Abstract
B.C. Kestenband [9], J.C. Fisher, J.W.P. Hirschfeld, and J.A. Thas [3], E. Boros, and T. Szönyi [1] constructed complete (q 2 − q + l)-arcs in PG(2, q 2), q ≥ 3. One of the interesting properties of these arcs is the fact that they are fixed by a cyclic protective group of order q 2 − q + 1. We investigate the following problem: What are the complete k-arcs in PG(2, q) which are fixed by a cyclic projective group of order k? This article shows that there are essentially three types of those arcs, one of which is the conic in PG(2, q), q odd. For the other two types, concrete examples are given which shows that these types also occur.
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Storme, L., Van Maldeghem, H. Cyclic Arcs in PG(2, q). Journal of Algebraic Combinatorics 3, 113–128 (1994). https://doi.org/10.1023/A:1022454221497
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DOI: https://doi.org/10.1023/A:1022454221497