We show that a 3-spherical building in which each rank 2 residue is connected far away from a chamber, and each rank 3 residue is simply 2-connected far away from a chamber, admits a twinning (i.e., is one half of a twin building) as soon as it admits a codistance, i.e., a twinning with a single chamber
A codistance in a building is a twinning of this building with one chamber. We study this local situ...
A codistance in a building is a twinning of this building with one chamber. We study this local situ...
We study to which extent all pairs of opposite vertices of self-opposite type determine a given buil...
We show that a 3-spherical building in which each rank 2 residue is connected far away from a chambe...
AbstractWe give a local criterion for a relation between the chambers of two buildings to be the opp...
In this paper, we characterize twin apartments in twin buildings by means of the opposition relation...
We classify twin buildings over tree diagrams such that all rank 2 residues are either finite Moufan...
We show that every automorphism of a thick twin building interchanging the halves of the building ma...
AbstractIn this paper, we define twinnings for affine R-buildings. We thus extend the theory of simp...
Spherical and euclidean buildings have been classified by Tits and Weiss and are what is sometimes c...
this paper we prove that the extension is indeed unique, if the set of chambers opposite to a given ...
We prove a rank 3 criterion for the simple connectedness of certain subsets of buildings and we give...
AbstractWe give a local criterion for a relation between the chambers of two buildings to be the opp...
This book is addressed to mathematicians and advanced students interested in buildings, groups and t...
AbstractThe Curtis–Tits–Phan theory as laid out originally by Bennett and Shpectorov describes a way...
A codistance in a building is a twinning of this building with one chamber. We study this local situ...
A codistance in a building is a twinning of this building with one chamber. We study this local situ...
We study to which extent all pairs of opposite vertices of self-opposite type determine a given buil...
We show that a 3-spherical building in which each rank 2 residue is connected far away from a chambe...
AbstractWe give a local criterion for a relation between the chambers of two buildings to be the opp...
In this paper, we characterize twin apartments in twin buildings by means of the opposition relation...
We classify twin buildings over tree diagrams such that all rank 2 residues are either finite Moufan...
We show that every automorphism of a thick twin building interchanging the halves of the building ma...
AbstractIn this paper, we define twinnings for affine R-buildings. We thus extend the theory of simp...
Spherical and euclidean buildings have been classified by Tits and Weiss and are what is sometimes c...
this paper we prove that the extension is indeed unique, if the set of chambers opposite to a given ...
We prove a rank 3 criterion for the simple connectedness of certain subsets of buildings and we give...
AbstractWe give a local criterion for a relation between the chambers of two buildings to be the opp...
This book is addressed to mathematicians and advanced students interested in buildings, groups and t...
AbstractThe Curtis–Tits–Phan theory as laid out originally by Bennett and Shpectorov describes a way...
A codistance in a building is a twinning of this building with one chamber. We study this local situ...
A codistance in a building is a twinning of this building with one chamber. We study this local situ...
We study to which extent all pairs of opposite vertices of self-opposite type determine a given buil...
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