Year 2019,
Volume: 7 Issue: 2, 405 - 409, 15.10.2019
Erdinç Dundar
,
Muhammed Recai Türkmen
References
- [1] Bag, T. and Samanta, S.K., Fixed point theorems in Felbin's type fuzzy normed linear spaces, J. Fuzzy Math. 16(1) (2008), 243-260.
- [2] Bede, B. and Gal, S.G., Almost periodic fuzzy-number-valued functions, Fuzzy Sets Syst. 147(2004), 385-403.
- [3] Das, P., Kostyrko, P., Wilczynski, W. and Malik, P., I and I*-convergence of double sequences, Math. Slovaca, 58(5) (2008), 605-620.
- [4] Das, P. and Malik, P., On extremal I-limit points of double sequences, Tatra Mt. Math. Publ. 40 (2008), 91-102.
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- [6] Dündar, E. and Altay, B., I2-convergence and I2-Cauchy of double sequences, Acta Mathematica Scientia, 34(2) (2014), 343-353.
- [7] Dündar, E. and Altay, B., On some properties of I2-convergence and I2-Cauchy of double sequences, Gen. Math. Notes, 7(1) (2011), 1-12.
- [8] Dündar, E. and Talo, O., I2-convergence of double sequences of fuzzy numbers, Iranian Journal of Fuzzy Systems, 10(3) (2013), 37-50
- [9] Dündar, E. and Talo, O., I2-Cauchy Double Sequences of Fuzzy Numbers, Gen. Math. Notes, 16(2) (2013), 103-114.
- [10] Fang, J.-X. and Huang, H., On the level convergence of a sequence of fuzzy numbers, Fuzzy Sets Systems, 147 (2004), 417-415.
- [11] Fast, H., Sur la convergence statistique, Colloq. Math. 2 (1951), 241-244.
- [12] Felbin, C., Finite-dimensional fuzzy normed linear space, Fuzzy Sets and Systems, 48(2) (1992), 239-248.
- [13] Hazarika, B., On ideal convergent sequences in fuzzy normed linear spaces, Afrika Matematika, 25(4) (2013), 987-999.
- [14] Hazarika, B. and Kumar, V., Fuzzy real valued I-convergent double sequences in fuzzy normed spaces, Journal of Intelligent and Fuzzy Systems, 26 (2014), 2323-2332.
- [15] Kostyrko, P., Salat, T. and Wilczynski, W., I-convergence, Real Anal. Exchange, 26(2) (2000), 669-686.
- [16] Kumar, V., On I and I*-convergence of double sequences, Math. Commun. 12 (2007), 171-181.
- [17] Kumar, V. and Kumar, K., On the ideal convergence of sequences of fuzzy numbers, Inform. Sci. 178 (2008), 4670-4678.
- [18] Matloka, M., Sequences of fuzzy numbers, Busefal, 28 (1986), 28-37.
- [19] Mizumoto, M. and Tanaka, K., Some properties of fuzzy numbers, Advances in Fuzzy Set Theory and Applications, North-Holland (Amsterdam), 1979, 153-164.
- [20] Mohiuddine, S.A., S. Şevli, H. and Cancan, M., Statistical convergence of double sequences in fuzzy normed spaces, Filomat, 26(4) (2012), 673-681.
- [21] Mursaleen, M. and Edely, O.H.H., Statistical convergence of double sequences, J. Math. Anal. Appl. 288 (2003), 223-231.
- [22] Nabiev, A., Pehlivan, S. and Gürdal, M., On I-Cauchy sequences, Taiwanese J. Math. 11(2) (2007) 569-5764.
- [23] Nanda, S., On sequences of fuzzy numbers, Fuzzy Sets Syst. 33 (1989), 123-126.
- [24] Pringsheim, A., Zur theorie der zweifach unendlichen Zahlenfolgen, Math. Ann. 53 (1900), 289-321.
- [25] Rath, D. and Tripaty, B.C., On statistically convergence and statistically Cauchy sequences, Indian J. Pure Appl. Math. 25(4) (1994), 381-386.
- [26] Saadati, R., On the I-fuzzy topological spaces, Chaos, Solitons and Fractals, 37 (2008), 1419-1426.
- [27] Salat, T., Tripaty, B.C. and Ziman, M., On I-convergence eld, Ital. J. Pure Appl. Math. 17 (2005), 45-54.
- [28] Savaş, E. and Mursaleen, M., On statistically convergent double sequences of fuzzy numbers, Inform. Sci. 162 (2004), 183{-92
- [29] S. Şençimen, C. and Pehlivan, S., Statistical convergence in fuzzy normed linear spaces,Fuzzy Sets and Systems, 159 (2008), 361-370.
- [30] Schoenberg, I.J., The integrability of certain functions and related summability methods, Amer. Math. Monthly 66 (1959), 361-375.
- [31] Tripathy, B. and Tripathy, B.C., On I-convergent double sequences, Soochow J. Math. 31 (2005), 549-560.
- [32] Turkmen, M. R. and Dündar, E., On Lacunary Statistical Convergence of Double Sequences and Some Properties in Fuzzy Normed Spaces, Journal of Intelligent and Fuzzy Systems, DOI: 10.3233/JIFS-18841 (Pre-press).
- [33] Zadeh, L.A., Fuzzy sets, Information and Control 8(1965), 338-353.
On $\mathcal{I}_2$-Convergence and $\mathcal{I}_2^{*}$-Convergence of Double Sequences in Fuzzy Normed Spaces
Year 2019,
Volume: 7 Issue: 2, 405 - 409, 15.10.2019
Erdinç Dundar
,
Muhammed Recai Türkmen
Abstract
In this paper first, we investigate some properties of $\mathcal{I}_2$-convergence in fuzzy normed spaces. After, we study some relationships between $\mathcal{I}_2$-convergence and $\mathcal{I}_2^{*}$-convergence of double sequences in fuzzy normed spaces.
