Integrable graded magnets
Copyright policy )Integrable graded magnets
Solutions to the Yang-Baxter equation are found which are invariant with respect to the general linear and orthosymplectic supergroups. Hamiltonians and higher integrals of motion (transfer matrix) of the corresponding graded spin systems are diagonalized for finite chains. A generalization of the Yang-Baxter equation is formulated for the \(\sigma\)-commutative G-graded Zamolodchikov algebra.
Invariance and symmetry properties for PDEs on manifolds, Applications of PDEs on manifolds, invariant, Quantum field theory; related classical field theories, linear and orthosymplectic supergroups, Yang-Baxter equation, integrals of motion, Zamolodchikov algebra
Invariance and symmetry properties for PDEs on manifolds, Applications of PDEs on manifolds, invariant, Quantum field theory; related classical field theories, linear and orthosymplectic supergroups, Yang-Baxter equation, integrals of motion, Zamolodchikov algebra
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