We study the thermodynamic formalism for suspension flows over countableMarkov shifts with roof functions not necessarily bounded away from zero. We establish conditions to ensure the existence and uniqueness of equilibrium measures for regular potentials. We define the notions of recurrence and transience of a potential in this setting. We define the renewal flow, which is a symbolic model for a class of flows with diverse recurrence features. We study the corresponding thermodynamic formalism, establishing conditions for the existence of equilibrium measures and phase transitions. Applications are given to suspension flows defined over interval maps having parabolic fixed points
In this paper, we give a geometric criterion ensuring the recurrence of the vertical flow on \(Z^d\)...
In this note we show that the transfer operator of a Rauzy-Veech-Zorich renormalization map acting o...
The equations of reversible (inviscid, adiabatic) fluid dynamics have a well-known variational formu...
Funding: Proyecto Fondecyt 1110040 for funding visit to PUC-Chile and partial support from NSF grant...
In recent work, I. Melbourne and D. Terhesiu, 2014 obtain optimal results for the asymptotic of the ...
In dynamical systems theory, a standard method for passing from discrete time to continuous time is ...
Abstract. We introduce the notion of topological pressure for suspension flows over countable Markov...
37 pagesThe paper gives first quantitative estimates on the modulus of continuity of the spectral me...
In the upcoming chapter we introduce recurrence relations. These are equations that define in recurs...
Some important results on persistence are reviewed. These results concern the behavior of the orbits...
Random recurrence relations are stochastic difference equations, which define recursively a sequence...
The long-time behavior of orbits is one of the most fundamental properties in dynamical systems. Poi...
In the context of geodesic flows of noncompact negatively curved manifolds, we propose three differe...
The fluctuation theorem and the dissipation theorem provide relationships to describe nonequilibrium...
Abstract. For an action of a finitely generated group G on a compact space X we define recurrence at...
In this paper, we give a geometric criterion ensuring the recurrence of the vertical flow on \(Z^d\)...
In this note we show that the transfer operator of a Rauzy-Veech-Zorich renormalization map acting o...
The equations of reversible (inviscid, adiabatic) fluid dynamics have a well-known variational formu...
Funding: Proyecto Fondecyt 1110040 for funding visit to PUC-Chile and partial support from NSF grant...
In recent work, I. Melbourne and D. Terhesiu, 2014 obtain optimal results for the asymptotic of the ...
In dynamical systems theory, a standard method for passing from discrete time to continuous time is ...
Abstract. We introduce the notion of topological pressure for suspension flows over countable Markov...
37 pagesThe paper gives first quantitative estimates on the modulus of continuity of the spectral me...
In the upcoming chapter we introduce recurrence relations. These are equations that define in recurs...
Some important results on persistence are reviewed. These results concern the behavior of the orbits...
Random recurrence relations are stochastic difference equations, which define recursively a sequence...
The long-time behavior of orbits is one of the most fundamental properties in dynamical systems. Poi...
In the context of geodesic flows of noncompact negatively curved manifolds, we propose three differe...
The fluctuation theorem and the dissipation theorem provide relationships to describe nonequilibrium...
Abstract. For an action of a finitely generated group G on a compact space X we define recurrence at...
In this paper, we give a geometric criterion ensuring the recurrence of the vertical flow on \(Z^d\)...
In this note we show that the transfer operator of a Rauzy-Veech-Zorich renormalization map acting o...
The equations of reversible (inviscid, adiabatic) fluid dynamics have a well-known variational formu...