Dual Algebraic Pairs and Polynomial Lie Algebras in Quantum Physics: Foundations and Geometric Aspects

Abstract

We discuss some aspects and examples of applications of dual algebraic pairs ( G1, G2) in quantum many-body physics. They arise in models whose Hamiltonians H have invariance groups Gi. Then one can take G1 = Gi whereas another dual partner G2= gD is generated by Gi invariants, possesses a Lie-algebraic structure and describes dynamic symmetry of models; herewith polynomial Lie algebras g = gD appear in models with essentially nonlinear Hamiltonians. Such an approach leads to a geometrization of model kinematics and dynamics.

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