Conformal measure rigidity for representations via self-joinings
Abstract
Let be a Zariski dense discrete subgroup of a connected simple real algebraic group . We discuss a rigidity problem for discrete faithful representations and a surprising role played by higher rank conformal measures of the associated self-joining group. Our approach recovers rigidity theorems of Sullivan, Tukia and Yue, as well as applies to Anosov representations, including Hitchin representations. More precisely, for a given representation with a boundary map defined on the limit set , we ask whether the extendability of to can be detected by the property that pushes forward some -conformal measure class to a -conformal measure class . When is of divergence type in a rank one group or when arises from an Anosov representation, we give an affirmative answer by showing that if the self-joining is Zariski dense in , then the push-forward measures and , which are higher rank -conformal measures, cannot be in the same measure class.
Keywords
Cite
@article{arxiv.2302.03539,
title = {Conformal measure rigidity for representations via self-joinings},
author = {Dongryul M. Kim and Hee Oh},
journal= {arXiv preprint arXiv:2302.03539},
year = {2024}
}
Comments
36 pages, 1 figure, To appear in Advances in Math