Research Article
Year 2023,
Volume: 16 Issue: 2, 680 - 688, 29.10.2023
Abstract
References
- [1] Akça, Z., Bayar, A., Ekmekçi, S., Van Maldeghem, H.: Fuzzy Projective Spreads of Fuzzy Projective Spaces, Fuzzy Sets and Systems, vol. 157, no. 24, pp. 3237-3247 (2006).
- [2] Akça, Z., Bayar, A., Ekmekçi, S.: On the classification of Fuzzy projective lines of Fuzzy 3-dimensional projective spaces, Communications Mathematics and Statistics, Vol. 55(2), 17-23 (2007).
- [3] Akça, Z., Bayar, A., Ekmekçi, S., Kaya, R., Thas, J. A., Van Maldeghem H.: Generalized lax Veronesean embeddings of projective spaces, Ars Combin. 103, 65-80 (2012).
- [4] Akça, Z.: On fuzzify the notion of Grassmannian in fuzzy n dimensional projective space, International Journal of the Physical Sciences, vol. 6, no. 25, pp. 5877-5882 (2011).
- [5] Bayar, A., Akça, Z., Ekmekçi, S.: A Note on Fibered Projective Plane Geometry, Information Science 178, 1257-1262 (2008).
- [6] Ekmekçi, S., Bayar, A., Akça, Z.: On the classification of Fuzzy projective planes of Fuzzy 3-dimensional projective spaces, Chaos, Solitons and Fractals 40, 2146-2151 (2009).
- [7] Hirschfeld J.W.P.: Projective Geometries over Finite Fields, Oxford Mathematical Monographs, 576 (1998).
- [8] Klein, F.: Uber die Transformation der allgemeinen Gleichung des zweiten Grades zwischen Linien-Koordinaten auf eine kanonische, Form Math., p. 539-578 (1868).
- [9] Kuijken L., Van Maldeghem H., Kerre E.E.: Fuzzy projective geometries from fuzzy vector spaces, in: A. Billot et al. (Eds.), Information Processing and Management of Uncertainty in Knowledge-based Systems, Editions Medicales et Scientifiques, Paris, La Sorbonne, 1331- 1338 (1998).
- [10] Lubczonok P.: Fuzzy Vector Spaces, Fuzzy Sets and Systems 38, 329-343 (1990).
- [11] Plucker, J.: On a New Geometry of Space, Philosophical Transactions of the Royal Society of London, Vol. 155, pp. 725-791 (1865).
- [12] Zadeh, L.: Fuzzy sets, Information control 8, 338-353 (1965).
Year 2023,
Volume: 16 Issue: 2, 680 - 688, 29.10.2023
Abstract
Many techniques have been proposed to project the high-dimensional space into a low-dimensional space, one of the most famous methods being principal component analysis. The Klein quadric is a geometric shape defined by a second-degree homogeneous equation. The lines of projective three-space are, via the Klein mapping, in one-to-one correspondence with points of a hyperbolic quadric of the projective 5-space. This paper presents a research study on he images under the Klein mapping of the projectice 3-space order of 4 and the fuzzification of the Klein quadric in 5-dimensional projective space.
References
- [1] Akça, Z., Bayar, A., Ekmekçi, S., Van Maldeghem, H.: Fuzzy Projective Spreads of Fuzzy Projective Spaces, Fuzzy Sets and Systems, vol. 157, no. 24, pp. 3237-3247 (2006).
- [2] Akça, Z., Bayar, A., Ekmekçi, S.: On the classification of Fuzzy projective lines of Fuzzy 3-dimensional projective spaces, Communications Mathematics and Statistics, Vol. 55(2), 17-23 (2007).
- [3] Akça, Z., Bayar, A., Ekmekçi, S., Kaya, R., Thas, J. A., Van Maldeghem H.: Generalized lax Veronesean embeddings of projective spaces, Ars Combin. 103, 65-80 (2012).
- [4] Akça, Z.: On fuzzify the notion of Grassmannian in fuzzy n dimensional projective space, International Journal of the Physical Sciences, vol. 6, no. 25, pp. 5877-5882 (2011).
- [5] Bayar, A., Akça, Z., Ekmekçi, S.: A Note on Fibered Projective Plane Geometry, Information Science 178, 1257-1262 (2008).
- [6] Ekmekçi, S., Bayar, A., Akça, Z.: On the classification of Fuzzy projective planes of Fuzzy 3-dimensional projective spaces, Chaos, Solitons and Fractals 40, 2146-2151 (2009).
- [7] Hirschfeld J.W.P.: Projective Geometries over Finite Fields, Oxford Mathematical Monographs, 576 (1998).
- [8] Klein, F.: Uber die Transformation der allgemeinen Gleichung des zweiten Grades zwischen Linien-Koordinaten auf eine kanonische, Form Math., p. 539-578 (1868).
- [9] Kuijken L., Van Maldeghem H., Kerre E.E.: Fuzzy projective geometries from fuzzy vector spaces, in: A. Billot et al. (Eds.), Information Processing and Management of Uncertainty in Knowledge-based Systems, Editions Medicales et Scientifiques, Paris, La Sorbonne, 1331- 1338 (1998).
- [10] Lubczonok P.: Fuzzy Vector Spaces, Fuzzy Sets and Systems 38, 329-343 (1990).
- [11] Plucker, J.: On a New Geometry of Space, Philosophical Transactions of the Royal Society of London, Vol. 155, pp. 725-791 (1865).
- [12] Zadeh, L.: Fuzzy sets, Information control 8, 338-353 (1965).
There are 12 citations in total.
Details
| Primary Language | English |
|---|---|
| Subjects | Pure Mathematics (Other) |
| Journal Section | Research Article |
| Authors | |
| Early Pub Date | October 19, 2023 |
| Publication Date | October 29, 2023 |
| Acceptance Date | September 28, 2023 |
| Published in Issue | Year 2023 Volume: 16 Issue: 2 |
