Given a closed (possibly singular) projective variety $V$ with a symplectic structure and a torus action, there is a moment map $\mu: V \rightarrow Lie(T)^*$. Note that the dimension of $T$ could be much smaller than the dimension of $V$.
How much can we say about the fibers of this moment map $\mu$? Any references?
I am most interested in the case where the variety $V$ is an MV cycle in an affine Grassmannian for an algebraic group $G$. The maximal torus $T \subset G$ acts on the affine Grassmannian. A $T-$equivariant moment map $\mu$ would send an MV cycle to the corresponding MV polytope. What are the fibers of $\mu$ in this case?
