Add to ORKGWe determine all residually weakly primitive flag-transitive geometries for the groups PSL(2, 11) and PGL(2, 11). For the first of these we prove the existence by simple constructions while uniqueness, namely the fact that the lists are complete, relies on MAGMA programs. A central role is played by the subgroups Alt(5) in PSL(2, 11). The highest rank of a geometry in our lists is four. Our work is related to various 'atlases' of coset geometries.SCOPUS: ar.jinfo:eu-repo/semantics/publishe
In 1961, J.Tits has described a way to define a geometry from a group and a collection of subgroups....
We announce the end of the classification of all firm and residually connected geometries satisfying...
The Mathieu group M23 is somehow special when we talk about geometries on which it acts flag-transit...
We announce the classification of all firm and residually connected geometries satisfying the condit...
We classify all firm, residually connected coset geometries, on which the group PSL(3,4) acts as a f...
The main goal of this thesis is a contribution to the classification of all incidence geometriesof r...
We determine all firm and residually connected rank 2 geometries on which PSL(2, q) acts flag-transi...
We determine all firm and residually connected rank 2 geometries on which PSL(2, q) acts flag-transi...
We determine all firm and residually connected rank 2 geometries on which PSL(2, q) acts flag-transi...
AbstractWe classify all firm, residually connected coset geometries, on which the group PSL(3,4) act...
We construct and investigate geometries related to the simple group PSL(2, 19): they all arise from ...
We classify all firm and residually connected coset geometries satisfying the intersection property ...
AbstractWe classify all firm and residually connected coset geometries satisfying the intersection p...
In this paper, we describe a new algorithm to classify primitive coset geometries of rank two for a ...
AbstractIn 1961, J.Tits has described a way to define a geometry from a group and a collection of su...
In 1961, J.Tits has described a way to define a geometry from a group and a collection of subgroups....
We announce the end of the classification of all firm and residually connected geometries satisfying...
The Mathieu group M23 is somehow special when we talk about geometries on which it acts flag-transit...
We announce the classification of all firm and residually connected geometries satisfying the condit...
We classify all firm, residually connected coset geometries, on which the group PSL(3,4) acts as a f...
The main goal of this thesis is a contribution to the classification of all incidence geometriesof r...
We determine all firm and residually connected rank 2 geometries on which PSL(2, q) acts flag-transi...
We determine all firm and residually connected rank 2 geometries on which PSL(2, q) acts flag-transi...
We determine all firm and residually connected rank 2 geometries on which PSL(2, q) acts flag-transi...
AbstractWe classify all firm, residually connected coset geometries, on which the group PSL(3,4) act...
We construct and investigate geometries related to the simple group PSL(2, 19): they all arise from ...
We classify all firm and residually connected coset geometries satisfying the intersection property ...
AbstractWe classify all firm and residually connected coset geometries satisfying the intersection p...
In this paper, we describe a new algorithm to classify primitive coset geometries of rank two for a ...
AbstractIn 1961, J.Tits has described a way to define a geometry from a group and a collection of su...
In 1961, J.Tits has described a way to define a geometry from a group and a collection of subgroups....
We announce the end of the classification of all firm and residually connected geometries satisfying...
The Mathieu group M23 is somehow special when we talk about geometries on which it acts flag-transit...