Lyapunov Spectrum of volume preserving partially hyperbolic maps
Mauricio Poletti (UFC, Brasil)
Given an invariant measure and a di�eomorphism, the Lyapunov spectrum is said to be simple if for almost every point there is the maximal quantity of di�erent exponents possible, (or equivalently the Oseledets decomposition is given by one dimensional spaces). K. Marin proved that conservative partially hyperbolic di�eomorphisms with two dimensional center (with some technical conditions) generically have two di�erent center exponents. In this work we study the simplicity of the full Lyapunov spectrum of these maps. This is a joint work with K. Marin and D. Obata.
