Add to ORKGGeneralized polygons are rank 2 geometries that were introduced by Jacques Tits in order to better understand the twisted triality groups, see [29]. As pre-cursors of buildings, they were the spherical rank 2 buildings avant-la-lettre. The standard examples are related to simple algebraic groups of relative ran
AbstractStarting with the Tits’ description of the Moufang hexagons we discuss the construction of t...
Buildings were introduced by Jacques Tits in order to provide a unified geometric framework for unde...
We classify the convex subspaces of all hexagonic Lie incidence geometries (among which all long roo...
This book is intended to be an introduction to the fascinating theory ofgeneralized polygons for bot...
Generalized polygons are Bruhat-Tits buildings of rank two. They can also be defined in terms of the...
A generalized polygon is a thick incidence geometry of rank 2 such that the girth of the incidence g...
We describe new classification results in the theory of generalized quadrangles (= Tits-buildings of...
AbstractThe group of projectivities of (a line of) a projective plane is always 3-transitive. It is ...
AbstractThe generalized triangle, quadrangle, and hexagons of order 2 are small point-line geometrie...
AbstractFor every hyperovalOofPG(2,q) (qeven), we construct an extended generalized quadrangle with ...
For every hyperoval O of PG(2.q) (q even). we construct an extended generalized quadrangle with poin...
Using the classification of the finite simple groups, we classify all finite generalized polygons ha...
In this work we introduce generalized projective geometries which are a natural generalization of pr...
AbstractCertain Generalized Quadrangles are viewed as amalgamations of compatible finite projective ...
In 2000, J. Tits and R. Weiss classified all Moufang spherical buildings of rank 2, also known as Mo...
AbstractStarting with the Tits’ description of the Moufang hexagons we discuss the construction of t...
Buildings were introduced by Jacques Tits in order to provide a unified geometric framework for unde...
We classify the convex subspaces of all hexagonic Lie incidence geometries (among which all long roo...
This book is intended to be an introduction to the fascinating theory ofgeneralized polygons for bot...
Generalized polygons are Bruhat-Tits buildings of rank two. They can also be defined in terms of the...
A generalized polygon is a thick incidence geometry of rank 2 such that the girth of the incidence g...
We describe new classification results in the theory of generalized quadrangles (= Tits-buildings of...
AbstractThe group of projectivities of (a line of) a projective plane is always 3-transitive. It is ...
AbstractThe generalized triangle, quadrangle, and hexagons of order 2 are small point-line geometrie...
AbstractFor every hyperovalOofPG(2,q) (qeven), we construct an extended generalized quadrangle with ...
For every hyperoval O of PG(2.q) (q even). we construct an extended generalized quadrangle with poin...
Using the classification of the finite simple groups, we classify all finite generalized polygons ha...
In this work we introduce generalized projective geometries which are a natural generalization of pr...
AbstractCertain Generalized Quadrangles are viewed as amalgamations of compatible finite projective ...
In 2000, J. Tits and R. Weiss classified all Moufang spherical buildings of rank 2, also known as Mo...
AbstractStarting with the Tits’ description of the Moufang hexagons we discuss the construction of t...
Buildings were introduced by Jacques Tits in order to provide a unified geometric framework for unde...
We classify the convex subspaces of all hexagonic Lie incidence geometries (among which all long roo...