21 citations to https://www.mathnet.ru/rus/znsl3369
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H.J. De Vega, E. Lopes, “Exact solution of the lattice models”, Nuclear Physics B, 362:1-2 (1991), 261
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H. J. De Vega, NATO ASI Series, 238, Physics, Geometry and Topology, 1990, 387
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H. J. De Vega, Lecture Notes in Physics, 370, Quantum Groups, 1990, 129
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H. J. Vega, Quantum Mechanics of Fundamental Systems 2, 1989, 43
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H.J. de Vega, Integrable Sys Quantum Field Theory, 1989, 567
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В. О. Тарасов, “Алгебраический анзац Бете для $R$-матрицы Изергина–Корепина”, ТМФ, 76:2 (1988), 184–198 ; V. O. Tarasov, “Algebraic bethe ansatz for the Izergin–Korepin $R$ matrix”, Theoret. and Math. Phys., 76:2 (1988), 793–803
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H. J. Vega, Differential Geometrical Methods in Theoretical Physics, 1988, 187
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Craig A. Tracy, “The emerging role of number theory in exactly solvable models in lattice statistical mechanics”, Physica D: Nonlinear Phenomena, 25:1-3 (1987), 1
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В. Г. Дринфельд, “Квантовые группы”, Зап. научн. сем. ПОМИ, 155 (1986), 18–49 ; V. G. Drinfeld, “Quantum groups”, J. Soviet Math., 41:2 (1988), 898–915
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Н. Ю. Решетихин, “Интегрируемые модели квантовых одномерных магнетиков с $O(n)$- и $Sp(2k)$-симметрией”, ТМФ, 63:3 (1985), 347–366 ; N. Yu. Reshetikhin, “Integrable models of quantum one-dimensional magnets with $O(n)$ and $Sp(2k)$ symmetry”, Theoret. and Math. Phys., 63:3 (1985), 555–569