EN
Compactness of Matrix Operators on the Banach Space $\ell_p(T)$
Abstract
In this study, by using the Hausdorff measure of non-compactness, we obtain the necessary and sufficient conditions for certain matrix operators on the spaces $\ell_p(T)$ and $\ell_\infty(T)$ to be compact, where $1\leq p<\infty$.
Keywords
References
- [1] E. Malkowsky, V. Rakocevic, An introduction into the theory of sequence spaces and measure of noncompactness, Zbornik radova, Matematicki Inst. SANU, Belgrade, 9(17) (2000), 143–234.
- [2] V. Rakocevic, Measures of noncompactness and some applications, Filomat, 12(2) (1998), 87–120.
- [3] M. Başarır, E. E. Kara, On compact operators on the Riesz B(m)-difference sequence spaces, Iran. J. Sci. Technol., 35(A4) (2011), 279–285.
- [4] M. Başarır, E. E. Kara, On some difference sequence spaces of weighted means and compact operators, Ann. Funct. Anal., 2 (2011), 114–129.
- [5] M. Başarır, E. E. Kara, On the B-difference sequence space derived by generalized weighted mean and compact operators, J. Math. Anal. Appl., 391 (2012), 67–81.
- [6] M. Mursaleen, V. Karakaya, H. Polat, N. Şimşek, Measure of noncompactness of matrix operators on some difference sequence spaces of weighted means, Comput. Math. Appl., 62 (2011), 814–820.
- [7] M. Mursaleen, S. A. Mohiuddine, Applications of measures of noncompactness to the infinite system of differential equations in $\ell_p$ spaces, Nonlinear Anal., 75 (2012), 2111–2115.
- [8] M. Mursaleen, A. K. Noman, Applications of Hausdorff measure of noncompactness in the spaces of generalized means, Math. Inequal. Appl., 16(1) (2013), 207–220.
Details
Primary Language
English
Subjects
Engineering
Journal Section
Conference Paper
Publication Date
December 14, 2018
Submission Date
November 13, 2018
Acceptance Date
December 3, 2018
Published in Issue
Year 1970 Volume: 1 Number: 1
APA
İlkhan, M., & Kara, E. E. (2018). Compactness of Matrix Operators on the Banach Space $\ell_p(T)$. Conference Proceedings of Science and Technology, 1(1), 11-15. https://izlik.org/JA83UG82AH
AMA
1.İlkhan M, Kara EE. Compactness of Matrix Operators on the Banach Space $\ell_p(T)$. Conference Proceedings of Science and Technology. 2018;1(1):11-15. https://izlik.org/JA83UG82AH
Chicago
İlkhan, Merve, and Emrah Evren Kara. 2018. “Compactness of Matrix Operators on the Banach Space $\ell_p(T)$”. Conference Proceedings of Science and Technology 1 (1): 11-15. https://izlik.org/JA83UG82AH.
EndNote
İlkhan M, Kara EE (December 1, 2018) Compactness of Matrix Operators on the Banach Space $\ell_p(T)$. Conference Proceedings of Science and Technology 1 1 11–15.
IEEE
[1]M. İlkhan and E. E. Kara, “Compactness of Matrix Operators on the Banach Space $\ell_p(T)$”, Conference Proceedings of Science and Technology, vol. 1, no. 1, pp. 11–15, Dec. 2018, [Online]. Available: https://izlik.org/JA83UG82AH
ISNAD
İlkhan, Merve - Kara, Emrah Evren. “Compactness of Matrix Operators on the Banach Space $\ell_p(T)$”. Conference Proceedings of Science and Technology 1/1 (December 1, 2018): 11-15. https://izlik.org/JA83UG82AH.
JAMA
1.İlkhan M, Kara EE. Compactness of Matrix Operators on the Banach Space $\ell_p(T)$. Conference Proceedings of Science and Technology. 2018;1:11–15.
MLA
İlkhan, Merve, and Emrah Evren Kara. “Compactness of Matrix Operators on the Banach Space $\ell_p(T)$”. Conference Proceedings of Science and Technology, vol. 1, no. 1, Dec. 2018, pp. 11-15, https://izlik.org/JA83UG82AH.
Vancouver
1.Merve İlkhan, Emrah Evren Kara. Compactness of Matrix Operators on the Banach Space $\ell_p(T)$. Conference Proceedings of Science and Technology [Internet]. 2018 Dec. 1;1(1):11-5. Available from: https://izlik.org/JA83UG82AH