Lifting automorphisms of quotients of adjoint representations

Abstract

Let gi be a simple complex Lie algebra, 1≤ i ≤ d, and let G=G1×...× Gd be the corresponding adjoint group. Consider the G-module V= ri gi where ri≥ 1 for all i. We say that V is large if all ri≥ 2 and ri≥ 3 if Gi has rank 1. In [Schwarz12] we showed that when V is large any algebraic automorphism of the quotient Z:= V//G lifts to an algebraic mapping V V which sends the fiber over z to the fiber over (z), z∈ Z. (Most cases were already handled in [Kuttler11]). We also showed that one can choose a biholomorphic lift such that (gv)=σ(g)(v), g∈ G, v∈ V, where σ is an automorphism of G. This leaves open the following questions: Can one lift holomorphic automorphisms of Z? Which automorphisms lift if V is not large? We answer the first question in the affirmative and also answer the second question. Part of the proof involves establishing the following result for V large. Any algebraic differential operator of order k on Z lifts to a G-invariant algebraic differential operator of order k on V. We also consider the analogues of the questions above for actions of compact Lie groups.