
arXiv: 1301.6300
Let $\mathfrak g_i$ be a simple complex Lie algebra, $1\leq i \leq d$, and let $G=G_1\times...\times G_d$ be the corresponding adjoint group. Consider the $G$-module $V=\oplus r_i\mathfrak g_i$ where $r_i\geq 1$ for all $i$. We say that $V$ is \emph{large} if all $r_i\geq 2$ and $r_i\geq 3$ if $G_i$ has rank 1. In [Schwarz12] we showed that when $V$ is large any algebraic automorphism $ψ$ of the quotient $Z:= V//G$ lifts to an algebraic mapping $Ψ\colon V\to V$ which sends the fiber over $z$ to the fiber over $ψ(z)$, $z\in Z$. (Most cases were already handled in [Kuttler11]). We also showed that one can choose a biholomorphic lift $Ψ$ such that $Ψ(gv)=σ(g)Ψ(v)$, $g\in G$, $v\in V$, 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.
Changes made following referee's suggestions. To appear in Journal of Lie Theory
Representation theory for linear algebraic groups, Compact Lie groups of differentiable transformations, automorphisms, actions of compact Lie groups, Group Theory (math.GR), simple complex Lie algebras, quotients, Semisimple Lie groups and their representations, Lie algebras of linear algebraic groups, 20G20, 22E46, 57S15, differential operators, FOS: Mathematics, Linear algebraic groups over the reals, the complexes, the quaternions, adjoint representations, Representation Theory (math.RT), Mathematics - Group Theory, Mathematics - Representation Theory
Representation theory for linear algebraic groups, Compact Lie groups of differentiable transformations, automorphisms, actions of compact Lie groups, Group Theory (math.GR), simple complex Lie algebras, quotients, Semisimple Lie groups and their representations, Lie algebras of linear algebraic groups, 20G20, 22E46, 57S15, differential operators, FOS: Mathematics, Linear algebraic groups over the reals, the complexes, the quaternions, adjoint representations, Representation Theory (math.RT), Mathematics - Group Theory, Mathematics - Representation Theory
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