[[1] AUBIN, J. P.-FRANKOWSKA, H.: Set-valued Analysis, Birkhauser, Boston, 1990.]Search in Google Scholar
[[2] BARONTI, M.-PAPINI, P.: Convergence of sequences of sets, in: Methods of Functional Analysis in Approximation Theory, Proc. Int. Conf., Bombay, 1985, Birkhauser, Basel, 1986, pp. 133-155.]Search in Google Scholar
[[3] BEER, G.: Convergence of continuous linear functionals and their level sets, Archiv der Mathematik 52 (1989), 482-491.10.1007/BF01198356]Search in Google Scholar
[[4] BEER, G.: On convergence of closed sets in a metric space and distance functions, Bull.Austral. Math. Soc. 31 (1985), 421-432.10.1017/S0004972700009370]Search in Google Scholar
[[5] BORWEIN, J. M.-VANDERWERFF, J. D.: Dual Kadec-Klee norms and the relationship between Wijsman, slice and Mosco convergence, Mich. Math. J. 41 (1994), 371-387.10.1307/mmj/1029005003]Search in Google Scholar
[[6] BUCK, R.C.: Generalized asymptotic density, Amer. J. Math. 75 (1953), 335-346.10.2307/2372456]Search in Google Scholar
[[7] ESI, A.-HAZARIKA, B.: λ-statistical convergence of sequences of sets (preprint).]Search in Google Scholar
[[8] FAST, H.: Sur la convergence statistique, Colloq. Math. 2 (1951), 241-244.10.4064/cm-2-3-4-241-244]Search in Google Scholar
[[9] FRIDY, J. A.: On statistical convergence, Analysis 5 (1985), 301-313.10.1524/anly.1985.5.4.301]Search in Google Scholar
[[10] HAZARIKA, B.-ESI, A.: Statistically almost λ-convergence of sequences of sets, European J. of Pure Appl. Math. 6 (2013), 137-146.]Search in Google Scholar
[[11] LEINDLER, L.: ¨Uber die de la Vall´ee-Pousinsche Summeierbarkeit allgemeiner Orthogonalreihen, Acta Math. Acad. Sci. Hungar. 16 (1965), 375-387.10.1007/BF01904844]Search in Google Scholar
[[12] MAROUF, M. S.: Asymptotic equivalence and summability, Internat. J. Math.Math. Sci. 16 (1993), 755-762.10.1155/S0161171293000948]Search in Google Scholar
[[13] MURSALEEN, M.: λ-statistical convergence, Math. Slovaca 50 (2000), 111-115.]Search in Google Scholar
[[14] NURAY, F.-RHOADES, B. E.: Statistical convergence of sequences of sets, Fasc. Math. 49 (2012), 1-9.]Search in Google Scholar
[[15] PATTERSON, R. F.: On asymptotically statistically equivalent sequences, Demonstratio Math. 36 (2003), 149-153.]Search in Google Scholar
[[16] POBYVANCTS, I. P.: Asymptotic equivalence of some linear transformation defined by a nonnegative matrix and reduced to generalized equivalence in the sense of Ces`aro and Abel, Mat. Fiz. 28 (1980), 83-87.]Search in Google Scholar
[[17] ŠALÀT, T.: On statistical convergence of real numbers, Math. Slovaca 30 (1980), 139-150.]Search in Google Scholar
[[18] SCHOENBERG, I. J.: The integrability of certain functions and related summability methods, Amer. Math. Monthly 66 (1959), 361-375.10.1080/00029890.1959.11989303]Search in Google Scholar
[[19] STEINHAUS, H.: Sur la convergence ordinate et la convergence asymptotique, Colloq.Math. 2 (1951), 73-84.10.4064/cm-2-2-98-108]Search in Google Scholar
[[20] ULUSU, U.-NURAY, F.: Lacunary statistical convergence of sequence of sets, Progr.Appl. Math. 4 (2012), 99-109.]Search in Google Scholar
[[21] ULUSU, U.-NURAY, F.: On asymptotically lacunary statistical equivalent set sequences, J. Math. 2013 (2013), 5 p.10.1155/2013/310438]Search in Google Scholar
[[22] WIJSMAN, R. A.: Convergence of sequences of convex sets, cones and functions, Bull.Amer. Math. Soc. 70 (1964), 186-188.10.1090/S0002-9904-1964-11072-7]Search in Google Scholar
[[23] WIJSMAN, R. A.: Convergence of sequences of convex sets, cones and functions II, Trans.Amer. Math. Soc. 123 (1966), 32-45.10.1090/S0002-9947-1966-0196599-8]Search in Google Scholar
[[24] ZYGMUND, A.: Trigonometric Series. Cambridge Univ. Press, Cambridge, UK, 979. ]Search in Google Scholar