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Displaying 241 – 260 of 284

The garden of quantum spheres

Ludwik Dąbrowski (2003)

Banach Center Publications

A list of known quantum spheres of dimension one, two and three is presented.

The geometric reductivity of the quantum group $S L_{q} (2)$

Michał Kępa, Andrzej Tyc (2011)

Colloquium Mathematicae

We introduce the concept of geometrically reductive quantum group which is a generalization of the Mumford definition of geometrically reductive algebraic group. We prove that if G is a geometrically reductive quantum group and acts rationally on a commutative and finitely generated algebra A, then the algebra of invariants $A^{G}$ is finitely generated. We also prove that in characteristic 0 a quantum group G is geometrically reductive if and only if every rational G-module is semisimple, and that in...

The Harish-Chandra homomorphism for a quantized classical hermitian symmetric pair

Welleda Baldoni, Pierluigi Möseneder Frajria (1999)

Annales de l'institut Fourier

Let $G / K$ a noncompact symmetric space with Iwasawa decomposition $K A N$ . The Harish-Chandra homomorphism is an explicit homomorphism between the algebra of invariant differential operators on $G / K$ and the algebra of polynomials on $A$ that are invariant under the Weyl group action of the pair $(G, A)$ . The main result of this paper is a generalization to the quantum setting of the Harish-Chandra homomorphism in the case of $G / K$ being an hermitian (classical) symmetric space

The Khovanov-Lauda 2-category and categorifications of a level two quantum ${𝔰𝔩}_{n}$ representation.

Hill, David, Sussan, Joshua (2010)

International Journal of Mathematics and Mathematical Sciences

The Kontsevich integral and quantized Lie superalgebras.

Geer, Nathan (2005)

Algebraic & Geometric Topology

The multisegment duality and the preprojective algebras of type $A$ .

Ringel, Claus Michael (1999)

AMA. Algebra Montpellier Announcements [electronic only]

The quantum double of a (locally) compact group.

Koornwinder, T.H., Muller, N.M. (1997)

Journal of Lie Theory

The quantum duality principle

Fabio Gavarini (2002)

Annales de l’institut Fourier

The “quantum duality principle” states that the quantization of a Lie bialgebra – via a quantum universal enveloping algebra (in short, QUEA) – also provides a quantization of the dual Lie bialgebra (through its associated formal Poisson group) – via a quantum formal series Hopf algebra (QFSHA) — and, conversely, a QFSHA associated to a Lie bialgebra (via its associated formal Poisson group) yields a QUEA for the dual Lie bialgebra as well; more in detail, there exist functors $𝒬 𝒰 ℰ 𝒜 ⟶ 𝒬 ℱ 𝒮 ℋ 𝒜$ and $𝒬 ℱ 𝒮 ℋ 𝒜 ⟶ 𝒬 𝒰 ℰ 𝒜$ , inverse to...