Prefer a chat interface with context about you and your work?
Zeroth Poisson homology of symmetric powers of isolated quasihomogeneous surface singularities
Let X โ โ3 be a surface with an isolated singularity at the origin, given by the equation Q(x, y, z) = 0, where Q is a weighted-homogeneous polynomial. In particular, this includes the Kleinian surfaces X = โ2/G for G < SL2(โ) finite. Let Y โ SnX be the โฆ