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On Arcs in a Finite Projective Plane

Published online by Cambridge University Press:  20 November 2018

G. E. Martin
G. E. Martin*
Affiliation:
State University of New York at Albany
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The aim of this paper is to generalize and unify results of B. Qvist, B. Segre, M. Sce, and others concerning arcs in a finite projective plane. The method consists of applying completely elementary combinatorial arguments.

To the usual axioms for a projective plane we add the condition that the number of points be finite. Thus there exists an integer n ⩾ 2, called the order of the plane, such that the number of points and the number of lines equal n2 + n + 1 and the number of points on a line and the number of lines through a point equal n + 1. In the following, n will always denote the order of a finite plane. Desarguesian planes of order n, formed by the analytic geometry with coefficients from the Galois field of order n, are examples of finite projective planes. We shall not assume that our planes are Desarguesian, however.

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 19 , 1967 , pp. 376 - 393
Copyright
Copyright © Canadian Mathematical Society 1967

References

1. Bose, R. C., Mathematical theory of the symmetrical factor design, Sankhyà, 8 (1947), 107166.Google Scholar
2. Carmichael, R. D., Introduction to the theory of groups of finite order (New York, 1956).Google Scholar
3. Hughes, D. R., A class of non-Desarguesian projective planes, Can. J. Math., 9 (1957), 278388.Google Scholar
4. Lombardo-Radice, L., Piani grafici finiti a coordinate di Veblen-Wedderburn, Ricerche Mat., 2(1953), 266273.Google Scholar
5. Qvist, B., Some remarks concerning curves of the second degree in a finite plane, Ann. Acad Sci. Fenn. Ser. A.I. 134 (1952).Google Scholar
6. See, M., Sui kq-archi di indice h, Convegno Internazionale: Reticoli e Geometrie Proiettive, Palermo, Massina (1957), 133136.Google Scholar
7. See, M., Preliminari ad una teoria aritmetico-gruppale di k-archi, Rend. Mat. e Appl., 19 (1960), 241291.Google Scholar
8. Segre, Beniamino, Ovals in a finite projective plane, Can. J. Math., 7 (1955), 414416.Google Scholar
9. Segre, Beniamino, Lectures on modern geometry (Roma, 1961).Google Scholar
10. Veblen, O. and Wedderburn, J., Non-Desarguesian and non-Pascalian geometries, Trans. Amer. Math. Soc., 8 (1907), 379388.Google Scholar
11. Wagner, A., On perspectivities of finite projective planes, Math. Z., 71 (1959), 113123.Google Scholar
12. Zappa, G., Sui gruppi di collineazioni dei piani di Hughes, Boll. Un. Mat. Ital., 12 (1957), 507516.Google Scholar