Polynomial Lie Algebras and Associated Pseudogroup Structures in Composite Quantum Models

Abstract

Polynomial Lie (super)algebras gpd are introduced via Gi-invariant polynomial Jordan maps in quantum composite models with Hamiltonians H having invariance groups Gi. Algebras gpd have polynomial structure functions in commutation relations, are related to pseudogroup structures V, V∈ gpd and describe dynamic symmetry of models under study. Physical applications of algebras gpd in quantum optics and in composite field theories are briefly discussed.

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