Your search keyword '"John Bamberg"' showing total 4 results

1. Point-primitive generalised hexagons and octagons

Author

Cheryl E. Praeger, Stephen P. Glasby, Csaba Schneider, John Bamberg, and Tomasz Popiel

Subjects

Group (mathematics), 010102 general mathematics, Primitive permutation group, 0102 computer and information sciences, Type (model theory), 01 natural sciences, Theoretical Computer Science, Combinatorics, Computational Theory and Mathematics, 010201 computation theory & mathematics, Almost simple group, Simple group, Converse, Discrete Mathematics and Combinatorics, Point (geometry), 0101 mathematics, Mathematics

Abstract

The only known examples of finite generalised hexagons and octagons arise from the finite almost simple groups of Lie type G 2 , D 4 3 , and F 4 2 . These groups act transitively on flags, primitively on points, and primitively on lines. The best converse result prior to the writing of this paper was that of Schneider and Van Maldeghem (2008): if a group G acts flag-transitively, point-primitively, and line-primitively on a finite generalised hexagon or octagon, then G is an almost simple group of Lie type. We strengthen this result by showing that the same conclusion holds under the sole assumption of point-primitivity.

Published

2017

2. Generalised quadrangles with a group of automorphisms acting primitively on points and lines

Author

Gordon F. Royle, Joy Morris, Michael Giudici, Pablo Spiga, John Bamberg, Bamberg, J, Giudici, M, Morris, J, Royle, G, and Spiga, P

Subjects

Primitive permutation group, Group (mathematics), Type (model theory), Automorphism, Theoretical Computer Science, Combinatorics, 51E12, 05B25, 20B15, Quadrangle, Flag-transitive, Computational Theory and Mathematics, Simple (abstract algebra), FOS: Mathematics, Generalised quadrangle, Mathematics - Combinatorics, Discrete Mathematics and Combinatorics, Combinatorics (math.CO), Discrete Mathematics and Combinatoric, Mathematics

Abstract

We show that if G is a group of automorphisms of a thick finite generalised quadrangle Q acting primitively on both the points and lines of Q, then G is almost simple. Moreover, if G is also flag-transitive then G is of Lie type., 20 pages

Published

2012

3. Point regular groups of automorphisms of generalised quadrangles

Author

John Bamberg and Michael Giudici

Subjects

p-group, Mathematics::Combinatorics, Automorphisms of the symmetric and alternating groups, Automorphism, p-Group, Theoretical Computer Science, Combinatorics, 51E12, 20B15, 05E20, Quadrangle, Computational Theory and Mathematics, FOS: Mathematics, Generalised quadrangle, Regular action, Exponent, Mathematics - Combinatorics, Mathematics::Metric Geometry, Order (group theory), Discrete Mathematics and Combinatorics, Point (geometry), Combinatorics (math.CO), Mathematics, Symplectic geometry

Abstract

We study the point regular groups of automorphisms of some of the known generalised quadrangles. In particular we determine all point regular groups of automorphisms of the thick classical generalised quadrangles. We also construct point regular groups of automorphisms of the generalised quadrangle of order $(q-1,q+1)$ obtained by Payne derivation from the classical symplectic quadrangle $\mathsf{W}(3,q)$. For $q=p^f$ with $f\geq 2$ we obtain at least two nonisomorphic groups when $p\geq 5$ and at least three nonisomorphic groups when $p=2$ or $3$. Our groups include nonabelian 2-groups, groups of exponent 9 and nonspecial $p$-groups. We also enumerate all point regular groups of automorphisms of some small generalised quadrangles., some minor changes (including to title) after referee's comments

Published

2011

4. Tight sets and m-ovoids of finite polar spaces

Author

Maska Law, John Bamberg, Tim Penttila, and Shane Kelly

Subjects

Tight set, m-Ovoid, Rank (differential topology), Mathematical proof, Theoretical Computer Science, Combinatorics, Set (abstract data type), Quadrangle, m-System, Computational Theory and Mathematics, Egg, Discrete Mathematics and Combinatorics, Polar, Projective space, Mathematics

Abstract

An intriguing set of points of a generalised quadrangle was introduced in [J. Bamberg, M. Law, T. Penttila, Tight sets and m-ovoids of generalised quadrangles, Combinatorica, in press] as a unification of the pre-existing notions of tight set and m-ovoid. It was shown in [J. Bamberg, M. Law, T. Penttila, Tight sets and m-ovoids of generalised quadrangles, Combinatorica, in press] that every intriguing set of points in a finite generalised quadrangle is a tight set or an m-ovoid (for some m). Moreover, it was shown that an m-ovoid and an i-tight set of a common generalised quadrangle intersect in mi points. These results yielded new proofs of old results, and in this paper, we study the natural analogue of intriguing sets in finite polar spaces of higher rank. In particular, we use the techniques developed in this paper to give an alternative proof of a result of Thas [J.A. Thas, Ovoids and spreads of finite classical polar spaces, Geom. Dedicata 10 (1–4) (1981) 135–143] that there are no ovoids of H(2r,q2), Q−(2r+1,q), and W(2r−1,q) for r>2. We also strengthen a result of Drudge on the non-existence of tight sets in W(2r−1,q), H(2r+1,q2), and Q+(2r+1,q), and we give a new proof of a result of De Winter, Luyckx, and Thas [S. De Winter, J.A. Thas, SPG-reguli satisfying the polar property and a new semipartial geometry, Des. Codes Cryptogr. 32 (1–3) (2004) 153–166; D. Luyckx, m-Systems of finite classical polar spaces, PhD thesis, The University of Ghent, 2002] that an m-system of W(4m+3,q) or Q−(4m+3,q) is a pseudo-ovoid of the ambient projective space.

Published

2007