Results in Projective Geometry PG(r,23) , r 1,2

Authors

  • Emad Bakr Al-Zangana Department of Mathematics, College of Science, Al-Mustansiriyah University, Baghdad, Iraq

Keywords:

Projective plane, Projective line, k  Arc, Complete arcs

Abstract

In projective plane over a finite field q F , a conic is the unique complete
(q 1) arc and any arcs on a conic are incomplete arc of degree less than q 1.
These arcs correspond to sets in the projective line over the same field. In this paper,
The number of inequivalent incomplete k  arcs; k  5,6, ,12, on the conic in
PG(2,23) and stabilizer group types are found. Also, the projective line
PG(1,23) has been splitting into two 12-sets and partitioned into six disjoint
tetrads.

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Published

2022-06-24

Issue

Vol 57 No2A (2016)

Section

Mathematics

How to Cite

[1]
E. B. . Al-Zangana, “Results in Projective Geometry PG(r,23) , r 1,2”, Iraqi Journal of Science, vol. 57, no. 2A, pp. 964–971, Jun. 2022, Accessed: Jan. 03, 2026. [Online]. Available: https://ijs.uobaghdad.edu.iq/index.php/eijs/article/view/7476

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