Advanced search
1 file | 487.81 KB Add to list

Partial ovoids and partial spreads in symplectic and orthogonal polar spaces

Jan De Beule (UGent) , Andreas Klein (UGent) , K Metsch and Leo Storme (UGent)
(2008) EUROPEAN JOURNAL OF COMBINATORICS. 29(5). p.1280-1297
Author
Organization
Abstract
We present improved lower bounds on the sizes of small maximal partial ovoids and small maximal partial spreads in the classical symplectic and orthogonal polar spaces, and improved upper bounds on the sizes of large maximal partial ovoids and large maximal partial spreads in the classical symplectic and orthogonal polar spaces. An overview of the status regarding these results is given in tables. The similar results for the hermitian classical polar spaces are presented in [J. De Beule, A. Klein, K. Metsch, L. Storme, Partial ovoids and partial spreads in hermitian polar spaces, Des. Codes Cryptogr. (in press)].

Downloads

  • DBKMS EJC2008.pdf
    • full text
    • |
    • open access
    • |
    • PDF
    • |
    • 487.81 KB

Citation

Please use this url to cite or link to this publication:

MLA
De Beule, Jan et al. “Partial Ovoids and Partial Spreads in Symplectic and Orthogonal Polar Spaces.” EUROPEAN JOURNAL OF COMBINATORICS 29.5 (2008): 1280–1297. Print.
APA
De Beule, Jan, Klein, A., Metsch, K., & Storme, L. (2008). Partial ovoids and partial spreads in symplectic and orthogonal polar spaces. EUROPEAN JOURNAL OF COMBINATORICS, 29(5), 1280–1297.
Chicago author-date
De Beule, Jan, Andreas Klein, K Metsch, and Leo Storme. 2008. “Partial Ovoids and Partial Spreads in Symplectic and Orthogonal Polar Spaces.” European Journal of Combinatorics 29 (5): 1280–1297.
Chicago author-date (all authors)
De Beule, Jan, Andreas Klein, K Metsch, and Leo Storme. 2008. “Partial Ovoids and Partial Spreads in Symplectic and Orthogonal Polar Spaces.” European Journal of Combinatorics 29 (5): 1280–1297.
Vancouver
1.
De Beule J, Klein A, Metsch K, Storme L. Partial ovoids and partial spreads in symplectic and orthogonal polar spaces. EUROPEAN JOURNAL OF COMBINATORICS. 2008;29(5):1280–97.
IEEE
[1]
J. De Beule, A. Klein, K. Metsch, and L. Storme, “Partial ovoids and partial spreads in symplectic and orthogonal polar spaces,” EUROPEAN JOURNAL OF COMBINATORICS, vol. 29, no. 5, pp. 1280–1297, 2008.
@article{434883,
  abstract     = {We present improved lower bounds on the sizes of small maximal partial ovoids and small maximal partial spreads in the classical symplectic and orthogonal polar spaces, and improved upper bounds on the sizes of large maximal partial ovoids and large maximal partial spreads in the classical symplectic and orthogonal polar spaces. An overview of the status regarding these results is given in tables. The similar results for the hermitian classical polar spaces are presented in [J. De Beule, A. Klein, K. Metsch, L. Storme, Partial ovoids and partial spreads in hermitian polar spaces, Des. Codes Cryptogr. (in press)].},
  author       = {De Beule, Jan and Klein, Andreas and Metsch, K and Storme, Leo},
  issn         = {0195-6698},
  journal      = {EUROPEAN JOURNAL OF COMBINATORICS},
  language     = {eng},
  number       = {5},
  pages        = {1280--1297},
  title        = {Partial ovoids and partial spreads in symplectic and orthogonal polar spaces},
  url          = {http://dx.doi.org/10.1016/j.ejc.2007.06.004},
  volume       = {29},
  year         = {2008},
}

Altmetric
View in Altmetric
Web of Science
Times cited: