We study dimension theory for dissipative dynamical systems, proving a conditional variational principle for the quotients of Birkhoff averages restricted to the recurrent part of the system. On the other hand, we show that when the whole system is considered (and not just its recurrent part) the conditional variational principle does not necessarily hold. Moreover, we exhibit an example of a topologically transitive map having discontinuous Lyapunov spectrum. The mechanism producing all these pathological features on the multifractal spectra is transience, that is, the non-recurrent part of the dynamics
Abstract. In this note we study the multifractal spectrum of Lyapunov ex-ponents for interval maps w...
For nonconformal repellers satisfying a certain cone condition, we establish a version of multifract...
In the present paper we study the multifractal spectrum of local entropies. We obtain results, simil...
We study dimension theory for dissipative dynamical systems, proving a conditional variational princ...
We establish a "conditional" variational principle, which unifies and extends many result...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
AbstractFor the class of almost additive sequences, we establish a conditional variational principle...
We establish a higher-dimensional version of multifractal analysis for several classes of hyperbolic...
AbstractWe establish a higher-dimensional version of multifractal analysis for several classes of hy...
The theory of dynamical systems has undergone a dramatical revolution in the 20th century. The beaut...
It is shown that the multifractal property is shared by both Lyapunov exponents and dual Lyapunov ex...
Abstract. This paper is devoted to study multifractal analysis of quotients of Birkhoff averages for...
n∑ k=1 ϕ(xk, xkq, · · · , xkq`−1), (xn) ∈ Σm on the symbolic space Σm = {0, 1, · · ·,m − 1}N ...
In the theory of quantum chaos one studies the semiclassical behaviour of quantum mechanical systems...
Abstract. In this note we study the multifractal spectrum of Lyapunov ex-ponents for interval maps w...
For nonconformal repellers satisfying a certain cone condition, we establish a version of multifract...
In the present paper we study the multifractal spectrum of local entropies. We obtain results, simil...
We study dimension theory for dissipative dynamical systems, proving a conditional variational princ...
We establish a "conditional" variational principle, which unifies and extends many result...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
AbstractFor the class of almost additive sequences, we establish a conditional variational principle...
We establish a higher-dimensional version of multifractal analysis for several classes of hyperbolic...
AbstractWe establish a higher-dimensional version of multifractal analysis for several classes of hy...
The theory of dynamical systems has undergone a dramatical revolution in the 20th century. The beaut...
It is shown that the multifractal property is shared by both Lyapunov exponents and dual Lyapunov ex...
Abstract. This paper is devoted to study multifractal analysis of quotients of Birkhoff averages for...
n∑ k=1 ϕ(xk, xkq, · · · , xkq`−1), (xn) ∈ Σm on the symbolic space Σm = {0, 1, · · ·,m − 1}N ...
In the theory of quantum chaos one studies the semiclassical behaviour of quantum mechanical systems...
Abstract. In this note we study the multifractal spectrum of Lyapunov ex-ponents for interval maps w...
For nonconformal repellers satisfying a certain cone condition, we establish a version of multifract...
In the present paper we study the multifractal spectrum of local entropies. We obtain results, simil...