References
- [1] Bag, T. and Samanta, S.K., Fixed point theorems in Felbin's type fuzzy normed linear spaces, J. Fuzzy Math. 16(1) (2008), 243-260.
- [2] Bede, B. and Gal, S.G., Almost periodic fuzzy-number-valued functions, Fuzzy Sets Syst. 147(2004), 385-403.
- [3] Das, P., Kostyrko, P., Wilczynski, W. and Malik, P., I and I*-convergence of double sequences, Math. Slovaca, 58(5) (2008), 605-620.
- [4] Das, P. and Malik, P., On extremal I-limit points of double sequences, Tatra Mt. Math. Publ. 40 (2008), 91-102.
- [5] Diamond, P. and Kloeden, P., Metric Spaces of Fuzzy Sets-Theory and Applications, World Scientic Publishing, Singapore (1994).
- [6] Dündar, E. and Altay, B., I2-convergence and I2-Cauchy of double sequences, Acta Mathematica Scientia, 34(2) (2014), 343-353.
- [7] Dündar, E. and Altay, B., On some properties of I2-convergence and I2-Cauchy of double sequences, Gen. Math. Notes, 7(1) (2011), 1-12.
- [8] Dündar, E. and Talo, O., I2-convergence of double sequences of fuzzy numbers, Iranian Journal of Fuzzy Systems, 10(3) (2013), 37-50
- [9] Dündar, E. and Talo, O., I2-Cauchy Double Sequences of Fuzzy Numbers, Gen. Math. Notes, 16(2) (2013), 103-114.
- [10] Fang, J.-X. and Huang, H., On the level convergence of a sequence of fuzzy numbers, Fuzzy Sets Systems, 147 (2004), 417-415.
- [11] Fast, H., Sur la convergence statistique, Colloq. Math. 2 (1951), 241-244.
- [12] Felbin, C., Finite-dimensional fuzzy normed linear space, Fuzzy Sets and Systems, 48(2) (1992), 239-248.
- [13] Hazarika, B., On ideal convergent sequences in fuzzy normed linear spaces, Afrika Matematika, 25(4) (2013), 987-999.
- [14] Hazarika, B. and Kumar, V., Fuzzy real valued I-convergent double sequences in fuzzy normed spaces, Journal of Intelligent and Fuzzy Systems, 26 (2014), 2323-2332.
- [15] Kostyrko, P., Salat, T. and Wilczynski, W., I-convergence, Real Anal. Exchange, 26(2) (2000), 669-686.
- [16] Kumar, V., On I and I*-convergence of double sequences, Math. Commun. 12 (2007), 171-181.
- [17] Kumar, V. and Kumar, K., On the ideal convergence of sequences of fuzzy numbers, Inform. Sci. 178 (2008), 4670-4678.
- [18] Matloka, M., Sequences of fuzzy numbers, Busefal, 28 (1986), 28-37.
- [19] Mizumoto, M. and Tanaka, K., Some properties of fuzzy numbers, Advances in Fuzzy Set Theory and Applications, North-Holland (Amsterdam), 1979, 153-164.
- [20] Mohiuddine, S.A., S. Şevli, H. and Cancan, M., Statistical convergence of double sequences in fuzzy normed spaces, Filomat, 26(4) (2012), 673-681.
- [21] Mursaleen, M. and Edely, O.H.H., Statistical convergence of double sequences, J. Math. Anal. Appl. 288 (2003), 223-231.
- [22] Nabiev, A., Pehlivan, S. and Gürdal, M., On I-Cauchy sequences, Taiwanese J. Math. 11(2) (2007) 569-5764.
- [23] Nanda, S., On sequences of fuzzy numbers, Fuzzy Sets Syst. 33 (1989), 123-126.
- [24] Pringsheim, A., Zur theorie der zweifach unendlichen Zahlenfolgen, Math. Ann. 53 (1900), 289-321.
- [25] Rath, D. and Tripaty, B.C., On statistically convergence and statistically Cauchy sequences, Indian J. Pure Appl. Math. 25(4) (1994), 381-386.
- [26] Saadati, R., On the I-fuzzy topological spaces, Chaos, Solitons and Fractals, 37 (2008), 1419-1426.
- [27] Salat, T., Tripaty, B.C. and Ziman, M., On I-convergence eld, Ital. J. Pure Appl. Math. 17 (2005), 45-54.
- [28] Savaş, E. and Mursaleen, M., On statistically convergent double sequences of fuzzy numbers, Inform. Sci. 162 (2004), 183{-92
- [29] S. Şençimen, C. and Pehlivan, S., Statistical convergence in fuzzy normed linear spaces,Fuzzy Sets and Systems, 159 (2008), 361-370.
- [30] Schoenberg, I.J., The integrability of certain functions and related summability methods, Amer. Math. Monthly 66 (1959), 361-375.
- [31] Tripathy, B. and Tripathy, B.C., On I-convergent double sequences, Soochow J. Math. 31 (2005), 549-560.
- [32] Turkmen, M. R. and Dündar, E., On Lacunary Statistical Convergence of Double Sequences and Some Properties in Fuzzy Normed Spaces, Journal of Intelligent and Fuzzy Systems, DOI: 10.3233/JIFS-18841 (Pre-press).
- [33] Zadeh, L.A., Fuzzy sets, Information and Control 8(1965), 338-353.