Add to ORKGLet (g, g') be one of the non-symmetric simple polar pair of Lie algebras. Huang's classification [12] showed that there are only two such pairs of Lie algebras, namely (B3, g2) and (g2, A2). Branching laws for these Lie algebra pairs are derived, generalizing Wong's results in his thesis [30]
AbstractWe construct bases for the stable branching algebras for the symmetric pairs (GLn,On), (On+m...
10.1090/S0002-9947-04-03722-5Transactions of the American Mathematical Society35741601-162
summary:Let $U$ be an open subset of the complex plane, and let $L$ denote a finite-dimensional comp...
Let G be a connected and simply connected complex simple Lie group and H be a subgroup of G. Denote ...
We present a closed formula for the branching coefficients of an embedding [fraktur p] [hookrightar...
Let G be a compact connected Lie group and let H be a subgroup fixed by an involution. A classical r...
This thesis is devoted to branching rules for Lie algebras, that is the description of decomposition...
AbstractWe give uniform formulas for the branching rules of level 1 modules over orthogonal affine L...
ABSTRACT:We give uniform formulas for the branching rules of level 1 modules over orthogonal affine ...
In Winter [7], a certain class of Lie algebras, s~*mmrtric Lie a&bras, and a corresponding class...
We construct functors categorifying the branching rules for Uq() for of type Bn, Cn, and Dn for the...
AbstractThe paper investigates simple multilinear algebras, known as comtrans algebras, that are det...
AbstractWe propose a conjecture describing the branching rule, in terms of Littelmann's path model, ...
"A dipolarization in a Lie algebra $¥mathfrak{g}$ is a pair of polarizations $(¥mathfrak{g}^{+},f)$ ...
AbstractKaplansky introduced several classes of central simple Lie algebras in characteristic 2. We ...
AbstractWe construct bases for the stable branching algebras for the symmetric pairs (GLn,On), (On+m...
10.1090/S0002-9947-04-03722-5Transactions of the American Mathematical Society35741601-162
summary:Let $U$ be an open subset of the complex plane, and let $L$ denote a finite-dimensional comp...
Let G be a connected and simply connected complex simple Lie group and H be a subgroup of G. Denote ...
We present a closed formula for the branching coefficients of an embedding [fraktur p] [hookrightar...
Let G be a compact connected Lie group and let H be a subgroup fixed by an involution. A classical r...
This thesis is devoted to branching rules for Lie algebras, that is the description of decomposition...
AbstractWe give uniform formulas for the branching rules of level 1 modules over orthogonal affine L...
ABSTRACT:We give uniform formulas for the branching rules of level 1 modules over orthogonal affine ...
In Winter [7], a certain class of Lie algebras, s~*mmrtric Lie a&bras, and a corresponding class...
We construct functors categorifying the branching rules for Uq() for of type Bn, Cn, and Dn for the...
AbstractThe paper investigates simple multilinear algebras, known as comtrans algebras, that are det...
AbstractWe propose a conjecture describing the branching rule, in terms of Littelmann's path model, ...
"A dipolarization in a Lie algebra $¥mathfrak{g}$ is a pair of polarizations $(¥mathfrak{g}^{+},f)$ ...
AbstractKaplansky introduced several classes of central simple Lie algebras in characteristic 2. We ...
AbstractWe construct bases for the stable branching algebras for the symmetric pairs (GLn,On), (On+m...
10.1090/S0002-9947-04-03722-5Transactions of the American Mathematical Society35741601-162
summary:Let $U$ be an open subset of the complex plane, and let $L$ denote a finite-dimensional comp...