$\mathcal{I}$-LIMIT SUPERIOR AND $\mathcal{I}$-LIMIT INFERIOR FOR SEQUENCES OF FUZZY NUMBERS

Ozer Talo; Erdinc Dundar

EN

$\mathcal{I}$-LIMIT SUPERIOR AND $\mathcal{I}$-LIMIT INFERIOR FOR SEQUENCES OF FUZZY NUMBERS

Abstract

The statistical limit inferior and limit superior for sequences of fuzzy numbers have been introduced by Aytar, Pehlivan and Mammadov [Statistical limit inferior and limit superior for sequences of fuzzy numbers, Fuzzy Sets and Systems, 157(7) (2006) 976--985]. In this paper, we extend concepts of statistical limit superior and inferior to $\mathcal{I}$-limit superior and $\mathcal{I}$-inferior for a sequence of fuzzy numbers. Also, we prove some basic properties.

Keywords

Fuzzy numbers,sequences of fuzzy numbers,Ideal convergence,Ideal limit superior and inferior

References

[1] H. Altinok, R. Colak and Y. AltIn, On the class of-statistically convergent dierence sequences of fuzzy numbers, Soft Computing 16(6)(2012),1029{1034.
[2] Y. Altn , M. Mursaleen, H. Altnok, Statistical summability (C; 1)-for sequences of fuzzy real numbers and a Tauberian theorem, Journal of Intelligent and Fuzzy Systems 21(2010), 379{384.
[3] S. Aytar, S. Pehlivan, Statistical cluster and extreme limit points of sequences of fuzzy numbers, Information Sciences, 177(16) (2007) 3290{3296.
[4] S. Aytar, S. Pehlivan, M. Mammadov, The core of a sequence of fuzzy numbers, Fuzzy Sets and Systems, 159 (24) (2008) 3369{3379.
[5] S. Aytar, M. Mammadov, S. Pehlivan, Statistical limit inferior and limit superior for sequences of fuzzy numbers, Fuzzy Sets and Systems, 157(7) (2006) 976{985.
[6] S. Aytar, S. Pehlivan, On I-convergent sequences of real numbers. Ital. J. Pure Appl. Math. 21 (2007), 191{196.
[7] H. Altinok, M. Mursaleen, -Statistical Boundedness for Sequences of fuzzy numbers, Taiwanese Journal of Mathematics 15(5) (2011), 2081{2093
[8] F.Bas.ar, Summability Theory and its Applications, in: Monographs, Bentham Science Publishers, (2011), e-books.

[9] I. Canak, On the Riesz mean of sequences of fuzzy real numbers, Journal of Intelligent and Fuzzy Systems 26 (6) 2014, 2685{2688
[10] K. Demirci, I- limit superior and limit inferior, Mathematical Communications, 6 (2001), 165{172
[11] E. Dundar, O. Talo, I2-convergence of double sequences of fuzzy numbers, Iranian Journal of Fuzzy Systems Vol. 10, No. 3, (2013) pp. 37-50
[12] J. A. R. Freedman, J. J. Sember, Densities and summability, Pacic Journal of Mathematics, 95 (1981), 293{305.
[13] B. Hazarika, Lacunary difference ideal convergent sequence spaces of fuzzy numbers, Journal of Intelligent & Fuzzy Systems 25 (2013), 157{166
[14] B. Hazarika, On -uniform density and ideal convergent sequences of fuzzy real numbers, Journal of Intelligent & Fuzzy Systems, 26 (2014), 793{799.
[15] D. H. Hong, E. L. Moon, J. D. Kim, A note on the core of fuzzy numbers, Applied Mathematics Letters, 23(5) (2010), 651{655. [16] P. Kostyrko, T. Salat and W. Wilczynski, I-convergence, Real Analysis Exchange, 26(2) (2000), 669{686.
[17] P. Kostyrko, M. Macaj, T. Salat, M. Sleziak,I-convergence and extremal I-limit points, Mathematica Slovaca, 55 (2005), 443{464.
[18] V. Kumar, K. Kumar, On the ideal convergence of sequences of fuzzy numbers, Information Sciences, 178(2008), 4670{4678.
[19] V. Kumar, A. Sharma, K. Kumar, N. Singh, On I-Limit Points and I-Cluster Points of Sequences of Fuzzy Numbers, International Mathematical Forum, 57(2) (2007), 2815{2822.
[20] H. Li, C.Wu, The integral of a fuzzy mapping over a directed line, Fuzzy Sets and Systems, 158 (2007), 2317{2338.
[21] M. Matloka, Sequences of fuzzy numbers, BUSEFAL, 28(1986), 28{37.
[22] S. Nanda, On sequences of fuzzy numbers, Fuzzy Sets and Systems, 33 (1989), 123{126.
[23] F. Nuray and E. Savas, Statistical convergence of fuzzy numbers, Mathematica Slovaca 45(3) (1995), 269{273.
[24] T. Salt, B.C. Tripathy, M. Ziman, On I-convergence eld, Italian Journal of Pure and Applied Mathematics 17 (2005), 45{54.
[25] E. Savas, Some double lacunary I-convergent sequence spaces of fuzzy numbers dened by Orlicz function, Journal of Intelligent & Fuzzy Systems 23 (2012), 249{257.
[26] E. Savas,A note on double lacunary statistical I-convergence of fuzzy numbers, Soft Computing (2012), 16 591{595.
[27] E. Savas, On convergent double sequence spaces of fuzzy numbers dened by ideal and Orlicz function, Journal of Intelligent & Fuzzy Systems 26 (2014), 1869{1877
[28] C. -x. Wu, C.Wu, The supremum and inmum of the set of fuzzy numbers and its application, Journal of Mathematical Analysis and Applications, 210 (1997), 499-511.
[29] O. Talo, Talo, C. Cakan, The extension of the Knopp core theorem to the sequences of fuzzy numbers, Information Sciences 276 (2014), 10{20.
[30] O. Talo, Some properties of limit inferior and limit superior for sequences of fuzzy real numbers, Information Sciences, 279(2014), 560{568
[31] O. Talo, F. Basar, On the Slowly Decreasing Sequences of Fuzzy Numbers, Abstract and Applied Analysis Article ID 891986 doi:10.1155/2013/891986 (2013), 1-7.
[32] B.C. Tripathy, A.J. Dutta, Lacunary bounded variation sequence of fuzzy real numbers, Journal of Intelligent and Fuzzy Systems 24(1)(2013), 185{189.
[33] B.C. Tripathy, M. Sen, On fuzzy I-convergent dierence sequence space, Journal of Intelligent & Fuzzy Systems 25(3) (2013), 643{647.

