Inflations for representations of shifted quantum affine algebras
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Publication:6668408
DOI10.1016/j.aim.2024.110093MaRDI QIDQ6668408
Publication date: 22 January 2025
Published in: Advances in Mathematics (Search for Journal in Brave)
Equilibrium statistical mechanics (82Bxx) Groups and algebras in quantum theory (81Rxx) Lie algebras and Lie superalgebras (17Bxx)
Cites Work
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- Cluster algebras and category \(\mathcal O\) for representations of Borel subalgebras of quantum affine algebras
- Bethe ansatz and the spectral theory of affine Lie algebra-valued connections. II: The non simply-laced case
- Baxter's relations and spectra of quantum integrable models
- Quantum loop algebras and \(\ell\)-root operators
- Cluster algebras and quantum affine algebras
- Quantum affine algebras
- Spectra of quantum KdV Hamiltonians, Langlands duality, and affine opers
- Comultiplication for shifted Yangians and quantum open Toda lattice
- Categories over quantum affine algebras and monoidal categorification
- Finite type modules and Bethe ansatz equations
- On minimal affinizations of representations of quantum groups
- Representations of quantum affinizations and fusion product
- Quiver varieties and \(t\)-analogs of \(q\)-characters of quantum affine algebras
- Discrete Miura opers and solutions of the Bethe ansatz equations
- Bethe ansatz and the spectral theory of affine Lie algebra-valued connections. I: The simply-laced case
- Coulomb branches of \(3d\) \(\mathcal{N}=4\) quiver gauge theories and slices in the affine Grassmannian
- Cluster algebras I: Foundations
- Cluster algebras and derived categories
- Asymptotic representations and Drinfeld rational fractions
- Multiplicative Slices, Relativistic Toda and Shifted Quantum Affine Algebras
- Kirillov-Reshetikhin Conjecture: The General Case
- The Kirillov-Reshetikhin conjecture and solutions of T-systems
- Cluster algebras IV: Coefficients
- Quiver varieties and finite dimensional representations of quantum affine algebras
- Reducedness of affine Grassmannian slices in type A
- Quantum Grothendieck rings as quantum cluster algebras
- Stable maps, Q-operators and category 𝒪
- DOUBLE AFFINE GRASSMANNIANS AND COULOMB BRANCHES OF 3d n = 4 QUIVER GAUGE THEORIES
- Introduction to a provisional mathematical definition of Coulomb branches of 3-dimensional 𝒩=4 gauge theories
- On category O for affine Grassmannian slices and categorified tensor products
- Quantum groups and quantum cohomology
- Drinfeld coproduct, quantum fusion tensor category and applications
- Geometric Realization of Dynkin Quiver Type Quantum Affine Schur–Weyl Duality
- Combinatorics of \(q\)-characters of finite-dimensional representations of quantum affine algebras.
- Representations of Shifted Quantum Affine Algebras
- A functor for constructing R$R$‐matrices in the category O$\mathcal {O}$ of Borel quantum loop algebras
- Representations of shifted quantum affine algebras and cluster algebras. I: The simply laced case
- Shifted Yangians and polynomial \(R\)-matrices
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