An elementary proof and an extension of Thas' theorem on k-arcs
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Publication:4207310
DOI10.1017/S0305004100077823zbMath0688.51007MaRDI QIDQ4207310
Tatsuya Maruta, Hitoshi Kaneta
Publication date: 1989
Published in: Mathematical Proceedings of the Cambridge Philosophical Society (Search for Journal in Brave)
Related Items (16)
On the dual codes of skew constacyclic codes ⋮ Intersection of arcs and normal rational curves in spaces of even characteristic ⋮ On the uniqueness of (q + 1)-arcs of PG (5, q), q = 2h, h ≥ 4 ⋮ Complete arcs ⋮ Classical arcs in \(PG(r,q)\) for \(11\leq q\leq 19\) ⋮ Planar arcs ⋮ On sets of vectors of a finite vector space in which every subset of basis size is a basis ⋮ The main conjecture for MDS codes ⋮ \((d, \boldsymbol{\sigma})\)-Veronese variety and some applications ⋮ Completeness of normal rational curves ⋮ M.D.S. codes and arcs in \(\mathrm{PG}(n,q)\) with \(q\) even: an improvement of the bounds of Bruen, Thas, and Blokhuis ⋮ Inclusion matrices and the MDS conjecture ⋮ Open problems in finite projective spaces ⋮ Types of superregular matrices and the number of n‐arcs and complete n‐arcs in PG (r, q) ⋮ The packing problem in statistics, coding theory and finite projective spaces ⋮ On the covering radius of Reed-Solomon codes
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