Lie algebras of quotient groups
Abstract
We give conditions on a diffeological group G and a normal subgroup H under which the quotient group G/H differentiates to a Lie algebra for which Lie(G/H) Lie(G)/Lie(H). Our Lie functor is instantiated by the tangent structure on elastic diffeological spaces introduced by Blohmann. The requisite conditions on G and H hold, for example, when G is a convenient infinite-dimensional Lie group and H is countable, or when G is finite-dimensional and H is arbitrary. To recognize that convenient infinite-dimensional manifolds are elastic diffeological spaces, we give a characterization of convenience in terms of the diffeological tangent functor: a separated and bornological locally convex topological vector space E is convenient if and only if the natural map E × E TE is an isomorphism of diffeological spaces. As an application, we integrate some classically non-integrable Banach-Lie algebras to diffeological groups.
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