Add to ORKGWe consider cocycles with negative Lyapunov exponents defined over a hyperbolic dynamical system. It is well known that such systems possess invariant graphs and that under spectral assumptions these graphs have some degree of Hölder regularity. When the invariant graph has a slightly higher Hölder exponent than the a priori lower bound on an open set (even on just a set of positive measure for certain systems), we show that the graph must be Lipschitz or (in the Anosov case) as smooth as the cocycle.</p
. We give a new proof of the fact that the eigenvalues at correspondig periodic orbits form a comple...
We prove measurable Livšic theorems for dynamical systems modelled by Markov towers. Our reguarlit...
The aim of the talk is substantiation of a constructive method for verification of hyperbolicity and...
We consider cocycles with negative Lyapunov exponents defined over a hyperbolic dynamical system. It...
Abstract. We consider cocycles with negative Lyapunov exponents defined over a hyperbolic dynamical ...
Lyapunov exponents measure the asymptotic behavior of tangent vectors under iteration, positive expo...
Abstract. We give sharp regularity results for the invariant subbundles of hyperbolic dynamical syst...
Abstract. We consider SL(2,R)-valued cocycles over rotations of the circle and prove that they are l...
Abstract. We consider some very simple examples of SL(2, R)-cocycles and prove that they have positi...
Given an orbit whose linearization has invariant subspaces satisfying some non-resonance conditions ...
Abstract. We give a general necessary condition for the extremal (largest and smallest) Lyapunov exp...
Abstract. In the present paper we give a positive answer to a question posed by Viana in [22] on the...
In this talk I will discuss the prevalence of exponential behavior (non-zero Lyapunov exponents) for...
The proof of the invariant gibbs measure existence for hyperbolic mappings with singularities is the...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN021047 / BLDSC - British Library D...
. We give a new proof of the fact that the eigenvalues at correspondig periodic orbits form a comple...
We prove measurable Livšic theorems for dynamical systems modelled by Markov towers. Our reguarlit...
The aim of the talk is substantiation of a constructive method for verification of hyperbolicity and...
We consider cocycles with negative Lyapunov exponents defined over a hyperbolic dynamical system. It...
Abstract. We consider cocycles with negative Lyapunov exponents defined over a hyperbolic dynamical ...
Lyapunov exponents measure the asymptotic behavior of tangent vectors under iteration, positive expo...
Abstract. We give sharp regularity results for the invariant subbundles of hyperbolic dynamical syst...
Abstract. We consider SL(2,R)-valued cocycles over rotations of the circle and prove that they are l...
Abstract. We consider some very simple examples of SL(2, R)-cocycles and prove that they have positi...
Given an orbit whose linearization has invariant subspaces satisfying some non-resonance conditions ...
Abstract. We give a general necessary condition for the extremal (largest and smallest) Lyapunov exp...
Abstract. In the present paper we give a positive answer to a question posed by Viana in [22] on the...
In this talk I will discuss the prevalence of exponential behavior (non-zero Lyapunov exponents) for...
The proof of the invariant gibbs measure existence for hyperbolic mappings with singularities is the...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN021047 / BLDSC - British Library D...
. We give a new proof of the fact that the eigenvalues at correspondig periodic orbits form a comple...
We prove measurable Livšic theorems for dynamical systems modelled by Markov towers. Our reguarlit...
The aim of the talk is substantiation of a constructive method for verification of hyperbolicity and...