A non-classical unital of order four with many translations
From MaRDI portal
Publication:738852
DOI10.1016/j.disc.2016.06.008zbMath1357.51001OpenAlexW2463117638MaRDI QIDQ738852
Theo Grundhöfer, Van Maldeghem, Hendrik, Markus Johannes Stroppel
Publication date: 16 August 2016
Published in: Discrete Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.disc.2016.06.008
Other designs, configurations (05B30) Translation planes and spreads in linear incidence geometry (51A40) Homomorphism, automorphism and dualities in linear incidence geometry (51A10)
Related Items (7)
Automorphisms of (affine) \(\mathrm{SL}(2, q)\)-unitals ⋮ Unitals with many involutory translations ⋮ Moufang sets generated by translations in unitals ⋮ Three affine \(\mathrm{SL}(2,8)\)-unitals ⋮ New Steiner 2-designs from old ones by paramodifications ⋮ Embeddings of Ree unitals in a projective plane over a field ⋮ Parallelisms and translations of (affine) \(\mathrm{SL}(2,q)\)-unitals
Cites Work
- Unnamed Item
- Unnamed Item
- Unitals in the Desarguesian projective plane of order 16
- Non-existence of isomorphisms between certain unitals
- The classification of the translation planes of order 16. I
- The translation planes of order 16 that admit nonsolvable collineation groups
- Homogeneous designs and geometric lattices
- A class of unitals of order q which can be embedded in two different planes of order \(q^ 2\)
- On Buekenhout-Metz unitals of even order
- Ovals and unitals in commutative twisted field planes
- On embedding a unitary block design as a polar unital and an intrinsic characterization of the classical unital
- Polarities and unitals in the Coulter-Matthews planes
- Unitals Admitting All Translations
- The Kramer-Mesner method with tactical decompositions: some new unitals on 65 points
- Some unitals on 28 points and their embeddings in projective planes of order 9
- Transitive parabolic unitals in translation planes of odd order
This page was built for publication: A non-classical unital of order four with many translations
