Spin Norm and Lambda Norm
Abstract
Given a K-type π, it is known that its spin norm (due to first-named author) is lower bounded by its lambda norm (due to Vogan). That is, \|π\| spin≥ \|π\| lambda. This note aims to describe for which π one can actually have equality. We apply the result to tempered Dirac series. In the case of real groups, we obtain that the tempered Dirac series are divided into \#W1 parts among all tempered modules with real infinitesimal characters.
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