Expoentes de Lyapunov sobre homeomorfismos que preservam densidade de área

Abstract

In this work we present two of the tools that are used to determine the hyperbolic behavior of the diffeomorphisms and homeomorphisms that dense- areas preserve on Riemannian surfaces (smooth, compact and connected), which we will respectively we call Lyapunov “classic” exponent and new Lyapunov exponent. We will show some of the similarities and differences that they present: the invariance of the new Lyapunov exponent along the orbit of almost every point in M and the density of the set of differentiable applications with Lyapunov exponent zero in the set of preserving area homeomorphisms.