19 pages, 2 figuresInternational audienceWe study an intermittent map which has exactly two ergodic invariant densities. The densities are supported on two subintervals with a common boundary point. Due to certain perturbations, leakage of mass through subsets, called holes, of the initially invariant subintervals occurs and forces the subsystems to merge into one system that has exactly one invariant density. We prove that the invariant density of the perturbed system converges in the $L^1$-norm to a particular convex combination of the invariant densities of the intermittent map. In particular, we show that the ratio of the weights in the combination equals to the limit of the ratio of the measures of the holes
We provide escape rates formulae for piecewise expanding interval maps with 'random holes'. Then we ...
For an area preserving map, each chaotic orbit appears numerically to densely cover a region (an irr...
Abstract. We use an Ulam-type discretization scheme to provide pointwise approximations for invarian...
Abstract. We study an intermittent map which has exactly two ergodic in-variant densities. The densi...
We study an intermittent map which has exactly two ergodic invariant densities. The densities are su...
Abstract We study intermittent maps from the point of view of metastability. Small neighbourhoods of...
Metastable dynamical systems were recently studied [González-Tokman et al., 2011] in the framework o...
Abstract. We provide escape rates formulae for piecewise expanding interval maps with ‘random holes’...
If a system mixes too slowly, putting a hole in it can completely destroy the richness of the dynami...
We present extensive numerical investigations on the ergodic properties of two identical Pomeau-Mann...
Abstract. We provide escape rates formulae for piecewise expanding interval maps with ‘random holes’...
International audienceWe study random perturbations of multidimensional piecewise expanding maps. We...
We study the escape dynamics in the presence of a hole of a standard family of intermittent maps of ...
We study two classes of dynamical systems with holes: expanding maps of the interval and Collet-Eckm...
textThis dissertation investigates the evolution of probability densities under the Frobenius-Perro...
We provide escape rates formulae for piecewise expanding interval maps with 'random holes'. Then we ...
For an area preserving map, each chaotic orbit appears numerically to densely cover a region (an irr...
Abstract. We use an Ulam-type discretization scheme to provide pointwise approximations for invarian...
Abstract. We study an intermittent map which has exactly two ergodic in-variant densities. The densi...
We study an intermittent map which has exactly two ergodic invariant densities. The densities are su...
Abstract We study intermittent maps from the point of view of metastability. Small neighbourhoods of...
Metastable dynamical systems were recently studied [González-Tokman et al., 2011] in the framework o...
Abstract. We provide escape rates formulae for piecewise expanding interval maps with ‘random holes’...
If a system mixes too slowly, putting a hole in it can completely destroy the richness of the dynami...
We present extensive numerical investigations on the ergodic properties of two identical Pomeau-Mann...
Abstract. We provide escape rates formulae for piecewise expanding interval maps with ‘random holes’...
International audienceWe study random perturbations of multidimensional piecewise expanding maps. We...
We study the escape dynamics in the presence of a hole of a standard family of intermittent maps of ...
We study two classes of dynamical systems with holes: expanding maps of the interval and Collet-Eckm...
textThis dissertation investigates the evolution of probability densities under the Frobenius-Perro...
We provide escape rates formulae for piecewise expanding interval maps with 'random holes'. Then we ...
For an area preserving map, each chaotic orbit appears numerically to densely cover a region (an irr...
Abstract. We use an Ulam-type discretization scheme to provide pointwise approximations for invarian...