Functoriality properties of the dual group
Abstract
Let G be a connected reductive group. In a previous paper, arxiv:1702.08264, is was shown that the dual group GX attached to a G-variety X admits a natural homomorphism with finite kernel to the Langlands dual group G of G. Here, we prove that the dual group is functorial in the following sense: if there is a dominant G-morphism X Y or an injective G-morphism Y X then there is a canonical homomorphism GY GX which is compatible with the homomorphisms to G.
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