We define a Toledo number for actions of surface groups and complex hyperbolic lattices on infinite dimensional Hermitian symmetric spaces, which allows us to define maximal representations. When the target is not of tube type we show that there cannot be Zariski-dense maximal representations, and whenever the existence of a boundary map can be guaranteed, the representation preserves a finite dimensional totally geodesic subspace on which the action is maximal. In the opposite direction we construct examples of geometrically dense maximal representation in the infinite dimensional Hermitian symmetric space of tube type and finite rank. Our approach is based on the study of boundary maps, that we are able to construct in low ranks or under some suitable Zariski-density assumption, circumventing the lack of local compactness in the infinite dimensional setting.
SEEK ID: https://publications.h-its.org/publications/975
Research Groups: Groups and Geometry
Publication type: Journal
Journal: arXiV preprints
Citation: arXiv:1810.10208 [math.GR]
Date Published: 2018
URL: https://arxiv.org/abs/1810.10208
Registered Mode: imported from a bibtex file
Views: 5730
Created: 30th Jan 2020 at 09:55
Last updated: 5th Mar 2024 at 21:24
This item has not yet been tagged.
None