Cartan Geometries and Dynamics

R. Feres; P. Lampe

doi:10.1023/A:1005219805069

Cartan Geometries and Dynamics

R. Feres
, P. Lampe

Department of Mathematics

Research output: Contribution to journal › Article › peer-review

Abstract

We show how some basic dynamical ideas can be brought to bear on the study of Cartan geometries. In our main results, we give conditions for certain types of Cartan geometries to have constant curvature. We also consider ergodic actions of 'higher-rank' semisimple groups on bundles supporting (not necessarily invariant) Cartan connections and show that these are 'standard locally homogeneous' actions provided that some noncompact 1-parameter subgroup 'preserves' a Cartan geometry.

Original language	English
Pages (from-to)	29-41
Number of pages	13
Journal	Geometriae Dedicata
Volume	80
Issue number	1-3
DOIs	https://doi.org/10.1023/A:1005219805069
State	Published - 2000

Keywords

Cartan geometries
Cocycle superrigidity
Lie group actions

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AB - We show how some basic dynamical ideas can be brought to bear on the study of Cartan geometries. In our main results, we give conditions for certain types of Cartan geometries to have constant curvature. We also consider ergodic actions of 'higher-rank' semisimple groups on bundles supporting (not necessarily invariant) Cartan connections and show that these are 'standard locally homogeneous' actions provided that some noncompact 1-parameter subgroup 'preserves' a Cartan geometry.

KW - Cartan geometries

KW - Cocycle superrigidity

KW - Lie group actions

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Cartan Geometries and Dynamics

Abstract

Keywords

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