Linear Blocking Sets: A Survey
Guglielmo Lunardon () and
Olga Polverino ()
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Guglielmo Lunardon: Complesso di Monte S. Angelo, Dip. di Matematica e Applicazioni Università di Napoli
Olga Polverino: Complesso Universitario Via Vivaldi, Dip. di Matematica Seconda Università di Napoli
A chapter in Finite Fields and Applications, 2001, pp 356-362 from Springer
Abstract:
Abstract A class of small minimal blocking sets, called linear, was introduced in [9]. Using a result of [2], it has been proven that, with few exceptions, all small minimal blocking sets of Rédei type in the finite desarguesian projective planes are linear [9], and that there are examples of non-Rédei type in PG(7(2,q t ), t ≥ 4, [14]. The aim of this paper is to collect the known results and to list all the known examples of linear blocking sets of minimum and maximum size.
Date: 2001
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Persistent link: https://EconPapers.repec.org/RePEc:spr:sprchp:978-3-642-56755-1_28
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DOI: 10.1007/978-3-642-56755-1_28
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