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Vogan raised the idea of Dirac cohomology to study representations of semisimple Lie groups and Lie algebras. He conjectured that the infinitesimal character of Harish-Chandra modules are determined by their Dirac cohomology. Huang and…

Representation Theory · Mathematics 2020-06-30 Wei Xiao

We study the behavior of Dirac cohomology under Howe's $\Theta$-correspondence in the case of complex reductive dual pairs. More precisely, if $(G_1,G_2)$ is a complex reductive dual pair with $G_1$ and $G_2$ viewed as real groups, we…

Representation Theory · Mathematics 2023-07-27 Spyridon Afentoulidis-Almpanis , Gang Liu , Salah Mehdi

The smooth hermitian representations of a split reductive p-adic group whose restriction to a maximal hyperspecial compact subgroup contain a single K-type with Iwahori fixed vectors have been studied in [D. Barbasch, A. Moy, Classification…

Representation Theory · Mathematics 2012-08-24 Dan Ciubotaru , Allen Moy

This paper studies unitary representations with Dirac cohomology for complex groups, in particular relations to unipotent representations

Representation Theory · Mathematics 2010-07-09 Dan Barbasch , Pavle Pandžić

The idea of using Dirac cohomology to study branching laws was initiated by Huang, Pandzi\'c and Zhu in 2013 [HPZ]. One of their results says that the Dirac cohomology of $\pi$ completely determines $\pi|_{K}$, where $\pi$ is any…

Representation Theory · Mathematics 2024-11-07 Chao-Ping Dong , Yongzhi Luan , Haojun Xu

In this paper, we classify all unitary representations with non-zero Dirac cohomology for complex Lie group of Type E8. This completes the classification of Dirac series for all complex simple Lie groups.

Representation Theory · Mathematics 2026-04-22 Dan Barbasch , Kayue Daniel Wong

Let $G$ be a connected simply connected noncompact classical simple Lie group of Hermitian type. Then $G$ has unitary highest weight representations. The proof of the classification of unitary highest weight representations of $G$ given by…

Representation Theory · Mathematics 2025-10-20 Pavle Pandžić , Ana Prlić , Vladimír Souček , Vít Tuček

We study Dirac cohomology $H_D^{\mathfrak{g},\mathfrak{h}}(M)$ for modules belonging to category $\mathcal{O}$ of a finite dimensional complex semisimple Lie algebra. We prove Vogan's conjecture, a nonvanishing result for…

Representation Theory · Mathematics 2023-10-18 Spyridon Afentoulidis-Almpanis

Up to equivalence, this paper classifies all the irreducible unitary representations with non-zero Dirac cohomology for the following simple real exceptional Lie groups: ${\rm EI}=E_{6(6)}, {\rm EIV}=E_{6(-26)}, {\rm FI}=F_{4(4)}, {\rm…

Representation Theory · Mathematics 2020-05-12 Jian Ding , Chao-Ping Dong , Liang Yang

Let $G$ be $Sp(2n, \mathbb{R})$ or $SO^*(2n)$. We compute the Dirac index of a large class of unitary representations considered by Vogan in Section 8 of [Vog84], which include all weakly fair $A_{\mathfrak{q}}(\lambda)$ modules and…

Representation Theory · Mathematics 2021-02-17 Chao-Ping Dong , Kayue Daniel Wong

Let $G$ be a complex connected simple algebraic group with a fixed real form $\sigma$. Let $G(\mathbb{R})=G^\sigma$ be the corresponding group of real points. This paper reports a finiteness theorem for the classification of irreducible…

Representation Theory · Mathematics 2019-01-17 Chao-Ping Dong

Dirac operators and Dirac cohomology for Lie superalgebras of Riemannian type, introduced by Huang and Pand\v{z}i\'{c}, provide an effective tool for the study of unitarizable supermodules. In this article, we study these objects for Lie…

Representation Theory · Mathematics 2026-03-24 Steffen Schmidt

This paper classifies the equivalence classes of irreducible unitary representations with nonvanishing Dirac cohomology for complex $E_6$. This is achieved by using our finiteness result, and by improving the computing method.

Representation Theory · Mathematics 2018-12-27 Chao-Ping Dong

Let $G$ be a connected simply connected noncompact exceptional simple Lie group of Hermitian type. In this paper, we work with the Dirac inequality which is a very useful tool for the classification of unitary highest weight modules.

Representation Theory · Mathematics 2025-10-20 Pavle Pandžić , Ana Prlić , Vladimír Souček , Vít Tuček

Let $\mathfrak{g}$ be a reductive Lie algebra over $\mathbb{C}$. For any simple weight module of $\mathfrak{g}$ with finite-dimensional weight spaces, we show that its Dirac cohomology is vanished unless it is a highest weight module. This…

Representation Theory · Mathematics 2022-09-27 Jingsong Huang , Wei Xiao

In this paper, we review the construction of the Dirac operator for graded affine Hecke algebras and calculate the Dirac cohomology of irreducible unitary modules for the graded Hecke algebra of gl(n).

Representation Theory · Mathematics 2012-07-13 Dan Barbasch , Dan Ciubotaru

We define uniformly the notions of Dirac operators and Dirac cohomology in the framework of the Hecke algebras introduced by Drinfeld. We generalize in this way the Dirac cohomology theory for Lusztig's graded affine Hecke algebras. We…

Representation Theory · Mathematics 2015-06-23 Dan Ciubotaru

Extending ideas of twisted equivariant $K$-theory, we construct twisted versions of the representation rings for Lie superalgebras and Lie supergroups, built from projective $\Z_{2}$-graded representations with a given cocycle. We then…

Representation Theory · Mathematics 2007-05-23 Gregory D. Landweber

This paper computes the Dirac index of all the weakly fair $A_{\mathfrak{q}}(\lambda)$ modules of $U(p, q)$. Although counter-examples have been found to a conjecture of Vogan on the unitary dual of $U(p, q)$ phrased by Trapa in 2001, we…

Representation Theory · Mathematics 2020-10-15 Chao-ping Dong , Kayue Daniel Wong

Up to equivalence, this paper classifies all the irreducible unitary representations with non-zero Dirac cohomology for the simple Lie group $E_{6(-14)}$, which is of Hermitian symmetric type. Each FS-scattered Dirac series of $E_{6(-14)}$…

Representation Theory · Mathematics 2021-10-12 Lin-Gen Ding , Chao-Ping Dong , Haian He
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