Representations of Complex Semi-simple Lie Groups and Lie Algebras

Khare, Apoorva

doi:10.1007/978-93-86279-56-9_5

Cited by 4 publications

(1 citation statement)

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“…The P k highest weight of the PRV component ( [7], Lemma 2.26, [15]) and ( [16], Theorem 3.5 and §3.2) of τ 1 ⊗ τ 2 lies in the W K -orbit of the sum 'highest weight of τ 1 + lowest weight of τ 2 '. According to V.S.…”

Section: Proposition 320 For a Nonempty Subsetmentioning

confidence: 99%

Classification of discrete series by minimal 𝐾-type

Parthasarathy

2015

Represent. Theory

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Abstract. Following the proof by Hecht and Schmid of Blattner's conjecture for K multiplicities of representations belonging to the discrete series it turned out that some results which were earlier known with some hypothesis on the Harish-Chandra parameter of the discrete series representation could be extended removing those hypotheses. For example this was so for the geometric realization problem. Occasionally a few other results followed by first proving them for Harish-Chandra parameters which are sufficiently regular and then using Zuckerman translation functors, wall crossing methods, etc. Recently, Hongyu He raised the question (private communication) of whether the characterization of a discrete series representation by its lowest K-type, which was proved by this author and R. Hotta with some hypothesis on the HarishChandra parameter of the discrete series representations, can be extended to all discrete series representations excluding none, using a combination of these powerful techniques. In this article we will answer this question using Dirac operator methods and a result of Susana Salamanca-Riba.

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Section: Proposition 320 For a Nonempty Subsetmentioning

confidence: 99%