The symplectic leaves for the elliptic Poisson bracket on projective space defined by Feigin-Odesskii and Polishchuk
Abstract
This paper determines the symplectic leaves for a remarkable Poisson structure on CPn-1 discovered by Feigin and Odesskii, and, independently, by Polishchuk. The Poisson bracket is determined by a holomorphic line bundle of degree n 3 on a compact Riemann surface of genus one or, equivalently, by an elliptic normal curve E⊂eqCPn-1. The symplectic leaves are described in terms of higher secant varieties to E.
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