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EJC
2006
2006
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.
Real-time TrafficDisjoint Lines | EJC 2006 | EJC 2007 | Oval Tubes | Tube |
Related Content
| Added | 12 Dec 2010 |
| Updated | 12 Dec 2010 |
| Type | Journal |
| Year | 2006 |
| Where | EJC |
| Authors | Peter J. Cameron, Norbert Knarr |
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