Buradasınız

Anasayfa » Content

On I -Convergence in the Topology Induced by Prob-

Journal Name:

  • European Journal of Pure and Applied Mathematics

Publication Year:

  • 2009

Key Words:

Author Name

AMS Codes:

Abstract (2. Language): 
The concepts of I -convergence is a natural generalization of statistical convergence and it is dependent on the notion of the ideal of subsets of N of positive integer set. In this paper we study the I -convergence of sequences, I -convergence of sequences of functions and I -Cauchy sequences in probabilistic normed spaces and prove some important results.
Bookmark/Search this post with
FULL TEXT (PDF): 
PDF icon arastirmax-i-convergence-topology-induced-prob.pdf
  • 1
195-212
  • English

REFERENCES

References: 

[1] S. Aytar and S. Pehlivan, Statistically monotonic and statistically bounded sequences of
fuzzy numbers. Information Sciences, 176: 734-744 (2006).
[2] V. Balaz, J. Cervennansky, T. Kostyrko, T. Salat, I -convergence and I -continuity of real
functions. Acta Mathematica, Faculty of Natural Sciences, Constantine the Philosopher
University Nitra 5: 43-50 (2002).
[3] M. Balcerzak, K. Dems, A. Komisarski, Statistical convergence and ideal convergence for
sequences of functions. J. Math. Anal. Appl. 328: 715-729 (2007).
[4] J. Connor, The statistical and strong p-Cesaro convergence of sequences. Analysis 8: 47-
63 (1988).
[5] J. Connor, M. Ganichev, V. Kadets, A characterization of Banach spaces with separable
duals via weak statistical convergence. J. Math. Anal. Appl. 244: 251-261 (2000).
[6] K. Dems, On I -Cauchy sequences. Real Anal. Exch. 30: 123-128 (2004/2005).
[7] H. Fast, Sur la convergence statistique. Colloq. Math. 2: 241-244 (1951).
[8] A. R. Freedman and J. J. Sember, Densities and Summability. Pasific J. Math. 95: 293-305
(1981).
REFERENCES 211
[9] J. A. Fridy, On statistical convergence. Analysis 5: 301-313 (1985).
[10] J. A. Fridy, Statistical limit points. Proc. Amer. Math. Soc. 118: 1187-1192 (1993).
[11] J. A. Fridy and C. Orhan, Statistical limit superior and limit inferior. Proc. Amer. Math.
Soc. 125: 3625-3631 (1997).
[12] J. Jasinski, I. Reclaw, Ideal convergence of continuous functions. Topology and its Applications,
153: 3511-3518 (2006).
[13] S. Karakus, Statistical convergence on probabilistic normed spaces. Math. Comm. 12:
11-23 (2007).
[14] S. Karakus, K. Demirci, Statisitcval convergence of double sequences on probabilistic
normed spaces. Int. J. Math. Math. Sci. 2007: 11 pages (2007)
[15] E. Kolk, The statistical convergence in Banach spaces. Acta Comment. Univ. Tartu. 928:
41-52 (1991).
[16] P. Kostyrko, T. Salat, W. Wilczynski, I -convergence. Real Anal. Exch. 26, 2: 669-686
(2000/2001).
[17] P. Kostyrko, M. Macaj, T. Salat, M. Sleziak. I -convergence and extremal I -limit point.
Math. Slovaca 55: 443-464 (2005).
[18] I. J. Maddox, Statistical convergence in a locally convex space. Math. Proc. Cambridge
Phil. Soc. 104: 141-145 (1988).
[19] Mursaleen and O. H. H. Edely, Statistical convergence of double sequences. J. Math.
Anal. Appl. 288: 223-231 (2003).
[20] A. Nabiev, S. Pehlivan, M. Gurdal, On I -Cauchy sequence. Taiwanese J. Math. 11, 2:
569-576 (2007).
[21] T. Šalát, On statistical convergent sequences of real numbers. math. Slovaca 30: 139-
150 (1980).
[22] E. Sava¸s, On statistically convergent sequences of fuzzy numbers. Information Sciences,
137: 277-282 (2001).
[23] A. N. Šerstnev, On the notion of a random normed spaces. Dokl. Akad. nauk SSSR 149:
280-283 (1963).
[24] M. Sleziak, I -continuity in topological spaces. Preprint.
REFERENCES 212
[25] H. Steinhaus, Sur la convergence ordinaire et la convergence asymptotique. Collog.
Math. 2: 73-74 (1951).
[26] B. Schweizer, A. Sklar, Probabilistic metric spaces, Elsevier/North-Holand. New York,
1983.

Thank you for copying data from http://www.arastirmax.com