Hostname: page-component-cd9895bd7-p9bg8 Total loading time: 0 Render date: 2024-12-23T07:39:03.669Z Has data issue: false hasContentIssue false

Some remarks on flocks

Published online by Cambridge University Press:  09 April 2009

Laura Bader
Affiliation:
Dipartimento di Matematica e Applicazioni, Università di Napoli ‘Federico II’, Complesso di Monte S. Angelo, Via Cintia - Edificio T, I-80126 Napoli, Italy e-mail: [email protected]
Christine M. O'Keefe
Affiliation:
CSIRO ICT Centre, GPO Box 664, Canberra 2601, Australia e-mail: [email protected]
Tim Penttila
Affiliation:
School of Mathematics and Statistics (M019), The University of Western Australia, 35 Stirling Highway, Crawley 6009 WA, Australia e-mail: [email protected]
Rights & Permissions [Opens in a new window]

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

New proofs are given of the fundamental results of Bader, Lunardon and Thas relating flocks of the quadratic cone in PG(3, q), q odd, and BLT-sets of Q(4, q). We also show that there is a unique BLT-set of H(3, 9). The model of Penttila for Q(4, q), q odd, is extended to Q(2m, q) to construct partial flocks of size qm/2+m/2 – 1 of the cone kin PG(2m – 1, q) with vertex a point and base Q(2m – 2, q), where q is congruent to 1 or 3 modulo 8 and m is even. These partial flocks are larger than the largest previously known for m > 2. Also, the example of O'Keefe and Thas of a partial flock of k in PG(5, 3) of size 6 is generalised to a partial flock of the cone k of PG(2pn – 1, p) of size 2pn, for any prime p congruent to 1 or 3 modulo 8, with the corresponding partial BLT-set of Q(2pn, p) admitting the symmetric group of degree 2pn + 1.

Type
Research Article
Copyright
Copyright © Australian Mathematical Society 2004

References

[1]Bader, L., Lunardon, G. and Pinneri, I., ‘A new semifield flock’, J. Comb. Theory Ser. (A) 86 (1999), 4962.CrossRefGoogle Scholar
[2]Bader, L., Lunardon, G. and Thas, J. A., ‘Derivation of flocks of quadratic cones’, Forum Math. 2 (1990), 163174.CrossRefGoogle Scholar
[3]Cannon, J. and Playoust, C., ‘An introduction to MAGMA’, Technical report (University of Sydney, Australia, 1993).Google Scholar
[4]De Soete, M. and Thas, J. A., ‘A characterization theorem for the generalized quadrangle T*2 of order (s, s + 2)’, Ars Combin. 17 (1984), 225242.Google Scholar
[5]Delandtsheer, A., ‘Dimensional linear spaces’, in: Handbook of incidence geometry (ed. Buekenhout, F.) (North-Holland, 1995).Google Scholar
[6]Johnson, N. L., ‘Derivation of partial flocks of quadratic cones’, Rend. Mat. Serie VII 12 (1992), 817848.Google Scholar
[7]Kantor, W. M., ‘Note on generalized quadrangles, flocks and BLT-sets’, J. Combin. Theory Ser. (A) 58 (1991), 153157.CrossRefGoogle Scholar
[8]Knarr, N., ‘A geometric construction of generalized quadrangles from polar spaces of rank three’, Resultate Math. 21 (1992), 332344.CrossRefGoogle Scholar
[9]O'Keefe, C. M. and Thas, J. A., ‘Partial flocks of quadratic cones with a point vertex in PG(n, q), n odd’, J. Algebraic Combin. 6 (1997), 377392.CrossRefGoogle Scholar
[10]Payne, S. E. and Thas, J. A., Finite generalized quadrangles (Pitman, London, 1984).Google Scholar
[11]Payne, S. E. and Thas, J. A., ‘Conical flocks, partial flocks, derivation, and generalized quadrangles’, Geom. Dedicata 38 (1991), 229243.CrossRefGoogle Scholar
[12]Penttila, T., ‘Regular cyclic BLT-sets’, Rend. Circ. Mat. Palermo, supplemento Ser. II 53 (1998), 167172.Google Scholar
[13]Seidel, J. J., ‘A survey on two-graphs’, in: Teorie Combinatorie (ed. Segre, B.) (Accad. Naz. Lincei, Roma, 1976).Google Scholar
[14]Shult, E. E. and Thas, J. A., ‘Construction of polygons from buildings’, Proc. London Math. Soc. 71 (1995), 397440.CrossRefGoogle Scholar
[15]Steinke, G. F., ‘A remark on Benz planes of order 9’, Ars Combin. 34 (1992), 257267.Google Scholar
[16]Thas, J. A., ‘Generalized quadrangles and flocks of cones’, European J. Comb. 8 (1987), 441452.CrossRefGoogle Scholar
[17]Thas, J. A., ‘Generalized polygons’, in: Handbook of incidence geometry (ed. Buekenhout, F.) (North-Holland, 1995).Google Scholar