Jeroen Meulewaeter scite author profile

Rank one groups are a class of doubly transitive groups that are natural generalizations of the groups SL 2 (k). The most interesting examples arise from exceptional algebraic groups of relative rank one. This class of groups is, in turn, intimately related to structurable algebras. The goal of the mini-workshop was to bring together experts on these topics in order to make progress towards a better understanding of the structure of rank one groups.

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Inner Ideals of Real Simple Lie Algebras

Draper

Meulewaeter

2022

Bull. Malays. Math. Sci. Soc.

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Jeroen Meulewaeter

Inner ideals and structurable algebras: Moufang sets, triangles and hexagons

Extremal elements in Lie algebras, buildings and structurable algebras

Inner ideals of real simple Lie algebras

Mini-Workshop: Rank One Groups and Exceptional Algebraic Groups

Inner Ideals of Real Simple Lie Algebras

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