Word reading is a crystal morphism
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Publication:292184
DOI10.1007/s00031-016-9364-yzbMath1348.20052arXiv1407.4625OpenAlexW2963686028WikidataQ59469743 ScholiaQ59469743MaRDI QIDQ292184
Publication date: 10 June 2016
Published in: Transformation Groups (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1407.4625
Representation theory for linear algebraic groups (20G05) Representations of Lie and real algebraic groups: algebraic methods (Verma modules, etc.) (22E47)
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Cites Work
- A plactic algebra for semisimple Lie algebras
- On crystal bases of the \(q\)-analogue of universal enveloping algebras
- A Littlewood-Richardson rule for symmetrizable Kac-Moody algebras
- Crystal graphs for representations of the \(q\)-analogue of classical Lie algebras
- LS galleries, the path model, and MV cycles
- Crystals via the affine Grassmannian
- Kac-Moody groups, their flag varieties and representation theory
- Paths and root operators in representation theory
- Geometric Langlands duality and representations of algebraic groups over commutative rings
- Permutations, matrices, and generalized Young tableaux
- Knuth relations, tableaux and MV-cycles
- One-Skeleton Galleries, the Path Model, and a Generalization of Macdonald's Formula for Hall-Littlewood Polynomials
- Longest Increasing and Decreasing Subsequences
- On Mirković-Vilonen cycles and crystal combinatorics
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