Add to ORKGIn the context of geodesic flows of noncompact negatively curved manifolds, we propose three different definitions of entropy and pressure at infinity, through growth of periodic orbits, critical exponents of Poincar\'e series, and entropy (pressure) of invariant measures. We show that these notions coincide. Thanks to these entropy and pressure at infinity, we investigate thoroughly the notion of strong positive recurrence in this geometric context. A potential is said strongly positively recurrent when its pressure at infinity is strictly smaller than the full topological pressure. We show in particular that if a potential is strongly positively recurrent, then it admits a finite Gibbs measure. We also provide easy criteria allowing to bu...
This paper represents part of a program to understand the behavior of topological entropy for Anosov...
This paper represents part of a program to understand the behavior of topological entropy for Anosov...
The work of E. Hopf and G.A. Hedlund, in the 1930s, on transitivity and ergodicity of the geodesic f...
In the context of geodesic flows of noncompact negatively curved manifolds, we propose three differe...
70 pages, 7 figuresInternational audienceIn this work, we introduce the notion of entropy at infinit...
70 pages, 7 figuresInternational audienceIn this work, we introduce the notion of entropy at infinit...
34 pages, 4 figures. In this new version we have improved the organization of the paper and the clar...
In this memoir, we describe the interactions between dynamics and analysis on non-compact negatively...
This paper is an interval dynamics counterpart of three theories founded earlier by the authors, S. ...
Basing upon the correspondence between the invariant measures of the geodesic flow on a negatively c...
We prove topological transitivity for the Weil–Petersson geodesic flow for real two-dimensional modu...
The ideal boundary of a negatively curved manifold naturally carries two types of measures. On the o...
With their origin in thermodynamics and symbolic dynamics, Gibbs measures are crucial tools to study...
(Communicated by Yuri Kifer) Abstract. We introduce pointwise dimensions and spectra associated with...
International audienceWith their origin in thermodynamics and symbolic dynamics, Gibbs measures are ...
This paper represents part of a program to understand the behavior of topological entropy for Anosov...
This paper represents part of a program to understand the behavior of topological entropy for Anosov...
The work of E. Hopf and G.A. Hedlund, in the 1930s, on transitivity and ergodicity of the geodesic f...
In the context of geodesic flows of noncompact negatively curved manifolds, we propose three differe...
70 pages, 7 figuresInternational audienceIn this work, we introduce the notion of entropy at infinit...
70 pages, 7 figuresInternational audienceIn this work, we introduce the notion of entropy at infinit...
34 pages, 4 figures. In this new version we have improved the organization of the paper and the clar...
In this memoir, we describe the interactions between dynamics and analysis on non-compact negatively...
This paper is an interval dynamics counterpart of three theories founded earlier by the authors, S. ...
Basing upon the correspondence between the invariant measures of the geodesic flow on a negatively c...
We prove topological transitivity for the Weil–Petersson geodesic flow for real two-dimensional modu...
The ideal boundary of a negatively curved manifold naturally carries two types of measures. On the o...
With their origin in thermodynamics and symbolic dynamics, Gibbs measures are crucial tools to study...
(Communicated by Yuri Kifer) Abstract. We introduce pointwise dimensions and spectra associated with...
International audienceWith their origin in thermodynamics and symbolic dynamics, Gibbs measures are ...
This paper represents part of a program to understand the behavior of topological entropy for Anosov...
This paper represents part of a program to understand the behavior of topological entropy for Anosov...
The work of E. Hopf and G.A. Hedlund, in the 1930s, on transitivity and ergodicity of the geodesic f...