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Linear representations of algebras and groups, Lie theory, associative algebras, multilinear algebra.

8 votes

restriction of a representation of GL(n) to GL(n-1)

Though Peter's answer addresses the finite-dimensional representation theory, I believe that the question asks about the unitary representations on Hilbert spaces, and more general irreps on Banach an …
Marty's user avatar
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13 votes
Accepted

a question about irreducibility of representations and Kirillov conjecture

I think it's best to look at the relatively recent paper of Moshe Baruch, Annals of Math., "A Proof of Kirillov's Conjecture" -- in the introduction of his paper, he discusses the basic techniques of …
Marty's user avatar
  • 13.3k
11 votes

Can you "Wedge" two representations?

Nope. Really, this is a linear algebra question. You can take tensor products of pairs of vector spaces, symmetric and exterior powers of a single vector space. These are all functorial, so extend …
Marty's user avatar
  • 13.3k
26 votes
Accepted

decomposition of representations of a product group

I agree with David Speyer's answer, and furthermore there is no canonical way to construct $V_i$ from $V$. This is a subtle and oft-overlooked point in representation theory, in my opinion. Many tex …
Marty's user avatar
  • 13.3k
12 votes
1 answer
1k views

External tensor product of irreducible representations is not irreducible?

I'm writing up some notes, and I realize I don't have a counterexample for something I suspect is false. Dubious claim: If $(\pi, V)$ and $(\rho, W)$ are irreducible representations of two groups $G …
Marty's user avatar
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5 votes
Accepted

Restriction of smooth representaions of SL(2,Q_p) to the maximal compact

This question was treated by Monica Nevins in the following pair of papers. Nevins, Monica, Branching rules for principal series representations of SL(2) over a $p$-adic field, Can. J. Math. 57, No …
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2 votes
Accepted

Shimura correspondence for automorphic forms on other groups

There's not a short answer to this question, but here are a few points: Regarding the claim that "the Shimura correspondence does not fit into Langlands functoriality." In some sense it does now! …
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  • 13.3k
3 votes

Structure of cuspidal Bernstein components—do non-commutative endomorphism rings ever really...

First, for generalities related to the question, I'd recommend the article of Bushnell and Henniart, " Generalized Whittaker Models and the Bernstein Center," in Amer. J. of Math., Vol. 125, No. 3, Ju …
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7 votes

Induction of tensor product vs. tensor product of inductions

Try using Frobenius reciprocity. Let $V$ and $W$ be two representations of $H$, and let $U$ be a representation of $G$. Consider first the space: $$Hom_G \left(U, Ind_H^G (V \otimes W) \right) \con …
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  • 13.3k
21 votes
Accepted

What is a special parahoric subgroup?

I'd recommend first that you and your friend spend more time with Tits :), "Reductive groups over local fields", from the Corvallis volume (free online, last time I checked). Undoubtably there are ot …
16 votes

Is there analogue of Peter–Weyl theorem for non-compact or quantum group

I don't know anything about quantum groups, but the Peter-Weyl theorem for compact groups generalizes nicely to Type I second-countable locally compact topological groups, a result of Segal and Mautne …
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6 votes

Does local Langlands functoriality preserve genericity?

The general conjectural picture is the Gross-Prasad conjecture, found in Section 2 of Gross and Prasad's paper "On the decomposition of a representation of $SO_n$ when restricted to $SO_{n−1}$." The …
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12 votes

When does a unitary Hilbert space rep of a reductive Lie group decompose into a direct sum o...

First a few background references: Read Mackey's books or articles for much more on unitary representations. Especially the Bull. AMS article "Infinite-dimensional group representations" from 1963 i …
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14 votes
Accepted

Representation theory of reductive groups in characteristic $p$ as a limit of the theories i...

I think, although it's dated later than Deligne's paper that you mentioned, that the first written instance of Kazhdan's principle is in the paper "Representations of groups over close local fields", …
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12 votes
Accepted

Type of 26-dimensional representation of different real forms of the complex simple Lie alge...

I think the best way to see the signature of these quadratic forms is by using the formula from "A Classification Theorem for Albert Algebras" by R. Parimala, R. Sridharan, and Maneesh L. Thakur, Tran …
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