Cartan subalgebras of root-reductive Lie algebras
Abstract
Root-reductive Lie algebras are direct limits of finite-dimensional reductive Lie algebras under injections which preserve the root spaces. It is known that a root-reductive Lie algebra is a split extension of an abelian Lie algebra by a direct sum of copies of finite-dimensional simple Lie algebras as well as copies of the three simple infinite-dimensional root-reductive Lie algebras slinfty, soinfty, and spinfty. As part of a structure theory program for root-reductive Lie algebras, Cartan subalgebras of the Lie algebra glinfty were introduced and studied in a paper of Neeb and Penkov. In the present paper we refine and extend the results of [N-P] to the case of a general root-reductive Lie algebra g. We prove that the Cartan subalgebras of g are the centralizers of maximal toral subalgebras and that they are nilpotent and self-normalizing. We also give an explicit description of all Cartan subalgebras of the simple Lie algebras slinfty, soinfty, and spinfty. We conclude the paper with a characterization of the set of conjugacy classes of Cartan subalgebras of the Lie algebras glinfty, slinfty, soinfty, and spinfty with respect to the group of automorphisms of the natural representation which preserve the Lie algebra.
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