In this paper we are interested in Moufang-Klingenberg
planesM(A) defined over a local alternative ring A of dual numbers.
We show that a collineation of M(A) preserve cross-ratio. Also, we
obtain some results about harmonic points.
[1] Akpinar A., Celik B., Ciftci S. Cross-ratios and 6-figures in some
Moufang-Klingenberg planes, Bulletin of the Belgian Math. Soc.-Simon
Stevin 15(2008), 49-64.
[2] Akpinar A., Celik B. Two new collineations of some Moufang-
Klingenberg planes, International Journal of Comp. and Math. Sci.
4(2)(2010), 81-84.
[3] Baker C.A., Lane N.D., Lorimer J.W. A coordinatization for Moufang-
Klingenberg planes, Simon Stevin 65(1991), 3-22.
[4] Bell J.L. The art of the intelligible: An elementary survey of mathematics
in its conceptual development, Kluwer Acad. Publishers: The
Netherland, (2001).
[5] Blunck A. Cross-ratios in Moufang planes, J. Geometry 40(1991), 20-
25.
[6] Blunck A. Projectivities in Moufang-Klingenberg planes, Geom. Dedicata
40(1991), 341-359.
[7] Blunck A. Cross-ratios over local alternative rings, Res. Math.
19(1991), 246-256.
[8] Blunck A. Cross-ratios in Moufang-Klingenberg planes, Geom. Dedicata
43(1992), 93-107.
[9] Ciftci S., Celik B. On the cross-ratios of points and lines in Moufang
planes, J. Geometry 71(2001), 34-41.
[10] Ferrar J.C. Cross-ratios in projective and affine planes, in Plaumann, P.
and Strambach, K., Geometry - von Staudt-s Point of View (Proceedings
Bad Windsheim, 1980), Reidel, Dordrecht, (1981), 101-125.
[11] Pickert G. Projektive Ebenen. Springer: Berlin, (1955).
[12] Schafer R.D. An introduction to nonassociative algebras, Dover Publications:
New York, (1995).
[1] Akpinar A., Celik B., Ciftci S. Cross-ratios and 6-figures in some
Moufang-Klingenberg planes, Bulletin of the Belgian Math. Soc.-Simon
Stevin 15(2008), 49-64.
[2] Akpinar A., Celik B. Two new collineations of some Moufang-
Klingenberg planes, International Journal of Comp. and Math. Sci.
4(2)(2010), 81-84.
[3] Baker C.A., Lane N.D., Lorimer J.W. A coordinatization for Moufang-
Klingenberg planes, Simon Stevin 65(1991), 3-22.
[4] Bell J.L. The art of the intelligible: An elementary survey of mathematics
in its conceptual development, Kluwer Acad. Publishers: The
Netherland, (2001).
[5] Blunck A. Cross-ratios in Moufang planes, J. Geometry 40(1991), 20-
25.
[6] Blunck A. Projectivities in Moufang-Klingenberg planes, Geom. Dedicata
40(1991), 341-359.
[7] Blunck A. Cross-ratios over local alternative rings, Res. Math.
19(1991), 246-256.
[8] Blunck A. Cross-ratios in Moufang-Klingenberg planes, Geom. Dedicata
43(1992), 93-107.
[9] Ciftci S., Celik B. On the cross-ratios of points and lines in Moufang
planes, J. Geometry 71(2001), 34-41.
[10] Ferrar J.C. Cross-ratios in projective and affine planes, in Plaumann, P.
and Strambach, K., Geometry - von Staudt-s Point of View (Proceedings
Bad Windsheim, 1980), Reidel, Dordrecht, (1981), 101-125.
[11] Pickert G. Projektive Ebenen. Springer: Berlin, (1955).
[12] Schafer R.D. An introduction to nonassociative algebras, Dover Publications:
New York, (1995).
@article{"International Journal of Engineering, Mathematical and Physical Sciences:56899", author = "Atilla Akpinar and Basri Celik", title = "On Cross-Ratio in some Moufang-Klingenberg Planes", abstract = "In this paper we are interested in Moufang-Klingenberg
planesM(A) defined over a local alternative ring A of dual numbers.
We show that a collineation of M(A) preserve cross-ratio. Also, we
obtain some results about harmonic points.", keywords = "Moufang-Klingenberg planes, local alternative ring, projective collineation, cross-ratio, harmonic points.", volume = "4", number = "8", pages = "1149-5", }
