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EJC
2006

Tubes in PG(3, q)

13 years 11 months ago
Tubes in PG(3, q)
A tube (resp. an oval tube) in PG(3, q) is a pair T = {L, L}, where {L} L is a collection of mutually disjoint lines of PG(3, q) such that for each plane of PG(3, q) containing L the intersection of with the lines of L is a hyperoval (resp. an oval). The line L is called the axis of T . We show that every tube for q even and every oval tube for q odd can be naturally embedded into a regular spread and hence admits a group of automorphisms which fixes every element of T and acts regularly on each of them. For q odd we obtain a classification of oval tubes up to projective equivalence. Furthermore, we characterize the reguli in PG(3, q), q odd, as oval tubes which admit more than one axis.
Peter J. Cameron, Norbert Knarr
Added 12 Dec 2010
Updated 12 Dec 2010
Type Journal
Year 2006
Where EJC
Authors Peter J. Cameron, Norbert Knarr
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