Add to ORKGInternational audienceWith their origin in thermodynamics and symbolic dynamics, Gibbs measures are crucial tools to study the ergodic theory of the geodesic flow on negatively curved manifolds. We develop a framework (through Patterson-Sullivan densities) allowing us to get rid of compactness assumptions on the manifold, and prove many existence, uniqueness and finiteness results of Gibbs measures. We give many applications to the variational principle, the counting and equidistribution of orbit points and periods, the unique ergodicity of the strong unstable foliation and the classification of Gibbs densities on some Riemannian covers
In this work, we study the ergodic properties of the horospherical foliation of a geometrically fini...
Focussing on the mathematics related to the recent proof of ergodicity of the (Weil–Petersson) geode...
In this work, we study the ergodic properties of the horospherical foliation of a geometrically fini...
With their origin in thermodynamics and symbolic dynamics, Gibbs measures are crucial tools to study...
The ideal boundary of a negatively curved manifold naturally carries two types of measures. On the o...
This book provides a complete exposition of equidistribution and counting problems weighted by a pot...
International audienceGiven a lamination in a compact space and a laminated vector field $X$ which i...
International audienceGiven a lamination in a compact space and a laminated vector field $X$ which i...
International audienceGiven a lamination in a compact space and a laminated vector field $X$ which i...
International audienceGiven a lamination in a compact space and a laminated vector field $X$ which i...
International audienceWe characterize the finiteness of Gibbs measures for geodesic flows on negativ...
The work of E. Hopf and G.A. Hedlund, in the 1930s, on transitivity and ergodicity of the geodesic f...
International audienceGiven a lamination in a compact space and a laminated vector field $X$ which i...
International audienceIn this paper we define a notion of Gibbs measure for the geodesic flow tangen...
International audienceIn this paper we define a notion of Gibbs measure for the geodesic flow tangen...
In this work, we study the ergodic properties of the horospherical foliation of a geometrically fini...
Focussing on the mathematics related to the recent proof of ergodicity of the (Weil–Petersson) geode...
In this work, we study the ergodic properties of the horospherical foliation of a geometrically fini...
With their origin in thermodynamics and symbolic dynamics, Gibbs measures are crucial tools to study...
The ideal boundary of a negatively curved manifold naturally carries two types of measures. On the o...
This book provides a complete exposition of equidistribution and counting problems weighted by a pot...
International audienceGiven a lamination in a compact space and a laminated vector field $X$ which i...
International audienceGiven a lamination in a compact space and a laminated vector field $X$ which i...
International audienceGiven a lamination in a compact space and a laminated vector field $X$ which i...
International audienceGiven a lamination in a compact space and a laminated vector field $X$ which i...
International audienceWe characterize the finiteness of Gibbs measures for geodesic flows on negativ...
The work of E. Hopf and G.A. Hedlund, in the 1930s, on transitivity and ergodicity of the geodesic f...
International audienceGiven a lamination in a compact space and a laminated vector field $X$ which i...
International audienceIn this paper we define a notion of Gibbs measure for the geodesic flow tangen...
International audienceIn this paper we define a notion of Gibbs measure for the geodesic flow tangen...
In this work, we study the ergodic properties of the horospherical foliation of a geometrically fini...
Focussing on the mathematics related to the recent proof of ergodicity of the (Weil–Petersson) geode...
In this work, we study the ergodic properties of the horospherical foliation of a geometrically fini...