Partial ovoids and partial spreads in Hermitian polar spaces

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Publication:1008994

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DOI10.1007/s10623-007-9047-8zbMath1185.05029OpenAlexW2070647414MaRDI QIDQ1008994

Andreas G. Klein, Storme, L., Klaus Metsch, Jan De Beule

Publication date: 31 March 2009

Published in: Designs, Codes and Cryptography (Search for Journal in Brave)

Full work available at URL: https://biblio.ugent.be/publication/435433

Mathematics Subject Classification ID

Combinatorial aspects of finite geometries (05B25) Spreads and packing problems in finite geometry (51E23) Arrangements of points, flats, hyperplanes (aspects of discrete geometry) (52C35) Packing and covering in (n) dimensions (aspects of discrete geometry) (52C17) Combinatorial geometries and geometric closure systems (51D20)

Related Items (13)

Characterization results on small blocking sets of the polar spaces \(Q^+(2n+1,2)\) and \(Q^+(2n+1,3)\) ⋮ Hermitian rank distance codes ⋮ New bounds for partial spreads of \(\mathsf{H}(2d-1,q^2)\) and partial ovoids of the Ree-Tits octagon ⋮ Constant rank-distance sets of Hermitian matrices and partial spreads in Hermitian polar spaces ⋮ On \((0, \alpha)\)-sets of generalized quadrangles ⋮ Substructures in finite classical polar spaces ⋮ On large partial ovoids of symplectic and Hermitian polar spaces ⋮ Partial ovoids and partial spreads in symplectic and orthogonal polar spaces ⋮ Some large partial ovoids of \(Q^-(5,q)\), for odd \(q\) ⋮ Small maximal partial spreads in classical finite polar spaces ⋮ Partial ovoids and partial spreads in Hermitian polar spaces ⋮ Intriguing sets in partial quadrangles ⋮ On intriguing sets of the Penttila-Williford association scheme

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