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This article is cited in 3 scientific papers (total in 3 papers)
Yang–Baxter algebras, convolution algebras, and Grassmannians
V. G. Gorbunovabc, C. Korffd, C. Stroppele a Institute of Mathematics, University of Aberdeen, UK
b National Research University Higher School of Economics
c Moscow Institute of Physics and Technology (National Research University), Laboratory of Algebraic Geometry and Homological Algebra
d School of Mathematics and Statistics, Glasgow University, UK
e Hausdorff Center of Mathematics, University of Bonn, Germany
Abstract:
This paper surveys a new actively developing direction in contemporary mathematics which connects quantum integrable models with the Schubert calculus for quiver varieties: there is a purely geometric construction of solutions to the Yang–Baxter equation and their associated Yang–Baxter algebras which play a central role in quantum integrable systems and exactly solvable (integrable) lattice models in statistical physics. A simple but explicit example is given using the classical geometry of Grassmannians in order to explain some of the main ideas. The degenerate five-vertex limit of the asymmetric six-vertex model is considered, and its associated Yang–Baxter algebra is identified with a convolution algebra arising from the equivariant Schubert calculus of Grassmannians. It is also shown how our methods can be used to construct quotients of the universal enveloping algebra of the current algebra $\mathfrak{gl}_2[t]$ (so-called Schur-type algebras) acting on the tensor product of copies of its evaluation representation $\mathbb{C}^2[t]$. Finally, our construction is connected with the cohomological Hall algebra for the $A_1$-quiver.
Bibliography: 125 titles.
Keywords:
quantum integrable systems, quiver varieties, quantum cohomologies.
Received: 04.06.2020
Citation:
V. G. Gorbunov, C. Korff, C. Stroppel, “Yang–Baxter algebras, convolution algebras, and Grassmannians”, Russian Math. Surveys, 75:5 (2020), 791–842
Linking options:
https://www.mathnet.ru/eng/rm9959https://doi.org/10.1070/RM9959 https://www.mathnet.ru/eng/rm/v75/i5/p3
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