Abstract
A (4,9)-set of size 829 in \(\mathcal{P}\mathcal{G}\)(2,53) is constructed, as is a (4,11)-set of size 3189 in \(\mathcal{P}\mathcal{G}\)(2,73).
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References
A.E. Brouwer, A series of separable designs with application to pairwise orthogonal Latin squares, Europ. J. Combin., Vol. 1 (1980) pp. 137-146.
J. Cannon and C. Playoust, An Introduction to Magma, University of Sydney, Sydney (1993).
D.A. Foulser and M.J. Kallaher, Solvable, flag-transitive, rank 3 collineation groups, Geom. Dedicata, Vol. 7 (1978) pp. 111-130.
D.A. Foulser and R.A. Sandler, Certain properties of orbits under collineation groups, J. Combin. Th. Vol. 2 (1967) pp. 546-570.
J.W.P. Hirschfeld, Projective Geometries over Finite Fields, 2 ed. Oxford University Press, Oxford (1998).
T. Penttila and G.F. Royle, Sets of type (m, n) in the affine and projective planes of order nine, Des. Codes Crypto. Vol. 6 (1995) pp. 229-245.
M. Tallini-Scafati, {k; n}-archi in un piano grafico finito, con particolare riguardo a quelli con due caratteri, Rend. Accad. Naz. Lincei Vol. 40 (1966) pp. 812-818, 1020–1025.
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Batten, L.M., Dover, J.M. Some Sets of Type (m,n) in Cubic Order Planes. Designs, Codes and Cryptography 16, 211–213 (1999). https://doi.org/10.1023/A:1008397209409
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DOI: https://doi.org/10.1023/A:1008397209409