Jan De Beule

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2012

15 Jan De Beule, Anja Hallez, Leo Storme: A characterisation result on a particular class of non-weighted minihypers. Des. Codes Cryptography 63(2): 159-170 (2012)

2010

14 Jan De Beule, Yves Edel, Emilia Käsper, Andreas Klein, Svetla Nikova, Bart Preneel, Jeroen Schillewaert, Leo Storme: Galois geometries and applications. Des. Codes Cryptography 56(2-3): 85-86 (2010)

13 Simeon Ball, Jan De Beule, Leo Storme, Péter Sziklai, Tamás Szonyi: In memoriam, András Gács. Des. Codes Cryptography 56(2-3): 87-88 (2010)

2009

12 Jan De Beule, Patrick Govaerts, Anja Hallez, Leo Storme: Tight sets, weighted m -covers, weighted m -ovoids, and minihypers. Des. Codes Cryptography 50(2): 187-201 (2009)

2008

11 Jan De Beule, Andreas Klein, Klaus Metsch, Leo Storme: Partial ovoids and partial spreads in hermitian polar spaces. Des. Codes Cryptography 47(1-3): 21-34 (2008)

10 Jan De Beule, Klaus Metsch, Leo Storme: Characterization results on arbitrary non-weighted minihypers and on linear codes meeting the Griesmer bound. Des. Codes Cryptography 49(1-3): 187-197 (2008)

9 Jan De Beule, Andreas Klein, Klaus Metsch, Leo Storme: Partial ovoids and partial spreads in symplectic and orthogonal polar spaces. Eur. J. Comb. 29(5): 1280-1297 (2008)

8 Jan De Beule, András Gács: Complete arcs on the parabolic quadric Q(4, q). Finite Fields and Their Applications 14(1): 14-21 (2008)

2007

7 Jan De Beule, Klaus Metsch, Leo Storme: Characterization results on small blocking sets of the polar spaces Q ⁺(2 n + 1, 2) and Q ⁺(2 n + 1, 3). Des. Codes Cryptography 44(1-3): 197-207 (2007)

6 Jan De Beule, Klaus Metsch: The maximum size of a partial spread in H(5, q²) is q³+1. J. Comb. Theory, Ser. A 114(4): 761-768 (2007)

2005

5 Jan De Beule, Klaus Metsch: The smallest point sets that meet all generators of H(2n, q²). Discrete Mathematics 294(1-2): 75-81 (2005)

4 Jan De Beule, Leo Storme: On the smallest minimal blocking sets of Q(2n, q), for q an odd prime. Discrete Mathematics 294(1-2): 83-107 (2005)

3 Jan De Beule, Klaus Metsch: Minimal blocking sets of size q²+2 of Q(4, q), q an odd prime, do not exist. Finite Fields and Their Applications 11(2): 305-315 (2005)

2004

2 Jan De Beule, Klaus Metsch: Small point sets that meet all generators of Q(2n, p), p>3 prime. J. Comb. Theory, Ser. A 106(2): 327-333 (2004)

