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Littlewood-Richardson (LR) coefficients and Kostka Numbers appear in representation theory and combinatorics related to $GL_n$. It is known that Kostka numbers can be represented as special Littlewood-Rischardson coefficient. In this paper,…

Combinatorics · Mathematics 2023-01-24 Sagar Shrivastava

We present a polynomiality property of the Littlewood-Richardson coefficients c_{\lambda\mu}^{\nu}. The coefficients are shown to be given by polynomials in \lambda, \mu and \nu on the cones of the chamber complex of a vector partition…

Combinatorics · Mathematics 2007-05-23 Etienne Rassart

We argue that Jack Littlewood-Richardson coefficients $g_{\mu\nu}^{\lambda}(\alpha)$ are specialisations of certain novel polynomials. For the triple of partitions $(\mu,\nu,\lambda)=(21,21,321)$, we prove the corresponding polynomial is…

Combinatorics · Mathematics 2026-05-12 Ryan Mickler

For any Coxeter group W, we define a filtration of H^*(W;ZW) by W-submodules and then compute the associated graded terms. More generally, if U is a CW complex on which W acts as a reflection group we compute the associated graded terms for…

Group Theory · Mathematics 2009-04-23 Michael W Davis , Jan Dymara , Tadeusz Januszkiewicz , Boris Okun

Let $G$ be a connected complex semisimple Lie group, $\Gamma$ be a cocompact, irreducible and torsionless lattice in $G$ and $K$ be a maximal compact subgroup of $G$. Assume $\Gamma$ acts by left multiplication and $K$ acts by right…

Complex Variables · Mathematics 2023-09-13 Pritthijit Biswas

We study, in a global uniform manner, the quotient of the ring of polynomials in l sets of n variables, by the ideal generated by diagonal quasi-invariant polynomials for general permutation groups W=G(r,n). We show that, for each such…

Combinatorics · Mathematics 2011-10-17 Jean-Christophe Aval , François Bergeron

Let V be a symplectic vector space of dimension 2n. Given a partition \lambda with at most n parts, there is an associated irreducible representation S_{[\lambda]}(V) of Sp(V). This representation admits a resolution by a natural complex…

Representation Theory · Mathematics 2013-07-26 Steven V Sam , Andrew Snowden , Jerzy Weyman

We consider compact homogeneous spaces G/H, where G is a compact connected Lie group and H is its closed connected subgroup of maximal rank. The aim of this paper is to provide an effective computation of the universal toric genus for the…

Algebraic Topology · Mathematics 2008-01-22 Victor M. Buchstaber , Svjetlana Terzic

We solve the long standing problem of classification of standard compact Clifford-Klein forms of homogeneous spaces of simple non-compact real Lie groups under the extra assumption that $G$, $H$, $L$ are simple and absolutely simple. Then…

Differential Geometry · Mathematics 2025-02-24 Maciej Bochenski , Aleksy Tralle

We give a classification of irreducible four-dimensional symmetric spaces $G/H$ which admit compact Clifford-Klein forms, where $G$ is the transvection group of $G/H$. For this, we develop a method that applies to particular 1-connected…

Differential Geometry · Mathematics 2022-03-22 Keiichi Maeta

The Kronecker coefficients and the Littlewood-Richardson coefficients are nonnegative integers depending on three partitions. By definition, these coefficients are the multiplicities of the tensor product decomposition of two irreducible…

Algebraic Geometry · Mathematics 2019-07-19 Nicolas Ressayre

We show that if $H \leq G$ is a closed amenable and cocompact subgroup of a unimodular locally compact group, then the reduced group C*-algebra of $G$ is not simple. Equivalently, there are unitary representations of $G$ that are weakly…

Group Theory · Mathematics 2016-01-25 Sven Raum

Real forms of a complex reductive group are classified by Galois cohomology H^1(Gamma,G_ad) where G_ad is the adjoint group. Cartan's classification of real forms in terms of maximal compact subgroups can be stated in terms of H^(Z/2Z,G_ad)…

Group Theory · Mathematics 2018-05-23 Jeffrey Adams , Olivier Taïbi

Let $G$ be the group scheme $\operatorname{SL}_{d+1}$ over $\mathbb{Z}$ and let $Q$ be the parabolic subgroup scheme corresponding to the simple roots $\alpha_{2},\cdots,\alpha_{d-1}$. Then $G/Q$ is the $\mathbb{Z} $-scheme of partial flags…

Representation Theory · Mathematics 2020-10-12 Linyuan Liu

Making the first steps towards a classification of simple partial comodules, we give a general construction for partial comodules of a Hopf algebra \(H\) using central idempotents in right coideal subalgebras and show that any…

Rings and Algebras · Mathematics 2023-10-20 Eliezer Batista , William Hautekiet , Paolo Saracco , Joost Vercruysse

Given a skew diagram $\gamma/\lambda$, we determine a set of lower and upper bounds that a partition $\mu$ must satisfy for Littlewood-Richards coefficients $c^{\gamma}_{\lambda,\mu}>0$. Our algorithm depends on the characterization of…

Combinatorics · Mathematics 2023-04-07 Müge Taşkın , R. Bedii Gümüş , Sinan Işık , M. ikbal Ulvi

We give a positive answer to the Berry-Robbins problem for any compact Lie group G, i.e. we show the existence of a smooth W-equivariant map from the space of regular triples in a Cartan subalgebra to the flag manifold G/T. This map is…

Representation Theory · Mathematics 2007-05-23 Michael Atiyah , Roger Bielawski

We first describe a system of inequalities (Horn's inequalities) that characterize eigenvalues of sums of Hermitian matrices. When we apply this system for integral Hermitian matrices, one can directly test it by using Littlewood-Richardson…

Combinatorics · Mathematics 2024-03-11 Mahdi Ebrahimi

We give a closed formula of the Littlewood-Richardson coefficients.

Algebraic Geometry · Mathematics 2021-12-06 Xueqing Wen

We establish the compactly generated shape (H-shape) index theory for local semiflows on complete metric spaces via more general shape index pairs, and define the H-shape cohomology index to develop the Morse equations. The main advantages…

Dynamical Systems · Mathematics 2019-07-30 Jintao Wang , Jinqiao Duan , Desheng Li