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The second and the third smallest arrangements of hyperplanes in finite projective spaces

Daniele Bartoli (UGent) and Leo Storme (UGent)
(2016) FINITE FIELDS AND THEIR APPLICATIONS. 37. p.225-239
Author
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Keywords
Rational points, Hyperplanes arrangements, Reed-Muller codes, (k_3)-arcs, REED-MULLER CODES, RATIONAL-POINTS, CUBIC CURVES, HYPERSURFACES, P-N(F-Q), NUMBERS, FIELDS

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Citation

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

MLA
Bartoli, Daniele, and Leo Storme. “The Second and the Third Smallest Arrangements of Hyperplanes in Finite Projective Spaces.” FINITE FIELDS AND THEIR APPLICATIONS 37 (2016): 225–239. Print.
APA
Bartoli, D., & Storme, L. (2016). The second and the third smallest arrangements of hyperplanes in finite projective spaces. FINITE FIELDS AND THEIR APPLICATIONS, 37, 225–239.
Chicago author-date
Bartoli, Daniele, and Leo Storme. 2016. “The Second and the Third Smallest Arrangements of Hyperplanes in Finite Projective Spaces.” Finite Fields and Their Applications 37: 225–239.
Chicago author-date (all authors)
Bartoli, Daniele, and Leo Storme. 2016. “The Second and the Third Smallest Arrangements of Hyperplanes in Finite Projective Spaces.” Finite Fields and Their Applications 37: 225–239.
Vancouver
1.
Bartoli D, Storme L. The second and the third smallest arrangements of hyperplanes in finite projective spaces. FINITE FIELDS AND THEIR APPLICATIONS. 2016;37:225–39.
IEEE
[1]
D. Bartoli and L. Storme, “The second and the third smallest arrangements of hyperplanes in finite projective spaces,” FINITE FIELDS AND THEIR APPLICATIONS, vol. 37, pp. 225–239, 2016.
@article{6843804,
  author       = {Bartoli, Daniele and Storme, Leo},
  issn         = {1071-5797},
  journal      = {FINITE FIELDS AND THEIR APPLICATIONS},
  keywords     = {Rational points,Hyperplanes arrangements,Reed-Muller codes,(k_3)-arcs,REED-MULLER CODES,RATIONAL-POINTS,CUBIC CURVES,HYPERSURFACES,P-N(F-Q),NUMBERS,FIELDS},
  language     = {eng},
  pages        = {225--239},
  title        = {The second and the third smallest arrangements of hyperplanes in finite projective spaces},
  url          = {http://dx.doi.org/10.1016/j.ffa.2015.10.001},
  volume       = {37},
  year         = {2016},
}
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