An extension of Lowen's uniformity to the fuzzy soft sets

In this paper, first we define the notion of a saturated fuzzy soft filter. Based on this, we introduce the notion of a fuzzy soft uniformity as a generalization of uniformity in the sense of Lowen. Also, we show how a fuzzy soft topology is derived from a fuzzy soft uniformity. Then, we give a new kind of fuzzy soft neighborhood system and investigate the relationship with a fuzzy soft uniformity. Finally, we show that a fuzzy soft uniformly continuous mapping is a fuzzy soft continuous.

Keywords:

Fuzzy soft set, fuzzy soft topology, saturated fuzzy soft filter fuzzy soft uniformity, fuzzy soft uniformly continuous mapping,

PDF

___

1] Ahmad B, Kharal A. On fuzzy soft sets. Adv Fuzzy Syst 2009; Article ID 586507: 6 pages.
[2] Artico G, Moresco R. Fuzzy proximities compatible with Lowen uniformities. Fuzzy Sets Syst 1987; 21: 85-98.
[3] Ayg¨uno˘glu A, Ayg¨un H. Introduction to fuzzy soft groups. Comput Math Appl 2009; 58: 1279-1286.
[4] Bayoumi F. On initial and final fuzzy uniform structures. Fuzzy Sets Syst 2003; 133: 299-319.
[5] Bayoumi F. On initial and final fuzzy uniform structures Part II. Fuzzy Sets Syst 2006; 157: 1970-1982.
[6] Burton MH. Boundedness in uniform spaces and fuzzy uniform spaces. Fuzzy Sets Syst 1993; 58: 195-207.
[7] Burton MH. Completeness in fuzzy uniform spaces. Quaestiones Math 1993; 16: 13-36.
[8] Chang CL. Fuzzy topological spaces. J Math Anal Appl 1968; 24(1): 182-190.
[9] C¸ etkin V, Ayg¨un H. Uniformity structure in the context of soft set. Ann Fuzzy Math Inform 2013; 6(1): 69-76.
[10] C¸ etkin V, Ayg¨un H. Extension of Shi’s quasi-uniformity to the fuzzy soft sets. Math Sci Appl E-Notes, 2013; 1(2): 42-50.
[11] C¸ etkin V, Ayg¨un H. On convergence of fuzzy soft filters. 3rd International Eurasian Conference on Mathematical Sciences and Applications; 25-28 August 2014; Vienna, Austria.
[12] Demir I˙, O¨ zbakır OB. Some properties of fuzzy soft proximity spaces. Sci World J 2015; Article ID 752634: 10 pages.
[13] Demir I˙, O¨ zbakır OB, Yıldız I˙. Fuzzy soft ultrafilters and convergence properties of fuzzy soft filters. J New Results Sci 2015; 8: 92-107.
[14] G¨uler AC¸ , Kale G. Regularity and normality on soft ideal topological spaces. Ann Fuzzy Math Inform 2015; 9(3): 373-383.
[15] H¨ohle U. Probabilistic uniformization of fuzzy topologies. Fuzzy Sets Syst 1978; 1: 311-332.
[16] Hussain S. A note on soft connectedness. J Egypt Math Soc 2015; 23: 6-11.
[17] Hutton B. Uniformities on fuzzy topological spaces. J Math Anal Appl 1977; 58: 557-571.
[18] Katsaras AK. Linear fuzzy neighborhood spaces. J Fuzzy Sets Syst 1984; 16: 143-154.
[19] Kharal A, Ahmad B. Mappings on fuzzy soft classes. Adv Fuzzy Syst 2009; Article ID 407890: 6 pages.
[20] Kotze W. Uniform spaces. In: H¨ohle U, Rodabaugh SE, editors. Mathematics of Fuzzy Sets: Logic, Topology and Measure Theory; Boston, Dordrecht. London: Kluwer Academic Publishers, 1999, pp. 553-580.
[21] Lowen R. Fuzzy topological spaces and fuzzy compactness. J Math Anal Appl 1976; 56: 621-633.
[22] Lowen R. Fuzzy uniform spaces. J Math Anal Appl 1981; 82: 370-385.
[23] Lowen R. Fuzzy neighbourhood spaces. Fuzzy Sets Syst 1982; 7: 165-189.
[24] Lowen R, Wuyts P. Completeness, compactness and precompactness in fuzzy uniform spaces: Part 1. J Math Anal Appl 1982; 90(2): 563-581.
[25] Lowen R, Wuyts P. Completeness, compactness and precompactness in fuzzy uniform spaces: Part 2. J Math Anal Appl 1983; 92(2): 342-371.
[26] Ma X, Sulaiman N, Qin H, Herawan T, Zain JM. A new ecient normal parameter reduction algorithm of soft sets. Comput Math Appl 2011; 62: 588-598.
[27] Maji PK, Biswas R, Roy AR. Fuzzy soft sets. J Fuzzy Math 2001; 9(3): 589-602.
[28] Maji PK, Biswas R, Roy AR. Soft set theory. Comput Math Appl 2003; 45: 555-562.
[29] Molodtsov D. Soft set theory-first results. Comput Math Appl 1999; 37: 19-31.
[30] Neog TJ, Sut DK, Hazarika GC. Fuzzy soft topological spaces. Int J Latest Trend Math 2012; 2: 54-67.
[31] O¨ zbakır OB, Demir I˙. On the soft uniformity and its some properties. J Math Comput Sci 2015; 5: 762-779.
[32] Roy AR, Maji PK. A fuzzy soft set theoretic approach to decision making problems. J Comput Appl Math 2007; 203: 412-418.
[33] Shabir M, Naz M. On soft topological spaces. Comput Math Appl 2011; 61: 1786-1799.
[34] Shi FG. Pointwise uniformities in fuzzy set theory. Fuzzy Sets Syst 1998; 98: 141-146.
[35] Soetens E, Wuyts P. A characterisation of fuzzy uniform spaces by coverings. J Math Anal Appl 1993; 180: 275-302.
[36] Tanay B, Kandemir MB. Topological structures of fuzzy soft sets. Comput Math Appl 2011; 61: 412-418.
[37] Tukey JW. Convergence and Uniformity in Topology. Ann of Math Stud vol 2, Princeton University Press, 1940.
[38] Varol BP, Ayg¨un H. Fuzzy soft topology. Hacet J Math Stat 2012; 41(3): 407-419.
[39] Weil A. Sur les Espaces a Structure Uniforme et sur la Topologie Generale. Hermann, Paris, 1937.
[40] Yıldırım ED, G¨uler AC¸ , ¨ Ozbakır OB. On softeI-baire spaces. Ann Fuzzy Math Inform 2015; 10(1): 109-121.
[41] Zhang D. A comparison of various uniformities in fuzzy topology. Fuzzy Sets Syst 2003; 140: 399-422.

Yayın Aralığı: Yılda 2 Sayı
Başlangıç: 2013
Yayıncı: Mehmet Zeki SARIKAYA

Arşiv