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Dedicated to the memory of the late professor Stefan Dodunekov on the occasion of his 70th anniversary. We classify up to multiplier equivalence maximal (v, 3, 1) optical orthogonal codes (OOCs) with v ≤ 61 and maximal (v, 3, 2, 1) OOCs with v ≤ 99. There is a one-to-one correspondence between maximal (v, 3, 1) OOCs, maximal cyclic binary constant weight codes of weight 3 and minimum dis tance 4, (v, 3; ⌊(v − 1)/6⌋) difference packings, and maximal (v, 3, 1) binary cyclically permutable constant...

Classification of span-symmetric generalized quadrangles of order $s$ .

Thas, Koen (2002)

Advances in Geometry

Classification of the Steiner quadruple systems of cardinality 32

M. H. Armanious (1989)

Beiträge zur Algebra und Geometrie = Contributions to algebra and geometry

Codes and projective multisets.

Dodunekov, Stefan, Simonis, Juriaan (1998)

The Electronic Journal of Combinatorics [electronic only]

Collineation Groups of Finite Projective Planes Whose Sylow 2-Subgroups Contain at most Three Involutions.

Terry Czerwinski (1974)

Mathematische Zeitschrift

Collineation groups of translation planes of small dimension.

Ostrom, T.G. (1981)

International Journal of Mathematics and Mathematical Sciences

Collineation Groups Whose Order is Prime to the Characteristic.

Thedore G. Ostrom (1977)

Mathematische Zeitschrift

Collineations and Extensions of Translation Nets.

Aiden A. Bruen (1975)

Mathematische Zeitschrift

Collineations of Subiaco and Cherowitzo hyperovals.

O'Keefe, Christine M., Thas, J.A. (1996)

Bulletin of the Belgian Mathematical Society - Simon Stevin

Collineations of the Subiaco generalized quadrangles.

Payne, S.E. (1994)

Bulletin of the Belgian Mathematical Society - Simon Stevin

Combinatorial and group-theoretic compactifications of buildings

Pierre-Emmanuel Caprace, Jean Lécureux (2011)

Annales de l’institut Fourier

Let $X$ be a building of arbitrary type. A compactification $𝒞_{sph} (X)$ of the set ${Res}_{sph} (X)$ of spherical residues of $X$ is introduced. We prove that it coincides with the horofunction compactification of ${Res}_{sph} (X)$ endowed with a natural combinatorial distance which we call the root-distance. Points of $𝒞_{sph} (X)$ admit amenable stabilisers in $Aut (X)$ and conversely, any amenable subgroup virtually fixes a point in $𝒞_{sph} (X)$ . In addition, it is shown that, provided $Aut (X)$ is transitive enough, this compactification also coincides with the group-theoretic...

Combinatorial Geometries Representable over GF(3) and GF(q). I. The Number of Points.

J.P.S. Kung (1990)

Discrete & computational geometry

Combing Euclidean buildings.

Noskov, Gennady A. (2000)

Geometry & Topology

Complète réductibilité

Jean-Pierre Serre (2003/2004)

Séminaire Bourbaki

La notion de complète réductibilité d’une représentation linéaire $Γ \to {𝐆𝐋}_{n}$ peut se définir en termes de l’action de $Γ$ sur l’immeuble de Tits de ${𝐆𝐋}_{n}$ . Cela suggère une notion analogue pour tous les immeubles sphériques, et donc aussi pour tous les groupes réductifs. On verra comment cette notion se traduit en termes topologiques et quelles applications on peut en tirer.

Composing T-designs

Lowell A. Carmony (1981)

Colloquium Mathematicae

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