2003

1 Matthew R. Brown, Jan De Beule, Leo Storme: Maximal partial spreads of T₂(O) and T₃. Eur. J. Comb. 24(1): 73-84 (2003)

	2012
15		Jan De Beule, Anja Hallez, Leo Storme: A characterisation result on a particular class of non-weighted minihypers. Des. Codes Cryptography 63(2): 159-170 (2012)
	2010
14		Jan De Beule, Yves Edel, Emilia Käsper, Andreas Klein, Svetla Nikova, Bart Preneel, Jeroen Schillewaert, Leo Storme: Galois geometries and applications. Des. Codes Cryptography 56(2-3): 85-86 (2010)
13		Simeon Ball, Jan De Beule, Leo Storme, Péter Sziklai, Tamás Szonyi: In memoriam, András Gács. Des. Codes Cryptography 56(2-3): 87-88 (2010)
	2009
12		Jan De Beule, Patrick Govaerts, Anja Hallez, Leo Storme: Tight sets, weighted m -covers, weighted m -ovoids, and minihypers. Des. Codes Cryptography 50(2): 187-201 (2009)
	2008
11		Jan De Beule, Andreas Klein, Klaus Metsch, Leo Storme: Partial ovoids and partial spreads in hermitian polar spaces. Des. Codes Cryptography 47(1-3): 21-34 (2008)
10		Jan De Beule, Klaus Metsch, Leo Storme: Characterization results on arbitrary non-weighted minihypers and on linear codes meeting the Griesmer bound. Des. Codes Cryptography 49(1-3): 187-197 (2008)
9		Jan De Beule, Andreas Klein, Klaus Metsch, Leo Storme: Partial ovoids and partial spreads in symplectic and orthogonal polar spaces. Eur. J. Comb. 29(5): 1280-1297 (2008)
8		Jan De Beule, András Gács: Complete arcs on the parabolic quadric Q(4, q). Finite Fields and Their Applications 14(1): 14-21 (2008)
	2007
7		Jan De Beule, Klaus Metsch, Leo Storme: Characterization results on small blocking sets of the polar spaces Q ⁺(2 n + 1, 2) and Q ⁺(2 n + 1, 3). Des. Codes Cryptography 44(1-3): 197-207 (2007)
6		Jan De Beule, Klaus Metsch: The maximum size of a partial spread in H(5, q²) is q³+1. J. Comb. Theory, Ser. A 114(4): 761-768 (2007)
	2005
5		Jan De Beule, Klaus Metsch: The smallest point sets that meet all generators of H(2n, q²). Discrete Mathematics 294(1-2): 75-81 (2005)
4		Jan De Beule, Leo Storme: On the smallest minimal blocking sets of Q(2n, q), for q an odd prime. Discrete Mathematics 294(1-2): 83-107 (2005)
3		Jan De Beule, Klaus Metsch: Minimal blocking sets of size q²+2 of Q(4, q), q an odd prime, do not exist. Finite Fields and Their Applications 11(2): 305-315 (2005)
	2004
2		Jan De Beule, Klaus Metsch: Small point sets that meet all generators of Q(2n, p), p>3 prime. J. Comb. Theory, Ser. A 106(2): 327-333 (2004)
	2003
1		Matthew R. Brown, Jan De Beule, Leo Storme: Maximal partial spreads of T₂(O) and T₃. Eur. J. Comb. 24(1): 73-84 (2003)

Coauthor Index

1 Simeon Ball [13]

2 Matthew R. Brown [1]

3 Yves Edel [14]

4 András Gács [8]

5 Patrick Govaerts [12]

6 Anja Hallez [12] [15]

7 Emilia Käsper [14]

8 Andreas Klein [9] [11] [14]

9 Klaus Metsch [2] [3] [5] [6] [7] [9] [10] [11]

10 Svetla Nikova [14]

11 Bart Preneel [14]

12 Jeroen Schillewaert [14]

13 Leo Storme [1] [4] [7] [9] [10] [11] [12] [13] [14] [15]

14 Péter Sziklai [13]

15 Tamás Szonyi (Tamás Szönyi) [13]

Last update Sun May 27 04:04:01 2012 CET by the DBLP Team —

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1	Simeon Ball	[13]
2	Matthew R. Brown	[1]
3	Yves Edel	[14]
4	András Gács	[8]
5	Patrick Govaerts	[12]
6	Anja Hallez	[12] [15]
7	Emilia Käsper	[14]
8	Andreas Klein	[9] [11] [14]
9	Klaus Metsch	[2] [3] [5] [6] [7] [9] [10] [11]
10	Svetla Nikova	[14]
11	Bart Preneel	[14]
12	Jeroen Schillewaert	[14]
13	Leo Storme	[1] [4] [7] [9] [10] [11] [12] [13] [14] [15]
14	Péter Sziklai	[13]
15	Tamás Szonyi (Tamás Szönyi)	[13]