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

Daniele Bartoli (UGent) and Leo Storme (UGent)
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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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Please use this url to cite or link to this publication:

Chicago
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.
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.
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.
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.
@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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