Explicit central elements of \(U_q(\mathfrak{gl}(N+1))\)
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Publication:6115282
DOI10.3842/SIGMA.2023.036arXiv1805.04884OpenAlexW4379207607MaRDI QIDQ6115282
Publication date: 12 July 2023
Published in: SIGMA. Symmetry, Integrability and Geometry: Methods and Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1805.04884
Quantum groups (quantized enveloping algebras) and related deformations (17B37) Ring-theoretic aspects of quantum groups (16T20) Hopf algebras and their applications (16T05)
Cites Work
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- Asymmetric stochastic transport models with \(\mathcal{U}_q(\mathfrak{su}(1,1))\) symmetry
- A generalized asymmetric exclusion process with \(U_q(\mathfrak {sl}_2)\) stochastic duality
- Stochastic \(R\) matrix for \(\operatorname{U}_q(A_n^{(1)})\)
- q-Weyl group and a multiplicative formula for universal R-matrices
- A \(q\)-analogue of \(U(\mathfrak{gl}(N+1))\), Hecke algebra, and the Yang-Baxter equation
- Quantum group invariants and link polynomials
- Universal \(R\)-matrix for quantized (super)algebras
- Polynomial relations in the centre of \({\mathcal U}_ q(\text{sl}(N))\)
- On the centers of quantum groups of \(A_n\)-type
- Root vectors in quantum groups
- Quantum conjugacy classes of simple matrix groups
- Stochastic duality of ASEP with two particle types via symmetry of quantum groups of rank two
- Generalized Gelfand invariants of quantum groups
- Canonical Bases Arising from Quantized Enveloping Algebras
- Generalized Gel’fand invariants and characteristic identities for quantum groups
- KILLING FORMS, HARISH-CHANDRA ISOMORPHISMS, AND UNIVERSAL R-MATRICES FOR QUANTUM ALGEBRAS
- A Multi-species ASEP $\boldsymbol{(q,\,j)}$ and $\boldsymbol{q}$-TAZRP with Stochastic Duality
- The quantum Casimir operators of {\rm {U}}_q{(\mathfrak {gl}_{n})} and their eigenvalues
- Explicit generators of the centre of the quantum group
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