Characterizing quasi-affine spherical varieties via the automorphism group
Abstract
Let G be a connected reductive algebraic group. In this note we prove that for a quasi-affine G-spherical variety the weight monoid is determined by the weights of its non-trivial Ga-actions that are homogeneous with respect to a Borel subgroup of G. As an application we get that a smooth affine G-spherical variety that is non-isomorphic to a torus is determined by its automorphism group inside the category of smooth affine irreducible varieties.
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