On the algebraic set of singular elements in a complex simple Lie algebra
Abstract
Let G be a complex simple Lie group and let = Lie\,G. Let S() be the G-module of polynomial functions on and let Sing\, be the closed algebraic cone of singular elements in . Let L S() be the (graded) ideal defining Sing\, and let 2r be the dimension of a G-orbit of a regular element in . Then Lk = 0 for any k<r. On the other hand, there exists a remarkable G-module M Lr which already defines Sing\,. The main results of this paper are a determination of the structure of M.
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