Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators

Duman, Oktay

Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators

Oktay DUMAN (TOBB Ekonomi ve Teknoloji Üniversitesi, Fen Edebiyat Fakültesi, Matematik Bölümü, Ankara, Türkiye)

Hacettepe Journal of Mathematics and Statistics

3 3

Yıl: 2010 Cilt: 39 Sayı: 4 Sayfa Aralığı: 497 - 514 Metin Dili: İngilizce İndeks Tarihi: 29-07-2022

Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators

Öz:

In this paper, we obtain fuzzy approximations to fuzzy differentiable functions by means of fuzzy linear operators whose positivity condition and classical limits fail. In order to get more powerful results than the classical approach we investigate the effects of matrix summability methods on the fuzzy approximation. So, we mainly use the notion of A-statistical convergence from summability theory instead of the usual convergence.

Anahtar Kelime:

Konular: Matematik İstatistik ve Olasılık

Belge Türü: Makale Makale Türü: Araştırma Makalesi Erişim Türü: Erişime Açık

[1] Altomare, F. and Campiti, M. Korovkin Type Approximation Theory and Its Application (Walter de Gruyter Publ., Berlin, 1994).
[2] Altomare, F. and Rasa, I. Approximation by positive operators in spaces Cp([a, b]), Anal. Num´er. Th´eor. Approx. 18, 1–11, 1989.
[3] Anastassiou, G.A. On basic fuzzy Korovkin theory, Studia Univ. Babe¸s-Bolyai Math. 50, 3–10, 2005.
[4] Anastassiou, G.A. Higher order fuzzy Korovkin theory via inequalities, Commun. Appl. Anal. 10, 359–392, 2006.
[5] Anastassiou, G.A. and Duman, O. Statistical fuzzy approximation by fuzzy positive linear operators, Comput. Math. Appl. 55, 573–580, 2008.
[6] Anastassiou, G.A. and Duman, O. A Baskakov type generalization of statistical Korovkin theory, J. Math. Anal. Appl. 340, 476–486, 2008.
[7] Boos, J. Classical and Modern Methods in Summability (Oxford University Press, UK, 2000).
[8] Brosowksi, B. A Korovkin-type theorem for differentiable functions, Approximation Theory, III (Proc. Conf., Univ. Texas, Austin, Tex., 1980) (Academic Press, New York-London, 1980), 255–260.
[9] Delgado, F. J.M., Gonz´ales, V.R. and Morales, D.C. Qualitative Korovkin-type results on conservative approximation, J. Approx. Theory 94, 144–159, 1998.
[10] Dirik, F., Duman, O. and Demirci, K. Statistical approximation to Bögel-type continuous and periodic functions, Cent. Eur. J. Math. 7, 539–549, 2009.
[11] Doğru, O. and Duman, O. Statistical approximation of Meyer-König and Zeller operators based on q-integers, Publ. Math. Debrecen 68, 199–214, 2006.
[12] Duman, O. Statistical approximation for periodic functions, Demonstratio Math. 36, 873– 878, 2003.
[13] Duman, O. and Anastassiou, G.A. On statistical fuzzy trigonometric Korovkin theory, J. Comput. Anal. Appl. 10, 333–344, 2008.
[14] Duman, O., Khan, M.K. and Orhan, C. A-Statistical convergence of approximating operators, Math. Inequal. Appl. 6, 689–699, 2003.
[15] Duman, O., Erku¸s, E. and Gupta, V. Statistical rates on the multivariate approximation theory, Math. Comput. Modelling 44, 763–770, 2006.
[16] Erku¸s, E. and Duman, O. A Korovkin type approximation theorem in statistical sense, Studia Sci. Math. Hungar. 43, 285–294, 2006.
[17] Erku¸s, E. and Duman, O. A-statistical extension of the Korovkin type approximation theorem, Proc. Indian Acad. Sci. (Math. Sci.) 115, 499–508, 2005.
[18] Fast, H. Sur la convergence statistique, Colloq. Math. 2, 241–244, 1951.
[19] Freedman, A.R. and Sember, J. J. Densities and summability, Pacific J. Math. 95, 293–305,1981.
[20] Fridy, J.A. On statistical convergence, Analysis 5, 301–313, 1985.
[21] Gal, S.G. Approximation theory in fuzzy setting, Handbook of Analytic-Computational Methods in Applied Mathematics (Chapman & Hall/CRC, Boca Raton, FL, 2000), 617–666.
[22] Goetschel, R. J. and Voxman, W. Elementary fuzzy calculus, Fuzzy Sets and Systems 18,31–43, 1986.
[23] Gong, Z., Wu, C. and Li, B. On the problem of characterizing derivatives for the fuzzy-valued functions, Fuzzy Sets and Systems 127, 315–322, 2002.
[24] Kaleva, O. Fuzzy differential equations, Fuzzy Sets and Systems 24, 301–317, 1987.
[25] Karaku¸s, S., Demirci, K. and Duman, O. Equi-statistical convergence of positive linear operators, J. Math. Anal. Appl. 339, 1065–1072, 2008.
[26] Knoop, H.B. and Pottinger, P. Ein satz von Korovkin-typ für Ck-raüme, Math. Z. 148, 23–32, 1976.
[27] Kolk, E. Matrix summability of statistically convergent sequences, Analysis 13, 77–83, 1993.
[28] Korovkin, P.P. Linear Operators and Approximation Theory (Hindustan Publ. Corp., Delhi,1960).
[29] Matloka, M. Sequences of fuzzy numbers, BUSEFAL 28, 28–37, 1986.
[30] Miller, H. I. A measure theoretical subsequence characterization of statistical convergence, Trans. Amer. Math. Soc. 347, 1811–1819, 1995.
[31] Nuray, F. and Sava¸s, E. Statistical convergence of sequences of fuzzy numbers, Math. Slovaca 45, 269–273, 1995.
[32] Wu, C.X. and Ma, M. Embedding problem of fuzzy number space I, Fuzzy Sets and Systems 44, 33–38, 1991.
[33] Wu, C. and Gong, Z. On Henstock integral of fuzzy-number-valued functions I, Fuzzy Sets and Systems 120, 523–532, 2001.

APA	Duman O (2010). Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators. , 497 - 514.
Chicago	Duman Oktay Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators. (2010): 497 - 514.
MLA	Duman Oktay Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators. , 2010, ss.497 - 514.
AMA	Duman O Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators. . 2010; 497 - 514.
Vancouver	Duman O Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators. . 2010; 497 - 514.
IEEE	Duman O "Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators." , ss.497 - 514, 2010.
ISNAD	Duman, Oktay. "Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators". (2010), 497-514.

APA	Duman O (2010). Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators. Hacettepe Journal of Mathematics and Statistics, 39(4), 497 - 514.
Chicago	Duman Oktay Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators. Hacettepe Journal of Mathematics and Statistics 39, no.4 (2010): 497 - 514.
MLA	Duman Oktay Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators. Hacettepe Journal of Mathematics and Statistics, vol.39, no.4, 2010, ss.497 - 514.
AMA	Duman O Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators. Hacettepe Journal of Mathematics and Statistics. 2010; 39(4): 497 - 514.
Vancouver	Duman O Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators. Hacettepe Journal of Mathematics and Statistics. 2010; 39(4): 497 - 514.
IEEE	Duman O "Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators." Hacettepe Journal of Mathematics and Statistics, 39, ss.497 - 514, 2010.
ISNAD	Duman, Oktay. "Statistical fuzzy approximation to fuzzy differentiable functions by fuzzy linear operators". Hacettepe Journal of Mathematics and Statistics 39/4 (2010), 497-514.