Quotients, automorphisms and differential operators
Abstract
Let be a -module where is a complex reductive group. Let denote the categorical quotient and let be the morphism dual to the inclusion . Let be an algebraic automorphism. Then one can ask if there is an algebraic map which lifts , i.e., for all . In \cite{Kuttler} the case is treated where is a multiple of the adjoint representation of . It is shown that, for sufficiently large (often will do), any has a lift. We consider the case of general representations (satisfying some mild assumptions). It turns out that it is natural to consider holomorphic lifting of holomorphic automorphisms of , and we show that if a holomorphic and its inverse lift holomorphically, then has a lift which is an automorphism such that , , where is an automorphism of . We reduce the lifting problem to the group of automorphisms of which preserve the natural grading of . Lifting does not always hold, but we show that it always does for representations of tori in which case algebraic automorphisms lift to algebraic automorphisms. We extend Kuttler's methods to show lifting in case contains a copy of .
Cite
@article{arxiv.1201.6369,
title = {Quotients, automorphisms and differential operators},
author = {Gerald W. Schwarz},
journal= {arXiv preprint arXiv:1201.6369},
year = {2014}
}
Comments
23 pages, minor revisions. To appear in J. London Math. Society