Stably flat completions of universal enveloping algebras
Abstract
We study localizations (in the sense of J. L. Taylor) of the universal enveloping algebra, U(g), of a complex Lie algebra g. Specifically, let f : U(g) --> H be a homomorphism to some well-behaved topological Hopf algebra H. We formulate some conditions on the dual algebra, H', that are sufficient for H to be stably flat over U(g) (i.e., for f to be a localization). As an application, we prove that the Arens-Michael envelope of U(g) is stably flat over U(g) provided g admits a positive grading. We also show that Goodman's weighted completions of U(g) are stably flat over U(g) for each nilpotent Lie algebra g, and that Rashevskii's hyperenveloping algebra is stably flat over U(g) for arbitrary g. Finally, Litvinov's algebra A(G) of analytic functionals on the corresponding connected, simply connected complex Lie group G is shown to be stably flat over U(g) precisely when g is solvable.
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