On the linearity of higher-dimensional blocking sets
The electronic journal of combinatorics, Tome 17 (2010)
A small minimal $k$-blocking set $B$ in $\mathrm{PG}(n,q)$, $q=p^t$, $p$ prime, is a set of less than $3(q^k+1)/2$ points in $\mathrm{PG}(n,q)$, such that every $(n-k)$-dimensional space contains at least one point of $B$ and such that no proper subset of $B$ satisfies this property. The linearity conjecture states that all small minimal $k$-blocking sets in $\mathrm{PG}(n,q)$ are linear over a subfield $\mathbb{F}_{p^e}$ of $\mathbb{F}_q$. Apart from a few cases, this conjecture is still open. In this paper, we show that to prove the linearity conjecture for $k$-blocking sets in $\mathrm{PG}(n,p^t)$, with exponent $e$ and $p^e\geq 7$, it is sufficient to prove it for one value of $n$ that is at least $2k$. Furthermore, we show that the linearity of small minimal blocking sets in $\mathrm{PG}(2,q)$ implies the linearity of small minimal $k$-blocking sets in $\mathrm{PG}(n,p^t)$, with exponent $e$, with $p^e\geq t/e+11$.
DOI :
10.37236/446
Classification :
51E21
Mots-clés : blocking set, linear set, linearity conjecture
Mots-clés : blocking set, linear set, linearity conjecture
@article{10_37236_446,
author = {G. Van de Voorde},
title = {On the linearity of higher-dimensional blocking sets},
journal = {The electronic journal of combinatorics},
year = {2010},
volume = {17},
doi = {10.37236/446},
zbl = {1205.51005},
url = {http://geodesic.mathdoc.fr/articles/10.37236/446/}
}
G. Van de Voorde. On the linearity of higher-dimensional blocking sets. The electronic journal of combinatorics, Tome 17 (2010). doi: 10.37236/446
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