Abstract
Abstract
For
$k \geq 2$
, we prove that in a
$C^{1}$
-open and
$C^{k}$
-dense set of some classes of
$C^{k}$
-Anosov flows, all Lyapunov exponents have multiplicity one with respect to appropriate measures. The classes are geodesic flows with equilibrium states of Holder-continuous potentials, volume-preserving flows, and all fiber-bunched Anosov flows with equilibrium states of Holder-continuous potentials.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,General Mathematics