Small Complete Arcs in PG(2,p)

A full classification (up to equivalence) of all complete k-arcs in the Desarguesian projective planes of order 27 and 29 was obtained by computer. The resulting numbers of complete arcs are tabulated according to size of the arc and type of the automorphism group, and also according to the type of

Storme, L., J.A. Thas, Complete k-arcs in PG(n, q), q even, Discrete Mathematics 106/107 (1992) 455-469. This paper investigates the completeness of k-arcs in PG(n, q), q even. We determine all values of k for which there exists a complete k-arc in PG(n, q), q -2 2 n > q -G/2 -y. This is proven by u

## Abstract We have classified by computer the projectively distinct complete (**__k__**, **3**)‐arcs in **PG**(**2**, **__q__**), **__q__**≤**13**. The algorithm used is an application of isomorph‐free backtracking using canonical augmentation, an adaptation of our earlier algorithms for the gener

## Abstract A full classification (up to equivalence) of all complete __k__‐arcs in the Desarguesian projective planes of order 23 and 25 was obtained by computer. The algorithm used is an application of isomorph‐free backtracking using canonical augmentation, as introduced by McKay, which we have

The automorphism group of the set of 12 points associated with an apolar system of conics is determined. A complete (q -&arc for q = 13 can be obtained as a special case. The orbits of its automorphism group are also described. 0 I Y Y ~ John Wile?. & Sons, h e .