Abstract
Let (M,F) be a compact codimension-one foliated manifold whose leaves are equipped with Riemannian metrics, and consider continuous functions on M that are harmonic along the leaves of F. If every such function is constant on leaves we say that (M,F) has the Liouville property. Our main result is that codimension-one foliated bundles over compact negatively curved manifolds satisfy the Liouville property. Related results for R-covered foliations, as well as for discrete group actions and discrete harmonic functions, are also established.
Original language | American English |
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Journal | Ergodic Theory and Dynamical Systems |
Volume | 29 |
State | Published - Jul 2009 |
Keywords
- Foliations
- Harmonic functions
- Brownian motion on manifolds
Disciplines
- Mathematics