Symmetries in CR complexity theory
Abstract
We introduce the Hermitian-invariant group of a proper rational map between the unit ball in complex Euclidean space and a generalized ball in a space of typically higher dimension. We use properties of the groups to define the crucial new concepts of essential map and the source rank of a map. We prove that every finite subgroup of the source automorphism group is the Hermitian-invariant group of some rational proper map between balls. We prove that is non-compact if and only if is a totally geodesic embedding. We show that contains an -torus if and only if is equivalent to a monomial map. We show that contains a maximal compact subgroup if and only if is equivalent to the juxtaposition of tensor powers. We also establish a monotonicity result; the group, after intersecting with the unitary group, does not decrease when a tensor product operation is applied to a polynomial proper map. We give a necessary condition for (when the target is a generalized ball) to contain automorphisms that move the origin.
Cite
@article{arxiv.1703.09320,
title = {Symmetries in CR complexity theory},
author = {John P. D'Angelo and Ming Xiao},
journal= {arXiv preprint arXiv:1703.09320},
year = {2017}
}
Comments
30 pages. To appear in Advances in Mathematics