We consider long-time behavior of dynamical systems perturbed by a small noise. Under certain conditions, a slow component of such a motion, which is most important for long-time evolution, can be described as a motion on the cone of invariant measures of the non-perturbed system. The case of a finite number of extreme points of the cone is considered in this paper. As is known, in the generic case, the long-time evolution can be described by a hierarchy of cycles defined by the action functional for corresponding stochastic processes. This, in particular, allows to study metastable distributions and such effects as stochastic resonance. If the system has some symmetry in the logarithmic asymptotics of transition probabilities (rough symmet...
We consider dynamical systems whose parameters are switched within a discrete set of values at equal...
We consider zero-noise limits of random perturbations of dynamical systems and examine, in terms of ...
Summary. We consider a random dynamical system describing the diusion of a small-noise Brownian part...
The focus of the proposal is the study of the long time behaviour in dynamical systems. This is a mo...
Using the formalism of the Ruelle response theory, we study how the invariant measure of an Axiom A ...
UnrestrictedA stochastic bifurcation is generally defined as either a change in the number of stable...
We consider a dynamical system in $\mathbb{R}$ driven by a vector field -U', where U is a multi-well...
We consider a dynamical system describing the diusive motion of a particle in a double well potentia...
We studied invariant measures and invariant densities for dynamical systems with random switching (s...
This thesis represents a small contribution to our understanding of metastable patterns in various s...
In this thesis we consider discrete-time dynamical systems in the interval perturbed with bounded no...
We consider slow-fast systems of differential equations, in which both the slow and fast variables a...
A non-linear dynamical system with periodic parameters is considered in presence of random noise. A ...
AbstractWe consider slow–fast systems of differential equations, in which both the slow and fast var...
For an attracting periodic orbit (limit cycle) of a deterministic dynamical system, one defines the ...
We consider dynamical systems whose parameters are switched within a discrete set of values at equal...
We consider zero-noise limits of random perturbations of dynamical systems and examine, in terms of ...
Summary. We consider a random dynamical system describing the diusion of a small-noise Brownian part...
The focus of the proposal is the study of the long time behaviour in dynamical systems. This is a mo...
Using the formalism of the Ruelle response theory, we study how the invariant measure of an Axiom A ...
UnrestrictedA stochastic bifurcation is generally defined as either a change in the number of stable...
We consider a dynamical system in $\mathbb{R}$ driven by a vector field -U', where U is a multi-well...
We consider a dynamical system describing the diusive motion of a particle in a double well potentia...
We studied invariant measures and invariant densities for dynamical systems with random switching (s...
This thesis represents a small contribution to our understanding of metastable patterns in various s...
In this thesis we consider discrete-time dynamical systems in the interval perturbed with bounded no...
We consider slow-fast systems of differential equations, in which both the slow and fast variables a...
A non-linear dynamical system with periodic parameters is considered in presence of random noise. A ...
AbstractWe consider slow–fast systems of differential equations, in which both the slow and fast var...
For an attracting periodic orbit (limit cycle) of a deterministic dynamical system, one defines the ...
We consider dynamical systems whose parameters are switched within a discrete set of values at equal...
We consider zero-noise limits of random perturbations of dynamical systems and examine, in terms of ...
Summary. We consider a random dynamical system describing the diusion of a small-noise Brownian part...