Details

Primary Language

English

Subjects

Engineering

Journal Section

Research Article

Authors

Ozer Talo This is me
Türkiye

Erdinc Dundar
Türkiye

Publication Date

October 1, 2016

Submission Date

June 3, 2014

Acceptance Date

-

Published in Issue

Year 2016 Volume: 4 Number: 2

IZ

https://izlik.org/JA65PA54YR

Cite

RIS / Bibtex

APA

Talo, O., & Dundar, E. (2016). $\mathcal{I}$-LIMIT SUPERIOR AND $\mathcal{I}$-LIMIT INFERIOR FOR SEQUENCES OF FUZZY NUMBERS. Konuralp Journal of Mathematics, 4(2), 183-192. https://izlik.org/JA65PA54YR

AMA

1.Talo O, Dundar E. $\mathcal{I}$-LIMIT SUPERIOR AND $\mathcal{I}$-LIMIT INFERIOR FOR SEQUENCES OF FUZZY NUMBERS. Konuralp J. Math. 2016;4(2):183-192. https://izlik.org/JA65PA54YR

Chicago

Talo, Ozer, and Erdinc Dundar. 2016. “$\mathcal{I}$-LIMIT SUPERIOR AND $\mathcal{I}$-LIMIT INFERIOR FOR SEQUENCES OF FUZZY NUMBERS”. Konuralp Journal of Mathematics 4 (2): 183-92. https://izlik.org/JA65PA54YR.

EndNote

Talo O, Dundar E (October 1, 2016) $\mathcal{I}$-LIMIT SUPERIOR AND $\mathcal{I}$-LIMIT INFERIOR FOR SEQUENCES OF FUZZY NUMBERS. Konuralp Journal of Mathematics 4 2 183–192.

IEEE

[1]O. Talo and E. Dundar, “$\mathcal{I}$-LIMIT SUPERIOR AND $\mathcal{I}$-LIMIT INFERIOR FOR SEQUENCES OF FUZZY NUMBERS”, Konuralp J. Math., vol. 4, no. 2, pp. 183–192, Oct. 2016, [Online]. Available: https://izlik.org/JA65PA54YR

ISNAD

Talo, Ozer - Dundar, Erdinc. “$\mathcal{I}$-LIMIT SUPERIOR AND $\mathcal{I}$-LIMIT INFERIOR FOR SEQUENCES OF FUZZY NUMBERS”. Konuralp Journal of Mathematics 4/2 (October 1, 2016): 183-192. https://izlik.org/JA65PA54YR.

JAMA

1.Talo O, Dundar E. $\mathcal{I}$-LIMIT SUPERIOR AND $\mathcal{I}$-LIMIT INFERIOR FOR SEQUENCES OF FUZZY NUMBERS. Konuralp J. Math. 2016;4:183–192.

MLA

Talo, Ozer, and Erdinc Dundar. “$\mathcal{I}$-LIMIT SUPERIOR AND $\mathcal{I}$-LIMIT INFERIOR FOR SEQUENCES OF FUZZY NUMBERS”. Konuralp Journal of Mathematics, vol. 4, no. 2, Oct. 2016, pp. 183-92, https://izlik.org/JA65PA54YR.

Vancouver

1.Ozer Talo, Erdinc Dundar. $\mathcal{I}$-LIMIT SUPERIOR AND $\mathcal{I}$-LIMIT INFERIOR FOR SEQUENCES OF FUZZY NUMBERS. Konuralp J. Math. [Internet]. 2016 Oct. 1;4(2):183-92. Available from: https://izlik.org/JA65PA54YR