On ideal convergent sequences in fuzzy normed linear spaces

Aytar, S., Pehlivan, S.: Statistical cluster and extreme limit points of sequences of fuzzy numbers. Inform. Sci. 177, 3290–3296 (2007)

Aytar, S., Mammadov, M., Pehlivan, S.: Statistical limit inferior and limit superior for sequences of fuzzy numbers. Fuzzy Sets Syst. 157(7), 976–985 (2006)

Aytar, S.: Statistical limit points of sequences of fuzzy numbers. Inform. Sci. 165, 129–138 (2004)

Bag, T., Samanta, S.K.: Fuzzy bounded linear operators. Fuzzy Sets Syst. 151, 513–547 (2005)

Cheng, S.C., Mordeson, J.M.: Fuzzy linear operator and fuzzy normed linear spaces. Bull. Calcutta Math. Soc. 86, 429–436 (1994)

Dems, K.: On $$I$$ -Cauchy sequences. Real Anal. Exch. 30(1), 123–128 (2004–2005)

Esi, A., Hazarika, B.: $$\lambda $$ -ideal convergence in intuitionistic fuzzy 2-normed linear Space. J. Intell. Fuzzy Syst. 24(4), 725–732 (2013). doi: 10.3233/IFS-2012-0592

Esi, A., Hazarika, B.: Lacunary summable sequence spaces of fuzzy numbers defined by ideal convergence and an Orlicz function. Afr. Mat. doi: 10.1007/s13370-012-0117-3

Fast, H.: Sur la convergence statistique. Colloq. Math. 2, 241–244 (1951)

Felbin, C.: Finite dimensional fuzzy normed linear space. Fuzzy Sets Syst. 48, 239–248 (1992)

Fridy, J.A.: On statistical convergence. Analysis 5, 301–313 (1985)

Fridy, J.A.: Statistical limit points. Proc. Am. Math. Soc. 118, 1187–1192 (1993)

Gürdal, M.: On ideal convergent sequences in 2-normed spaces. Thai. J. Math. 4(1), 85–91 (2006)

Gürdal, M., Sahiner, A.: Ideal convergence in n-normal spaces and some new sequence spaces via n-norm. J. Fund. Sci. 4(1), 233–244 (2008)

Hazarika, B.: Fuzzy real valued lacunary $$I$$ -convergent sequences. Appl. Math. Lett. 25(3), 466–470 (2012)

Hazarika, B., Savas, E.: Some $$I$$ -convergent lambda-summable difference sequence spaces of fuzzy real numbers defined by a sequence of Orlicz functions. Math. Comp. Model. 54(11–12), 2986–2998 (2011)

Hazarika, B.: On fuzzy real valued generalized difference $$I$$ -convergent sequence spaces defined by Musielak-Orlicz function. J. Intell. Fuzzy Syst. 25(1), 9–15 (2013). doi: 10.3233/IFS-2012-0609

Hazarika, B.: Lacunary difference ideal convergent sequence spaces of fuzzy numbers. J. Intell. Fuzzy Syst. 25(1), 157–166 (2013). doi: 10.3233/IFS-2012-0622

Kaleva, O., Seikkala, S.: On fuzzy metric spaces. Fuzzy Sets Syst. 12, 215–229 (1984)

Katsaras, A.K.: Fuzzy topological vector spaces II. Fuzzy Sets Syst. 12, 143–154 (1984)

Kolk, E.: The statistical convergence in Banach spaces. Acta Et. Commentutiones Univ. Tartuensis 924, 41–52 (1991)

Kostyrko, P., Salat, T., Wilezynski, W.: $$I$$ -convergence. Real Anal. Exch. 26, 669–686 (2000–2001)

Kostyrko, P., Macaj, M., Salat, T., Sleziak, M.: $$I$$ -convergence and extremal $$I$$ -limit points. Math. Slovaca 55, 443–464 (2005)

Kumar, V., Kumar, K.: On the ideal convergence of sequences of fuzzy numbers. Inf. Sci. 178, 4670–4678 (2008)

Kumar, V., Kumar, K.: On the ideal convergence of sequences in intuitionistic fuzzy normed spaces. Selcuk J. Math. 10(2), 27–41 (2009)

Kumar, K., Kumar, V.: On the $$I$$ and $$I$$ *-convergence of sequences in fuzzy normed spaces. Adv. Fuzzy Sets Syst. 3(3), 341–365 (2008)

Maddox, I.J.: Statsistical convergence in locally convex space. Math. Proc. Camb. Philos. Soc. 104, 41–52 (1988)

Mamedov, M.A., Pehlivan, S.: Statistical cluster points and turnpike theorem in nonconvex problems. J. Math. Anal. Appl. 256, 686–693 (2001)

Nabin, A., Pehliven, S., Gürdal, M.: On $$I$$ -Canchy sequences. Taiwan. J. Math. 11(2), 569–576 (2007)

Nuray, F., Savas, E.: Statistical convergence of sequences of fuzzy numbers. Math. Slovaca 45, 269–273 (1995)

Pehlivan, S., Mammadov, M.A.: Statistical cluster points and turnpike. Optimization 48, 93–106 (2000)

Pehlivan, S., Guncan, A., Mammadov, M.A.: Statistical cluster points of sequences in finite dimensional spaces. Czechoslov. Math. J. 54(1), 95–102 (2004)

Salat, T., Tripathy, B.C., Ziman, M.: On some properties of $$I$$ -convergence. Tatra Mt. Math. Publ. 28, 279–286 (2004)

Salat, T., Tripathy, B.C., Ziman, M.: On $$I$$ -convergence field. Ital. J. Pure Appl. Math. 17, 45–54 (2005)

Savas, E.: $$\Delta ^m$$ -strongly summable sequences in 2-normed spaces defined by ideal convergence and an Orlicz function. Appl. Math. Comp. 217, 271–276 (2010)

Sencimen, C., Pehlivan, S.: Statistical convergence in fuzzy normed linear spaces. Fuzzy Sets Syst. 159, 361–370 (2008)

Tripathy, B.C., Hazarika, B.: $$I$$ -convergent sequence spaces associated with multiplier sequences. Math. Ineq. Appl. 11(3), 543–548 (2008)

Tripathy, B.C., Hazarika, B.: Paranorm $$I$$ -convergent sequence spaces. Math. Slovaca 59(4), 485–494 (2009)

Tripathy, B.C., Hazarika, B.: Some $$I$$ -convergent sequence spaces defined by Orlicz function. Acta Appl. Math. Sinica 27(1), 149–154 (2011)

Xiao, J., Zhu, X.: On linearly topological structure and property of fuzzy normed linear space. Fuzzy Sets Syst. 125, 153–161 (2002)

Zadeh, L.A.: Fuzzy sets. Inf. Control 8, 338–353 (1965)