Some remarks on periodic gradings
Abstract
Let q be a finite-dimensional Lie algebra, ∈ Aut( q) a finite order automorphism, and q0 the subalgebra of fixed points of . Using one can construct a pencil P of compatible Poisson brackets on S( q), and thereby a `large' Poisson-commutative subalgebra Z( q,) consisting of q0-invariants in S( q). We study one particular bracket \\,\,,\,\∞∈ P and the related Poisson centre Z∞. It is shown that Z∞ is a polynomial ring, if q is reductive.
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