Transitive A6-invariant k-arcs in PG(2,q)

Abstract

For q=pr with a prime p 7 such that q 1 or 19 30, the desarguesian projective plane PG(2,q) of order q has a unique conjugacy class of projectivity groups isomorphic to the alternating group A6 of degree 6. For a projectivity group A6 of PG(2,q), we investigate the geometric properties of the (unique) -orbit O of size 90 such that the 1-point stabilizer of in O is a cyclic group of order 4. Here O lies either in PG(2,q) or in PG(2,q2) according as 3 is a square or a non-square element in GF(q). We show that if q≥ 349 and q≠ 421, then O is a 90-arc, which turns out to be complete for q=349, 409, 529, 601,661. Interestingly, O is the smallest known complete arc in PG(2,601) and in PG(2,661). Computations are carried out by MAGMA.