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Given a smooth affine symplectic variety $V$ with an action of a connected algebraic $G$. If $\mu$ is the moment map, the define the affine quotient to be :

$X = \mu^{-1}(0)// G = \text{Spec}\mathbb{C}[\mu^{-1}(0)]^{G}$

This is an algebraic Variety (may be singular).

The Hamiltonian reduction of $V$ is defined to be

$Y = \mu^{-1}(0)/ G$.

Q : When are these two notions same ?

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  • $\begingroup$ Do you really want $G$ to be compact and algebraic? It seems to me that if so, your action is necessarily trivial: an orbit will be a compact subvariety of $V$ which then must be a point. $\endgroup$
    – Jim Bryan
    Nov 23, 2011 at 1:17
  • $\begingroup$ non necessarily compact, but connected G. I've edited the question accordingly. $\endgroup$
    – J Verma
    Nov 23, 2011 at 2:40

1 Answer 1

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We can assume that $G$ is affine, since an abelian variety must act trivially on any affine variety. The closed points of $X$ are exactly the closed $G$-orbits on $\mu^{-1}(0)$. On an affine variety, closed orbits can be distinguished by invariant global functions, and if one orbit is in the closure of another they will go to the same point in $X$.

Thus, $X$ and $Y$ are the same if all $G$-orbits on $\mu^{-1}(0)$ are closed.

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