Academic Bibliography

 Search 200 years of publications by Ghent University researchers.
Advanced search
1 file | 202.74 KB
Add to list
  1. Search results
  2. A note on characterizing Hermitian cu...

A note on characterizing Hermitian curves via Baer sublines

Bart De Bruyn (UGent)
(2016) RESULTS IN MATHEMATICS. 70(3-4). p.615-622
Author
Organization
Abstract
We consider two families of point sets in (not necessarily finite) projective planes, one of which consists of the Hermitian curves, and give a common characterization of the point sets in both families. One of the properties we use to characterize them will be the existence of a certain configuration of Baer sublines.
Keywords
:Hermitian curve, projective plane, Baer subline, unital, UNITALS

Downloads

  • Download
    Unitals.pdf
    • full text
    • |
    • open access
    • |
    • PDF
    • |
    • 202.74 KB

Citation

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

MLA
De Bruyn, Bart. “A Note on Characterizing Hermitian Curves via Baer Sublines.” RESULTS IN MATHEMATICS, vol. 70, no. 3–4, 2016, pp. 615–22, doi:10.1007/s00025-015-0496-5.
APA
De Bruyn, B. (2016). A note on characterizing Hermitian curves via Baer sublines. RESULTS IN MATHEMATICS, 70(3–4), 615–622. https://doi.org/10.1007/s00025-015-0496-5
Chicago author-date
De Bruyn, Bart. 2016. “A Note on Characterizing Hermitian Curves via Baer Sublines.” RESULTS IN MATHEMATICS 70 (3–4): 615–22. https://doi.org/10.1007/s00025-015-0496-5.
Chicago author-date (all authors)
De Bruyn, Bart. 2016. “A Note on Characterizing Hermitian Curves via Baer Sublines.” RESULTS IN MATHEMATICS 70 (3–4): 615–622. doi:10.1007/s00025-015-0496-5.
Vancouver
1.
De Bruyn B. A note on characterizing Hermitian curves via Baer sublines. RESULTS IN MATHEMATICS. 2016;70(3–4):615–22.
IEEE
[1]
B. De Bruyn, “A note on characterizing Hermitian curves via Baer sublines,” RESULTS IN MATHEMATICS, vol. 70, no. 3–4, pp. 615–622, 2016.
@article{8510630,
  abstract     = {{We consider two families of point sets in (not necessarily finite) projective planes, one of which consists of the Hermitian curves, and give a common characterization of the point sets in both families. One of the properties we use to characterize them will be the existence of a certain configuration of Baer sublines.}},
  author       = {{De Bruyn, Bart}},
  issn         = {{1422-6383}},
  journal      = {{RESULTS IN MATHEMATICS}},
  keywords     = {{:Hermitian curve,projective plane,Baer subline,unital,UNITALS}},
  language     = {{eng}},
  number       = {{3-4}},
  pages        = {{615--622}},
  title        = {{A note on characterizing Hermitian curves via Baer sublines}},
  url          = {{http://doi.org/10.1007/s00025-015-0496-5}},
  volume       = {{70}},
  year         = {{2016}},
}
Altmetric
View in Altmetric
Web of Science
Times cited: