More maximal arcs in Desarguesian projective planes and their geometric structure.
Hamilton, Nicholas, Mathon, Rudolf (2003)
Advances in Geometry
Similarity:
Hamilton, Nicholas, Mathon, Rudolf (2003)
Advances in Geometry
Similarity:
Bonisoli, A., Rinaldi, G. (2003)
Advances in Geometry
Similarity:
De Clerck, Frank, Delanote, Mario, Hamilton, Nicholas, Mathon, Rudolf (2002)
Advances in Geometry
Similarity:
Coolsaet, K., Sticker, H. (2010)
The Electronic Journal of Combinatorics [electronic only]
Similarity:
Landjev, Ivan, Rousseva, Assia (2008)
Serdica Journal of Computing
Similarity:
In this paper, we prove the nonexistence of arcs with parameters (232, 48) and (233, 48) in PG(4,5). This rules out the existence of linear codes with parameters [232,5,184] and [233,5,185] over the field with five elements and improves two instances in the recent tables by Maruta, Shinohara and Kikui of optimal codes of dimension 5 over F5.
Alderson, T. (2005)
The Electronic Journal of Combinatorics [electronic only]
Similarity:
Peter Horák (1979)
Mathematica Slovaca
Similarity:
Blokhuis, A., Brouwer, A. E., Wilbrink, H. A. (2003)
Advances in Geometry
Similarity:
D. S. Ramana (2010)
Acta Arithmetica
Similarity:
Blokhuis, A. (1994)
Bulletin of the Belgian Mathematical Society - Simon Stevin
Similarity:
Arthur, David (2003)
The Electronic Journal of Combinatorics [electronic only]
Similarity:
Hamada, Noboru, Maruta, Tatsuya, Oya, Yusuke (2012)
Serdica Journal of Computing
Similarity:
ACM Computing Classification System (1998): E.4. Let q be a prime or a prime power ≥ 3. The purpose of this paper is to give a necessary and sufficient condition for the existence of an (n, r)-arc in PG(2, q ) for given integers n, r and q using the geometric structure of points and lines in PG(2, q ) for n > r ≥ 3. Using the geometric method and a computer, it is shown that there exists no (34, 3) arc in PG(2, 17), equivalently, there exists no [34, 3, 31] 17 code. ...