Multiple rational normal forms in Lie theory
Abstract
We study the decomposition of a generic element g ∈ G of a connected reductive complex algebraic group G in the form g = N(g) B(g) u N(g)-1 where N: G N- and B : G B+ are rational maps onto a unipotent subgroup N- and a Borel subgroup B+ opposite to N-, and u is a representative of a Weyl group element u. We introduce a class of rational Weyl group elements that give rise to such decompositions, and study their various properties.
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