Topological Equivalence of Flows on Homogeneous Spaces, and Divergence of One-Parameter Subgroups of Lie Groups
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Publication:3797923
DOI10.2307/2000809zbMath0652.58036OpenAlexW4237559788MaRDI QIDQ3797923
Publication date: 1988
Full work available at URL: https://doi.org/10.2307/2000809
Dynamics induced by flows and semiflows (37C10) Discrete subgroups of Lie groups (22E40) General properties and structure of real Lie groups (22E15)
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Cites Work
- On invariant measures, minimal sets and a lemma of Margulis
- The geometry of cross sections to flows
- Analytic density in Lie groups
- The length spectra as moduli for compact Riemann surfaces
- Rigidity of horocycle flows
- Strong rigidity of Q-rank 1 lattices
- Flows on some three dimensional homogeneous spaces
- Topological Conjugacy of Horocycle Flows
- Ergodic theory in hyperbolic space
- Flows on Homogeneous Spaces: A New Look
- Ergodicity of Flows on Homogeneous Spaces
- Conjugacy properties of affine transformations of nilmanifolds
- Metric Classification of Ergodic Nilflows and Unipotent Affines
- Strong Rigidity of Locally Symmetric Spaces. (AM-78)
- Rigidity of some translations on homogeneous spaces
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