EN
On the $\lambda _{h}^{\alpha }-$Statistical Convergence of the Functions Defined on the Time Scale
Abstract
In this paper, we have introduced the concepts $\lambda _{h}^{\alpha }$% -density of a subset of the time scale $\mathbb{T}$ and $\lambda _{h}^{\alpha }$-statistical convergence of order $\alpha $ $(0<\alpha \leq 1) $ of $\Delta -$ measurable function $f$ \ defined on the time scale $% \mathbb{T}$ with the help of modulus function $h$ and $\lambda =(\lambda _{n})$ sequences. Later, we have discussed the connection between classical convergence, $\lambda $-statistical convergence and $\lambda _{h}^{\alpha }$% -statistical convergence. In addition, we have seen that $f$ is strongly $% \lambda _{h}^{\alpha }$-Cesaro summable on T then $f$ is $\lambda _{h}^{\alpha }$-statistical convergent of order $\alpha .$
Keywords
References
- [1] A.Aizpuru, M.C.Listán-Garcĭa and F.Rambla-Borreno, Density by moduli and statistical convergence, Quaest. Math. 37 4 (2014) 525--530.
- [2] G. Aslim, G.Sh. Guseinov, Weak semirings, ω-semirings, and measures, Bull. Allahabad Math. Soc. 14 (1999) 1--20.
- [3] A.Cabada and D.R.Vivero, Expression of the Lebesque Δ-integral on time scales as a usual Lebesque integral; application to the calculus of Δ-antiderivates, Math. Comput. Modelling, 43 (2006) 194--207.
- [4] H. Fast, Sur la convergence statitique, Colloq. Math. 2 (1951) 241--244.
- [5] J.A.Fridy, On statistical convergence, Analysis, 5 (1985) 301--313.
- [6] M.Gürdal, M.O.Özgür, A generalized statistical convergence via moduli, Electron. J. Math. Anal. Applic. 3 2 (2015) 173--178.
- [7] G.Sh.Guseinov, Integration on time scales, J. Math. Anal. Appl. 285 1 (2003) 107--127.
- [9] S.Hilger: Ein maßkettenkalkül mit anwendung auf zentrumsmanningfaltigkeilen Ph.D thesis, Universitat, Würzburg (1989).
Details
Primary Language
English
Subjects
Software Engineering (Other)
Journal Section
Research Article
Publication Date
June 15, 2019
Submission Date
December 4, 2019
Acceptance Date
December 9, 2019
Published in Issue
Year 2019 Volume: 1 Number: 1
APA
Tok, N., & Basarır, M. (2019). On the $\lambda _{h}^{\alpha }-$Statistical Convergence of the Functions Defined on the Time Scale. Proceedings of International Mathematical Sciences, 1(1), 1-10. https://izlik.org/JA28ND36XD
AMA
1.Tok N, Basarır M. On the $\lambda _{h}^{\alpha }-$Statistical Convergence of the Functions Defined on the Time Scale. PIMS. 2019;1(1):1-10. https://izlik.org/JA28ND36XD
Chicago
Tok, Name, and Metin Basarır. 2019. “On the $\lambda _{h}^{\alpha }-$Statistical Convergence of the Functions Defined on the Time Scale”. Proceedings of International Mathematical Sciences 1 (1): 1-10. https://izlik.org/JA28ND36XD.
EndNote
Tok N, Basarır M (June 1, 2019) On the $\lambda _{h}^{\alpha }-$Statistical Convergence of the Functions Defined on the Time Scale. Proceedings of International Mathematical Sciences 1 1 1–10.
IEEE
[1]N. Tok and M. Basarır, “On the $\lambda _{h}^{\alpha }-$Statistical Convergence of the Functions Defined on the Time Scale”, PIMS, vol. 1, no. 1, pp. 1–10, June 2019, [Online]. Available: https://izlik.org/JA28ND36XD
ISNAD
Tok, Name - Basarır, Metin. “On the $\lambda _{h}^{\alpha }-$Statistical Convergence of the Functions Defined on the Time Scale”. Proceedings of International Mathematical Sciences 1/1 (June 1, 2019): 1-10. https://izlik.org/JA28ND36XD.
JAMA
1.Tok N, Basarır M. On the $\lambda _{h}^{\alpha }-$Statistical Convergence of the Functions Defined on the Time Scale. PIMS. 2019;1:1–10.
MLA
Tok, Name, and Metin Basarır. “On the $\lambda _{h}^{\alpha }-$Statistical Convergence of the Functions Defined on the Time Scale”. Proceedings of International Mathematical Sciences, vol. 1, no. 1, June 2019, pp. 1-10, https://izlik.org/JA28ND36XD.
Vancouver
1.Name Tok, Metin Basarır. On the $\lambda _{h}^{\alpha }-$Statistical Convergence of the Functions Defined on the Time Scale. PIMS [Internet]. 2019 Jun. 1;1(1):1-10. Available from: https://izlik.org/JA28ND36XD
