Birational geometry for the covering of a nilpotent orbit closure II

Abstract

Let O be a nilpotent orbit of a complex semisimple Lie algebra g and let π: X O be the finite covering associated with the universal covering of O. In the previous article we have explicitly constructed a Q-factorial terminalization X of X when g is classical. In the present article, we count how many different Q-factorial terminalizations X has. We construct the universal Poisson deformation of X over H2(X, C) and look at the action of the Weyl group W(X) on H2(X, C). The main result is an explicit geometric description of W(X).