Liftings of pseudo-reflection groups of toric quotients of Krull schemes
Abstract
Let G be an affine algebraic group with a reductive identity component G0 acting regularly on an affine Krull scheme X = Spec (R) over an algebraically closed field. Let T be an algebraic subtorus of G and suppose that Q(R)T= Q(RT) of quotient fields. We will show: If G is the centralizer of T in G, then the pseudo-reflections of the action of G on RT can be lifted to those on R.
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