summary:Using recent results on measure theory and algebraic geometry, we show how semidefinite programming can be used to construct invariant measures of one-dimensional discrete dynamical systems (iterated maps on a real interval). In particular we show that both discrete measures (corresponding to finite cycles) and continuous measures (corresponding to chaotic behavior) can be recovered using standard software
Abstract. In this paper we study a class of measures, called harmonic mea-sures, that one can associ...
AbstractIn this paper, we introduce a new concept called ‘a pair of coincident invariant measures’ a...
We review the method of computing invariants for discrete dynamical systems in a birational form (ma...
summary:Using recent results on measure theory and algebraic geometry, we show how semidefinite prog...
We study the computability of the set of invariant measures of a computable dynamical system. It is ...
We consider the question of computing invariant measures from an abstract point of view. Here, compu...
When f(x)=2 x (mod 1) is simulated in a finite discretized space, with random round-off error, the d...
Many examples exist of one-dimensional systems that are topologically conjugate to the shift operato...
Piecewise monotone mappings on an interval provide simple examples of discrete dynamical systems who...
AbstractWe introduce domain theory in dynamical systems, iterated function systems (fractals), and m...
In this paper, we introduce a new concept called 'a pair of coincident invariant measures' and estab...
Certain dynamical systems on the interval with neutrally stable repelling points admit invariant pro...
We propose a convex-optimization-based framework for computation of invariant measures of polynomial...
We prove the existence of absolutely continuous invariant measures for piecewise real-analytic expan...
28 pages, 14 figuresInternational audienceWe consider the problem of approximating numerically the m...
Abstract. In this paper we study a class of measures, called harmonic mea-sures, that one can associ...
AbstractIn this paper, we introduce a new concept called ‘a pair of coincident invariant measures’ a...
We review the method of computing invariants for discrete dynamical systems in a birational form (ma...
summary:Using recent results on measure theory and algebraic geometry, we show how semidefinite prog...
We study the computability of the set of invariant measures of a computable dynamical system. It is ...
We consider the question of computing invariant measures from an abstract point of view. Here, compu...
When f(x)=2 x (mod 1) is simulated in a finite discretized space, with random round-off error, the d...
Many examples exist of one-dimensional systems that are topologically conjugate to the shift operato...
Piecewise monotone mappings on an interval provide simple examples of discrete dynamical systems who...
AbstractWe introduce domain theory in dynamical systems, iterated function systems (fractals), and m...
In this paper, we introduce a new concept called 'a pair of coincident invariant measures' and estab...
Certain dynamical systems on the interval with neutrally stable repelling points admit invariant pro...
We propose a convex-optimization-based framework for computation of invariant measures of polynomial...
We prove the existence of absolutely continuous invariant measures for piecewise real-analytic expan...
28 pages, 14 figuresInternational audienceWe consider the problem of approximating numerically the m...
Abstract. In this paper we study a class of measures, called harmonic mea-sures, that one can associ...
AbstractIn this paper, we introduce a new concept called ‘a pair of coincident invariant measures’ a...
We review the method of computing invariants for discrete dynamical systems in a birational form (ma...