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Indices for the Exceptional Bruhat-Tits Buildings
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This chapter considers the affine Tits indices for exceptional Bruhat-Tits buildings. It begins with a few small observations and some notations dealing with the relative type of the affine Tits indices, the canonical correspondence between the circles in a Tits index and the vertices of its relative Coxeter diagram, and Moufang sets. It then presents a proposition about an involutory set, a quaternion division algebra, a root group sequence, and standard involution. It also describes Θ-orbits in S which are disjoint from A and which correspond to the vertices of the Coxeter diagram of Ξ and hence to the types of the panels of Ξ. Finally, it shows how it is possible in many cases to determine properties of the Moufang set and the Tits index for all exceptional Bruhat-Tits buildings of type other than Latin Capital Letter G with Tilde₂.
Princeton University Press
Title: Indices for the Exceptional Bruhat-Tits Buildings
Description:
This chapter considers the affine Tits indices for exceptional Bruhat-Tits buildings.
It begins with a few small observations and some notations dealing with the relative type of the affine Tits indices, the canonical correspondence between the circles in a Tits index and the vertices of its relative Coxeter diagram, and Moufang sets.
It then presents a proposition about an involutory set, a quaternion division algebra, a root group sequence, and standard involution.
It also describes Θ-orbits in S which are disjoint from A and which correspond to the vertices of the Coxeter diagram of Ξ and hence to the types of the panels of Ξ.
Finally, it shows how it is possible in many cases to determine properties of the Moufang set and the Tits index for all exceptional Bruhat-Tits buildings of type other than Latin Capital Letter G with Tilde₂.
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