Articles dans des revues avec comité de lecture (47)
  1. 10. Delandtsheer, A. (1992). 2-designs with a group transitive on the pairs of intersecting lines. Bulletin of the Belgian Mathematical Society Simon Stevin, 66, 107-112.
  2. 11. Delandtsheer, A. (1991). Dimensional linear spaces whose automorphism group acts transitively on the (line, hyperplane)-flags. Designs, codes and cryptography, 1, 237-245.
  3. 12. Delandtsheer, A. (1991). Finite flag-transitive semiovals. Journal of combinatorial theory. Series A, 57, 60-67.
  4. 13. Buekenhout, F., Delandtsheer, A., Doyen, J., Kleidman, P. P., Liebeck, M. M., & Saxl, J. (1990). Linear spaces with flag-transitive automophism groups. Geometriae dedicata, 36(1), 89-94. doi:10.1007/BF00181466
  5. 14. Delandtsheer, A., & Doyen, J. (1990). A classification of line-transitive maximal (υ, k)-arcs in finite projective planes. Archiv der Mathematik, 55(2), 187-192. doi:10.1007/BF01189141
  6. 15. Delandtsheer, A., Buekenhout, F., Doyen, J., Kleidman, P. D., Liebeck, M. W., & Saxl, J. (1990). Linear spaces with flag-transitive automorphism groups. Geometriae dedicata, 36, 89-94.
  7. 16. Delandtsheer, A., & Doyen, J. (1990). A classification of line-transitive maximal (v,k)-arcs in finite projective planes. Archiv der Mathematik, 55, 187-192.
  8. 17. Delandtsheer, A. (1989). Line-primitive automorphism groups of finite linear spaces. European journal of combinatorics, 10, 161-169. doi:10.1016/S0195-6698(89)80043-5
  9. 18. Doyen, J., & Delandtsheer, A. (1989). Most block-transitive t-designs are point primitive. Geometriae dedicata, 307-310. doi:10.1007/BF00572446
  10. 19. Buekenhout, F., Doyen, J., & Delandtsheer, A. (1988). Finite linear spaces with flag-transitive groups. Journal of combinatorial theory. Series A, 49(2), 268-293. doi:10.1016/0097-3165(88)90056-8
  11. 20. Delandtsheer, A. (1988). Line-primitive groups of small rank. Discrete mathematics, 68, 103-106.
  12. 21. Blokhuis, A., Brouwer, A., Doyen, J., & Delandtsheer, A. (1987). Orbits on points and lines in finite linear and quasilinear spaces. Journal of combinatorial theory. Series A, 44(1), 159-163. doi:10.1016/0097-3165(87)90069-0
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