Geodesic
On blocking sets of the tangent lines to a nonsingular quadric in \(\mathrm{PG}(3,q), q\) prime
The electronic journal of combinatorics, Tome 31 (2024) no. 4
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Let $Q^{-}(3,q)$ be an elliptic quadric and $Q^{+}(3,q)$ a hyperbolic quadric in $\mathrm{PG}(3,q)$. For $\epsilon\in\{-,+\}$, let $\mathcal{T}^{\epsilon}$ denote the set of all tangent lines of $\mathrm{PG}(3,q)$ with respect to $Q^{\epsilon}(3,q)$. If $k$ is the minimum size of a $\mathcal{T}^{\epsilon}$-blocking set in $\mathrm{PG}(3,q)$, then it is known that $q^2+1 \leq k \leq q^2+q$. For an odd prime $q$, we prove that there are no $\mathcal{T}^+$-blocking sets of size $q^2+1$ and that the quadric $Q^-(3,q)$ is the only $\mathcal{T}^-$-blocking set of size $q^2 +1$ in $\mathrm{PG}(3,q)$. When $q=3$, we show with the aid of a computer that there are no minimal $\mathcal{T}^-$-blocking sets of size $11$ and that, up to isomorphism, there are eight minimal $\mathcal{T}^-$-blocking sets of size $12$ in $\mathrm{PG}(3,3)$. We also provide geometrical constructions for these eight mutually nonisomorphic minimal $\mathcal{T}^-$-blocking sets of size $12$.
DOI : 10.37236/10840
Classification : 05B25, 51E12
Mots-clés : quadrics, blocking sets

Bart De Bruyn  1   ; Francesco Pavese    ; Puspendu Pradhan    ; Binod Kumar Sahoo 

1 Ghent University 
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     author = {Bart De Bruyn and Francesco Pavese and Puspendu Pradhan and Binod  Kumar Sahoo},
     title = {On blocking sets of the tangent lines to a nonsingular quadric in {\(\mathrm{PG}(3,q),} q\) prime},
     journal = {The electronic journal of combinatorics},
     year = {2024},
     volume = {31},
     number = {4},
     doi = {10.37236/10840},
     zbl = {1558.05026},
     url = {http://geodesic.mathdoc.fr/articles/10.37236/10840/}
}
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Bart De Bruyn; Francesco Pavese; Puspendu Pradhan; Binod  Kumar Sahoo. On blocking sets of the tangent lines to a nonsingular quadric in \(\mathrm{PG}(3,q), q\) prime. The electronic journal of combinatorics, Tome 31 (2024) no. 4. doi: 10.37236/10840

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