Clifford algebra analogue of Cartan's theorem for symmetric pairs
Abstract
We extend Kostant's results about g-invariants in the Clifford algebra Cl(g) of a complex semisimple Lie algebra g to the relative case of k-invariants in the Clifford algebra Cl(p), where (g,k) is a classical symmetric pair and p is the (-1)-eigenspace of the corresponding involution. In this setup we prove the Cartan theorem for Clifford algebras, a relative transgression theorem, the Harish--Chandra isomorphism for Cl(p), and a relative version of Kostant's Clifford algebra conjecture.
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