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The tensor product algebra TA(n) for the complex general linear group GL(n), introduced by Howe et al., describes the decomposition of tensor products of irreducible polynomial representations of GL(n). Using the hive model for the…

Representation Theory · Mathematics 2019-11-21 Donggyun Kim , Sangjib Kim , Euisung Park

The role of Spaltenstein varieties in the tensor product for GL is explained. In particular a direct (non-combinatorial) proof of the fact that the number of irreducible components of a Spaltenstein variety is equal to a…

Algebraic Geometry · Mathematics 2007-05-23 Anton Malkin

The purpose of this paper is to present an interpretation for the decomposition of the tensor product of two or more irreducible representations of GL(N) in terms of a system of quantum particles. Our approach is based on a certain…

Quantum Algebra · Mathematics 2007-05-23 Oleg Gleizer , Alexander Postnikov

We determine the necessary and sufficient combinatorial conditions for which the tensor product of two irreducible polynomial representations of $GL(n,\mathbb{C})$ is isomorphic to another. As a consequence we discover families of…

Combinatorics · Mathematics 2019-08-15 Kevin Purbhoo , Stephanie van Willigenburg

The Littlewood-Richardson coefficients describe the decomposition of tensor products of irreducible representations of a simple Lie algebra into irreducibles. Assuming the number of factors is large, one gets a measure on the space of…

Representation Theory · Mathematics 2019-05-30 Evgeny Feigin

We describe, in terms of generators and relations, the reduction algebra, related to the diagonal embedding of the Lie algebra $\gl_n$ into $\gl_n\oplus\gl_n$. Its representation theory is related to the theory of decompositions of tensor…

Rings and Algebras · Mathematics 2011-07-13 S. Khoroshkin , O. Ogievetsky

We describe the tensor products of two irreducible linear complex representations of the finite general linear group G = GL(3,q) in terms of induced representations by linear characters of maximal torii and also in terms of Gelfand-Graev…

Representation Theory · Mathematics 2009-01-06 L. Aburto-Hageman , J. Pantoja , J. Soto-Andrade

We are interested in identities between Littlewood-Richardson coefficients, and hence in comparing different tensor product decompositions of the irreducible modules of the linear group GL n (C). A family of partitions-called…

Combinatorics · Mathematics 2021-07-09 Maxime Pelletier , Ressayre Nicolas

The Littlewood-Richardson coefficients $c^{\lambda}_{\mu\nu}$ give the multiplicity of an irreducible polynomial ${\rm GL}_n$-representation $F^{\lambda}_n$ in the tensor product of polynomial representations $F^{\mu}_n\otimes F^{\nu}_n$.…

Representation Theory · Mathematics 2020-12-15 Mark Colarusso , William Q. Erickson , Jeb F. Willenbring

From an irreducible representation of GL(n, C) there is a natural way to construct an irreducible representations of GL(n + 1, C) by adding a zero at the end of the highest weight of the irreducible representation of GL(n, C). The paper…

Representation Theory · Mathematics 2022-11-18 Dibyendu Biswas

We present a program that allows for the computation of tensor products of irreducible representations of Lie algebras A-G based on the explicit construction of weight states. This straightforward approach (which is slower and more…

Mathematical Physics · Physics 2011-04-21 C. Horst , J. Reuter

We decompose the tensor product of two irreducible representations of $\mathrm{GL}_2(\mathbb{F}_q)$ for odd $q$ and classify the pairs such that their tensor product is multiplicity free. We also classify the pairs such that their tensor…

Representation Theory · Mathematics 2023-10-25 Archita Gupta , M Hassain

We determine the graded decompositions of fusion products of finite-dimensional irreducible representations for simple Lie algebras of rank two. Moreover, we give generators and relations for these representations and obtain as a…

Representation Theory · Mathematics 2023-02-22 Leon Barth , Deniz Kus

We consider the example from invariant theory concerning the conjugation action of the general linear group on several copies of the $n \times n$ matrices, and examine a symmetric function which stably describes the Hilbert series for the…

Representation Theory · Mathematics 2013-04-24 Pamela E. Harris , Jeb F. Willenbring

Let $\mathcal{R}$ be the Grothendieck ring of complex smooth finite-length representations of the sequence of p-adic groups $\{GL_n(F)\}_{n=0}^\infty$, with multiplication defined through parabolic induction. We study the problem of the…

Representation Theory · Mathematics 2021-04-05 Maxim Gurevich

We study the quotient of $\mathcal{T}_n = Rep(GL(n|n))$ by the tensor ideal of negligible morphisms. If we consider the full subcategory $\mathcal{T}_n^+$ of $\mathcal{T}_n$ of indecomposable summands in iterated tensor products of…

Representation Theory · Mathematics 2023-05-16 Thorsten Heidersdorf , Rainer Weissauer

Littlewood Richardson coefficients are structure constants appearing in the representation theory of the general linear groups ($GL_n$). The main results of this paper are: 1. A strongly polynomial randomized approximation scheme for…

Combinatorics · Mathematics 2013-06-19 Hariharan Narayanan

Covariant tensor representations of gl(m|n) occur as irreducible components of tensor powers of the natural (m+n)-dimensional representation. We construct a basis of each covariant representation and give explicit formulas for the action of…

Representation Theory · Mathematics 2012-03-06 A. I. Molev

The paper presents a construction of finite-dimensional irreducible representations of the Lie algebra $\mathfrak{g}_2$. The representation space is constructed as the space of solutions to a certain system of partial differential equations…

Representation Theory · Mathematics 2025-10-14 Dmitry Artamonov

A graded poset structure is defined for the sets of Littlewood-Richardson (LR) tableaux that count the multiplicity of an irreducible GL(n)-module in the tensor product of irreducibles indexed by a sequence of rectangular partitions. This…

Quantum Algebra · Mathematics 2007-05-23 Mark Shimozono
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