Zuckerman functor

This article is about the Zuckerman induction functor, which is not the same as the (Zuckerman) translation functor.

In mathematics, a Zuckerman functor is used to construct representations of real reductive Lie groups from representations of Levi subgroups. They were introduced by Gregg Zuckerman (1978). The Bernstein functor is closely related.

Notation and terminology

Definition

The Zuckerman functor Γ is defined by

\Gamma^{g,K}_{g,L\cap K}(W) = \hom_{R(g,L\cap K)}(R(g,K),W)_K

and the Bernstein functor Π is defined by

\Pi^{g,K}_{g,L\cap K}(W) = R(g,K)\otimes_{R(g,L\cap K)}W.

References

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