Finite-dimensional Z-graded Lie algebras
Abstract
We investigate the structure and representation theory of finite-dimensional Z-graded Lie algebras, including the corresponding root systems and Verma, irreducible, and Harish-Chandra modules. This extends the familiar theory for finite-dimensional semisimple Lie algebras to a much wider class of Lie algebras, and opens up for advances and applications in areas relying on ad-hoc approaches. Physically relevant examples are afforded by the Heisenberg and conformal Galilei algebras, including the Schr\"odinger algebras, whose Z-graded structures are yet to be fully exploited.
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