András Némedy Varga (BME MI) High dimensional generalization of standard pairs and the coupling technique.

Abstract: For uniformly hyperbolic dynamical systems with singularities one particular technique to prove exponential decay of correlations is the coupling of standard pairs. It was developed by Chernov and Dolgopyat for systems with two dimensional phase spaces. The key idea is the following. Consider any two standard pairs, which are just unstable curves with some measures on them that have sufficiently regular densities. Iterating them forward by the dynamics at certain times some parts of their images will be very close to each other, so that they will be connected by stable manifolds and hence the distance between them converges to zero exponentially fast. At these times - due to the previous reason - the measures they carry may be coupled along stable manifolds. If each time a fix amount of the measures can be coupled and the measure of those points, who are not coupled at time n is exponentially small in n, then the system enjoys exponential decay of correlations and also some other statistical properties (e.g. limit theorems) hold. In this talk I would like to present the (almost complete) high dimensional generalization of this method, enlightening the difficulties arising from the d > 2 setup.