Luna's fundamental lemma for diagonalizable groups
Abstract
We study relatively affine actions of a diagonalizable group G on locally noetherian schemes. In particular, we generalize Luna's fundamental lemma when applied to a diagonalizable group: we obtain criteria for a G-equivariant morphism f: X' X to be strongly\ equivariant, namely the base change of the morphism f/\!/G of quotient schemes, and establish descent criteria for f/\!/G to be an open embedding, \'etale, smooth, regular, syntomic, or lci.
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