Yıl 2011,
Cilt: 60 Sayı: 1, 1 - 8, 01.02.2011
Öz
In this paper, we extend the process of coordinatization of projective planes to the fuzzy pro jective planes and introduce notion of fuzzy
ternary ring which determines its associated fuzzy pro jective plane. Later, we
give some propositions concerned with linearity of the defined fuzzy ternary
operation.
Anahtar Kelimeler
Fuzzy projective plane Fuzzy ternary ring Planar fuzzy ternary ring
Kaynakça
- [1] Z. Akça, I. Günaltılı, Ö. Güney, On the Fano Subplanes of the Left Semifield Plane of order ˙ 9, Hacettepe Journal of Mathematics and Statistics, Volume 35 (1) (2006) 55-61.
- [2] Z. Akça, A. Bayar, S. Ekmekçi, On the Classification of Fuzzy pro jective lines of Fuzzy 3- dimensional pro jective spaces, Communications Mathematics and Statistics, Vol. 55(2) (2007) 17-23.
- [3] S. Ekmekçi, A. Bayar, Z. Akça, On the Classification of Fuzzy pro jective planes of Fuzzy 3-dimensional pro jective spaces, Chaos, Solitons and Fractals 40 (2009) 2146-2151.
- [4] A. Bayar, Z. Akça, S. Ekmekçi, A Note on Fibered Pro jective Plane Geometry, Information Science 178 (2008) 1257-1262.
- [5] S. Çiftçi, R. Kaya, On the Fano Subplanes in the Translation Plane of order 9, Doga-Tr. J. ˘ of Mathematics 14, (1990) 1-7.
- [6] K.C. Gupta, S. Ray, Fuzzy Plane Pro jective Geometry, Fuzzy Sets and Systems 54 (1993) 191-206.
- [7] R. Kaya, Pro jektif Geometri, Osmangazi University (2005).
- [8] R. Kaya, On the Connection Between Ternary Rings and the Restricted Dual Pappus Theorems-I, J. of the FAC. of SC. of the K.T.Ü. vol. III. No. 6 (1981) 49-57.
- [9] R. Kaya, On the Connection Between Ternary Rings and the Restricted Dual Pappus Theorems-II, Metu J. of pure and applied sciences, vol. 17. No. 1(1984) 63-68.
- [10] L. Kuijken, H. Van Maldeghem, On the definition and some conjectures of fuzzy pro jective planes by Gupta and Ray, and a new defnition of fuzzy building geometries, Fuzzy Sets and Systems 138 (2003) 667-685.
- [11] G. Pickert, Pro jective Ebenen ,Springer -Verlag, Berlin-Göttingen-Heidelberg, (1955).
- [12] J. Yaqub, The Lenz-Barlotti classification, Proceeding of the pro jective geometry conference, University of Illinois, Chicago (1967) 129-162.
- [13] L. Zadeh, Fuzzy Sets, Inform. and Control 8 (1965) 338-358. Current address : Ziya Akça, Rüstem Kaya; Eski¸sehir Osmangazi University, Department of Mathematics and Computer Science, 26480, Eski¸sehir, Turkey E-mail address : zakca@ogu.edu.tr, rkaya@ogu.edu.tr URL: http://communications.science.ankara.edu.tr
Yıl 2011,
Cilt: 60 Sayı: 1, 1 - 8, 01.02.2011
Öz
Kaynakça
- [1] Z. Akça, I. Günaltılı, Ö. Güney, On the Fano Subplanes of the Left Semifield Plane of order ˙ 9, Hacettepe Journal of Mathematics and Statistics, Volume 35 (1) (2006) 55-61.
- [2] Z. Akça, A. Bayar, S. Ekmekçi, On the Classification of Fuzzy pro jective lines of Fuzzy 3- dimensional pro jective spaces, Communications Mathematics and Statistics, Vol. 55(2) (2007) 17-23.
- [3] S. Ekmekçi, A. Bayar, Z. Akça, On the Classification of Fuzzy pro jective planes of Fuzzy 3-dimensional pro jective spaces, Chaos, Solitons and Fractals 40 (2009) 2146-2151.
- [4] A. Bayar, Z. Akça, S. Ekmekçi, A Note on Fibered Pro jective Plane Geometry, Information Science 178 (2008) 1257-1262.
- [5] S. Çiftçi, R. Kaya, On the Fano Subplanes in the Translation Plane of order 9, Doga-Tr. J. ˘ of Mathematics 14, (1990) 1-7.
- [6] K.C. Gupta, S. Ray, Fuzzy Plane Pro jective Geometry, Fuzzy Sets and Systems 54 (1993) 191-206.
- [7] R. Kaya, Pro jektif Geometri, Osmangazi University (2005).
- [8] R. Kaya, On the Connection Between Ternary Rings and the Restricted Dual Pappus Theorems-I, J. of the FAC. of SC. of the K.T.Ü. vol. III. No. 6 (1981) 49-57.
- [9] R. Kaya, On the Connection Between Ternary Rings and the Restricted Dual Pappus Theorems-II, Metu J. of pure and applied sciences, vol. 17. No. 1(1984) 63-68.
- [10] L. Kuijken, H. Van Maldeghem, On the definition and some conjectures of fuzzy pro jective planes by Gupta and Ray, and a new defnition of fuzzy building geometries, Fuzzy Sets and Systems 138 (2003) 667-685.
- [11] G. Pickert, Pro jective Ebenen ,Springer -Verlag, Berlin-Göttingen-Heidelberg, (1955).
- [12] J. Yaqub, The Lenz-Barlotti classification, Proceeding of the pro jective geometry conference, University of Illinois, Chicago (1967) 129-162.
- [13] L. Zadeh, Fuzzy Sets, Inform. and Control 8 (1965) 338-358. Current address : Ziya Akça, Rüstem Kaya; Eski¸sehir Osmangazi University, Department of Mathematics and Computer Science, 26480, Eski¸sehir, Turkey E-mail address : zakca@ogu.edu.tr, rkaya@ogu.edu.tr URL: http://communications.science.ankara.edu.tr
Toplam 13 adet kaynakça vardır.
Ayrıntılar
| Birincil Dil | İngilizce |
|---|---|
| Bölüm | Research Article |
| Yazarlar | |
| Yayımlanma Tarihi | 1 Şubat 2011 |
| Yayımlandığı Sayı | Yıl 2011 Cilt: 60 Sayı: 1 |
Kaynak Göster
Communications Faculty of Sciences University of Ankara Series A1 Mathematics and Statistics.
