We prove quantitative statistical stability results for a large class of small C0 perturbations of circle diffeomorphisms with irrational rotation numbers. We show that if the rotation number is Diophantine the invariant measure varies in a Hölder way under perturbation of the map and the Hölder exponent depends on the Diophantine type of the rotation number. The set of admissible perturbations includes the ones coming from spatial discretization and hence numerical truncation. We also show linear response for smooth perturbations that preserve the rotation number, as well as for more general ones. This is done by means of classical tools from KAM theory, while the quantitative stability results are obtained by transfer operator techniques ...
In this paper we consider general orientation preserving circle homeomorphisms f ∈ C2+ε(S1∈{a(0), c(...
Abstract. We consider perturbations of integrable, area preserving nontwist maps of the annulus (tho...
In this paper we consider one parameter families of circle maps with nonlinear flat spot singulariti...
We prove quantitative statistical stability results for a large class of small C0 perturbations of c...
We prove quantitative statistical stability results for a large class of small C-0 perturbations of ...
We apply the dynamical method to obtain structural results concerning certain classes of one-dimensi...
Invariant circles play an important role as barriers to transport in the dynamics of area-preserving...
Rotators interacting with a pendulum via small, velocity independent, potentials are considered. If ...
Abstract. We introduce the almost sure rotation number ρas for some circle endomorphisms f. From erg...
We prove the renormalization conjecture for circle diffeomorphisms with breaks, i.e., that the renor...
. We discuss the use of the rotation number to detect periodic solutions in a parameterized family o...
The first result of the paper (Theorem 1.1) is an explicit construction of unimodal maps that are se...
Abstract. In this paper we consider the standard map, and we study the invariant curve obtained by a...
In this paper, we study rotation numbers of random dynamical systems on the circle. We prove the exi...
In this paper we present a numerical method to compute Diophantine rotation numbers of circle maps w...
In this paper we consider general orientation preserving circle homeomorphisms f ∈ C2+ε(S1∈{a(0), c(...
Abstract. We consider perturbations of integrable, area preserving nontwist maps of the annulus (tho...
In this paper we consider one parameter families of circle maps with nonlinear flat spot singulariti...
We prove quantitative statistical stability results for a large class of small C0 perturbations of c...
We prove quantitative statistical stability results for a large class of small C-0 perturbations of ...
We apply the dynamical method to obtain structural results concerning certain classes of one-dimensi...
Invariant circles play an important role as barriers to transport in the dynamics of area-preserving...
Rotators interacting with a pendulum via small, velocity independent, potentials are considered. If ...
Abstract. We introduce the almost sure rotation number ρas for some circle endomorphisms f. From erg...
We prove the renormalization conjecture for circle diffeomorphisms with breaks, i.e., that the renor...
. We discuss the use of the rotation number to detect periodic solutions in a parameterized family o...
The first result of the paper (Theorem 1.1) is an explicit construction of unimodal maps that are se...
Abstract. In this paper we consider the standard map, and we study the invariant curve obtained by a...
In this paper, we study rotation numbers of random dynamical systems on the circle. We prove the exi...
In this paper we present a numerical method to compute Diophantine rotation numbers of circle maps w...
In this paper we consider general orientation preserving circle homeomorphisms f ∈ C2+ε(S1∈{a(0), c(...
Abstract. We consider perturbations of integrable, area preserving nontwist maps of the annulus (tho...
In this paper we consider one parameter families of circle maps with nonlinear flat spot singulariti...