Topological uniqueness results for the special linear and other classical Lie Algebras.
Description:
Suppose L is a complete separable metric topological group (ring, field, etc.). L is topologically unique if the Polish topology on L is uniquely determined by its underlying algebraic structure. More specifically, L is topologically unique if an algebraic isomorphism of L with any other complete separable metric topological group (ring, field, etc.) induces a topological isomorphism. A local field is a locally compact topological field with non-discrete topology. The only local fields (up to i…
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Access:
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Date:
December 2001
Creator:
Rees, Michael K.
Partner:
UNT Libraries