematics. 1978; 9(2): 269-274.
  • Kızmaz H. On Certain Sequence Spaces. Canadian Mathematical Bulletin. 1981; 24(2): 169-76.
  • Kaya M, Furkan H. Some Topological and Geometric Properties of Some New Spaces of λ-Convergent and Bounded Series. Journal of Function Spaces. 2015; 1-10.
  • Et M. On Some Difference Sequence Spaces. Turkish Journal of Mathematics. 1993; 17: 18-24.
  • Et M, Çolak R. On Some Generalized Difference Sequence Spaces. Soochow Journal of Mathematics. 1995; 21: 377-386.
  • Et M, Esi A. On Köthe-Toeplitz Duals of Generalized Difference Sequence Spaces. Bulletin of the Malaysian Mathematical Sciences Society. 2000; 23: 25-32.
  • Maddox IJ. Elements of functional analysis. Cambridge University Press Cambridge. 1970; 1-246.
  • Başar F. Summability Theory and Its Applications. Bentham Science Publishers Istanbul; 2011.
  • Kreyszig E. Introductory Functional Analysis with Applications. John Wiley and Sons New York; 1978.
  • Kantorovich LV, Akilov GP. Functional Analysis in Normed Spaces. Pergamon Press Oxford; 1982.
  • Wilansky A. Summability through Functional Analysis. Mathematics Studies Amsterdam; 1984.
  • Malkowsky E, Pawan K.J. Sequence Spaces and Applications. Narosa Publishing House New Delhi India; 1999.
  • Boos J. Classical and Modern Method in Summability. Oxford University Press; 2000.
  • Garling DJH. The β− and α− Duality of Sequence Spaces. Proceedings – Cambridge Philosophical Society 1967; 63: 963-981.
  • Stieglitz M, Tietz H. Matrix transformationen von Folgenraumen Eine Ergebnisubersict. Math. Z. 1977; 154: 1-16.
  • Mursaleen M, Noman AK. On the Spaces of λ− Convergent and Bounded Sequences. Thai Journal of Mathematics. 2010; 8(2): 311–329.
  • Mursaleen M, Noman AK. On some new difference sequence spaces of non-absolute type. Mathematical and Computer Modelling. 2010; 52: 603-617.
Yıl 2024, Sayı: 1, 116 - 122, 01.10.2024
https://doi.org/10.46810/tdfd.1413732

Öz

Kaynakça

  • Ng PN, Lee PY. Cesaro sequence spaces of non-absolute type. Commentationes Mathematicae Prace Matematyczne. 1978; 20(2): 429-433.
  • Wang CS. On Nörlund sequence spaces. Tamkang Journal of Mathematics. 1978; 9(2): 269-274.
  • Kızmaz H. On Certain Sequence Spaces. Canadian Mathematical Bulletin. 1981; 24(2): 169-76.
  • Kaya M, Furkan H. Some Topological and Geometric Properties of Some New Spaces of λ-Convergent and Bounded Series. Journal of Function Spaces. 2015; 1-10.
  • Et M. On Some Difference Sequence Spaces. Turkish Journal of Mathematics. 1993; 17: 18-24.
  • Et M, Çolak R. On Some Generalized Difference Sequence Spaces. Soochow Journal of Mathematics. 1995; 21: 377-386.
  • Et M, Esi A. On Köthe-Toeplitz Duals of Generalized Difference Sequence Spaces. Bulletin of the Malaysian Mathematical Sciences Society. 2000; 23: 25-32.
  • Maddox IJ. Elements of functional analysis. Cambridge University Press Cambridge. 1970; 1-246.
  • Başar F. Summability Theory and Its Applications. Bentham Science Publishers Istanbul; 2011.
  • Kreyszig E. Introductory Functional Analysis with Applications. John Wiley and Sons New York; 1978.
  • Kantorovich LV, Akilov GP. Functional Analysis in Normed Spaces. Pergamon Press Oxford; 1982.
  • Wilansky A. Summability through Functional Analysis. Mathematics Studies Amsterdam; 1984.
  • Malkowsky E, Pawan K.J. Sequence Spaces and Applications. Narosa Publishing House New Delhi India; 1999.
  • Boos J. Classical and Modern Method in Summability. Oxford University Press; 2000.
  • Garling DJH. The β− and α− Duality of Sequence Spaces. Proceedings – Cambridge Philosophical Society 1967; 63: 963-981.
  • Stieglitz M, Tietz H. Matrix transformationen von Folgenraumen Eine Ergebnisubersict. Math. Z. 1977; 154: 1-16.
  • Mursaleen M, Noman AK. On the Spaces of λ− Convergent and Bounded Sequences. Thai Journal of Mathematics. 2010; 8(2): 311–329.
  • Mursaleen M, Noman AK. On some new difference sequence spaces of non-absolute type. Mathematical and Computer Modelling. 2010; 52: 603-617.
Toplam 18 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Konular Matematiksel Fizik (Diğer)
Bölüm Makaleler
Yazarlar

Gökhan Mumcu 0000-0002-5828-1963

Ahmet Ocak Akdemir 0000-0003-2466-0508

Yasin Çınar 0009-0006-5942-2445

Yayımlanma Tarihi 1 Ekim 2024
Gönderilme Tarihi 2 Ocak 2024
Kabul Tarihi 8 Temmuz 2024
Yayımlandığı Sayı Yıl 2024 Sayı: 1

Kaynak Göster

APA Mumcu, G., Akdemir, A. O., & Çınar, Y. (2024). Characterization of a New Type of Topological Sequence Spaces and Some Properties. Türk Doğa Ve Fen Dergisi(1), 116-122. https://doi.org/10.46810/tdfd.1413732
AMA Mumcu G, Akdemir AO, Çınar Y. Characterization of a New Type of Topological Sequence Spaces and Some Properties. TDFD. Ekim 2024;(1):116-122. doi:10.46810/tdfd.1413732
Chicago Mumcu, Gökhan, Ahmet Ocak Akdemir, ve Yasin Çınar. “Characterization of a New Type of Topological Sequence Spaces and Some Properties”. Türk Doğa Ve Fen Dergisi, sy. 1 (Ekim 2024): 116-22. https://doi.org/10.46810/tdfd.1413732.
EndNote Mumcu G, Akdemir AO, Çınar Y (01 Ekim 2024) Characterization of a New Type of Topological Sequence Spaces and Some Properties. Türk Doğa ve Fen Dergisi 1 116–122.
IEEE G. Mumcu, A. O. Akdemir, ve Y. Çınar, “Characterization of a New Type of Topological Sequence Spaces and Some Properties”, TDFD, sy. 1, ss. 116–122, Ekim 2024, doi: 10.46810/tdfd.1413732.
ISNAD Mumcu, Gökhan vd. “Characterization of a New Type of Topological Sequence Spaces and Some Properties”. Türk Doğa ve Fen Dergisi 1 (Ekim 2024), 116-122. https://doi.org/10.46810/tdfd.1413732.
JAMA Mumcu G, Akdemir AO, Çınar Y. Characterization of a New Type of Topological Sequence Spaces and Some Properties. TDFD. 2024;:116–122.
MLA Mumcu, Gökhan vd. “Characterization of a New Type of Topological Sequence Spaces and Some Properties”. Türk Doğa Ve Fen Dergisi, sy. 1, 2024, ss. 116-22, doi:10.46810/tdfd.1413732.
Vancouver Mumcu G, Akdemir AO, Çınar Y. Characterization of a New Type of Topological Sequence Spaces and Some Properties. TDFD. 2024(1):116-22.