A Dixmier theorem for Poisson enveloping algebras

Abstract

We consider a skew-symmetric n-ary bracket on the polynomial algebra K[x1,…,xn,xn+1] (n≥ 2) over a field K of characteristic zero defined by \a1,…,an\=J(a1,…,an,C), where C is a fixed element of K[x1,…,xn,xn+1] and J is the Jacobian. If n=2 then this bracket is a Poisson bracket and if n≥ 3 then it is an n-Lie-Poisson bracket on K[x1,…,xn,xn+1]. We describe the center of the corresponding n-Lie-Poisson algebra and show that the quotient algebra K[x1,…,xn,xn+1]/(C-λ), where (C-λ) is the ideal generated by C-λ, 0≠ λ ∈ K, is a simple central n-Lie-Poisson algebra if C is a homogeneous polynomial that is not a proper power of any nonzero polynomial. This construction includes the quotients P(sl2(K))/(C-λ) of the Poisson enveloping algebra P(sl2(K)) of the simple Lie algebra sl2(K), where C is the standard Casimir element of sl2(K) in P(sl2(K)). It is also proven that the quotients P(M)/(C-λ) of the Poisson enveloping algebra P(M) of the exceptional simple seven dimensional Malcev algebra M are central simple.