Equivariant principal bundles on nonsingular toric varieties
Abstract
We give a classification of the equivariant principal G-bundles on a nonsingular toric variety when G is a closed Abelian subgroup of GLk(C). We prove that any such bundle splits, that is, admits a reduction of structure group to the intersection of G with a torus. We give an explicit parametrization of the isomorphism classes of such bundles for a large family of G when X is complete.
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