Symplectic Induction, Prequantum Induction, and Prequantum Multiplicities
Symplectic Geometry
2022-05-06 v2 Representation Theory
Abstract
Frobenius reciprocity asserts that induction from a subgroup and restriction to it are adjoint functors in categories of unitary G-modules. In the 1980s, Guillemin and Sternberg established a parallel property of Hamiltonian G-spaces, which (as we show) unfortunately fails to mirror the situation where more than one G-module "quantizes" a given Hamiltonian G-space. This paper offers evidence that the situation is remedied by working in the category of *prequantum* G-spaces, where this ambiguity disappears; there, we define induction and multiplicity spaces, and establish Frobenius reciprocity as well as the "induction in stages" property.
Keywords
Cite
@article{arxiv.2007.09434,
title = {Symplectic Induction, Prequantum Induction, and Prequantum Multiplicities},
author = {Tudor S. Ratiu and Francois Ziegler},
journal= {arXiv preprint arXiv:2007.09434},
year = {2022}
}
Comments
10 pages. Accepted version, to appear in Communications in Contemporary Mathematics