A combinatorial characterization of the Baer and the unital cone in \(\mathrm{PG}(3,q^2)\)
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Publication:2210791
DOI10.1007/s00022-020-00557-0zbMath1452.51001OpenAlexW3093747564MaRDI QIDQ2210791
Stefano Innamorati, Fulvio Zuanni
Publication date: 8 November 2020
Published in: Journal of Geometry (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00022-020-00557-0
blocking setsBaer conesthree character setssets of type \((q^2+1, q^2+q+1, q^3+q^2+1)_2\)sets of type \((q^2+1, q^3+1, q^3+q^2+1)_2\)unital cones
Related Items (2)
On Baer cones in \(\mathrm{PG}(3,q)\) ⋮ The characterization of cones as pointsets with 3 intersection numbers
Cites Work
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- On quasi-Hermitian varieties in \(\operatorname{PG}(3, q^2)\)
- Blocking sets
- Some sets of type \((m,n)\) in cubic order planes
- A note on sets of type \((0, mq, 2mq)_2\) in \(PG(3, q)\)
- Blocking Semiovals of Type (1,m+1,n+1)
- Sets of Type (1, n, q + 1) in PG(d, q)
- On regular {v, n}‐arcs in finite projective spaces
- CHARACTERIZING HERMITIAN VARIETIES IN THREE- AND FOUR-DIMENSIONAL PROJECTIVE SPACES
- Baer subplanes and blocking sets
- Blocking Sets in Finite Projective Planes
- Maximum number of points on intersection of a cubic surface and a non-degenerate Hermitian surface
- A combinatorial problem
- Sets of type \((a,b)\) from subgroups of \(\Gamma L (1, p^R)\)
- Sets with few intersection numbers from Singer subgroup orbits
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