On invariants of a set of elements of a semisimple Lie algebra

Abstract

Let G be a complex reductive algebraic group, g its Lie algebra and h a reductive subalgebra of g, n a positive integer. Consider the diagonal actions G:gn, NG(h):hn. We study a relation between the algebra C[hn]NG(h) and its subalgebra consisting of restrictions to hn of elements of C[gn]G.

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