Add to ORKGWe study Lyapunov exponents for flat bundles over hyperbolic curves defined via parallel transport over the geodesic flow. We consider them as invariants on the space of Hitchin representations and show that there is a gap between any two consecutive Lyapunov exponents. Moreover we characterize the uniformizing representation of the Riemann surface as the one with the extremal gaps. The strategy of the proof is to relate Lyapunov exponents in the case of Anosov representations to other invariants, where the gap result is already available or where we can directly show it. In particular, firstly we relate Lyapunov exponents to a foliated Lyapunov exponent associated to a foliation H\"older isomorphic to the unstable foliation on the unitar...
More minor corrections (in the statement of Corollary 3 and the bibliography)We compute the sum of t...
Abstract. We study several new invariants associated to a holomorphic projective struc-ture on a Rie...
In this paper we pursue a more geometric approach to compactification of the Hitchin component. Our ...
If E is a flat bundle of rank r over a Kähler manifold X, we define the Lyapunov spectrum of E: a se...
Consider the flat bundle on $\mathrm{CP}^1 - \{0,1,\infty \}$ corresponding to solutions of the hype...
This thesis is organized around two main themes : on one hand (chapter 1 to 3) we study the Lyapunov...
Lyapunov exponents measure the asymptotic behavior of tangent vectors under iteration, positive expo...
Cette thèse est articulée autour de deux thématiques : la première (chapitres 1 à 3) est l’étude des...
In this thesis we study a number of systems with varying degrees of hyperbolicity, including uniform...
39 pages, 10 figuresInternational audienceBy the results of G. Forni and of R. Treviño, the Lyapunov...
International audienceLet (ρλ)λ∈Λ be a holomorphic family of representations of a surface group π1(S...
Abstract. Consider the Banach manifold of real analytic linear cocycles with values in the general l...
We prove a conjecture of Viana which states that Lyapunov exponents vary continuously when restricte...
In the first part of the thesis we investigate Lyapunov exponents for general flat vector bundles ov...
Neste trabalho nós estudamos os expoentes de Lyapunov de aplicações f : Td → Td homotópicas a u...
More minor corrections (in the statement of Corollary 3 and the bibliography)We compute the sum of t...
Abstract. We study several new invariants associated to a holomorphic projective struc-ture on a Rie...
In this paper we pursue a more geometric approach to compactification of the Hitchin component. Our ...
If E is a flat bundle of rank r over a Kähler manifold X, we define the Lyapunov spectrum of E: a se...
Consider the flat bundle on $\mathrm{CP}^1 - \{0,1,\infty \}$ corresponding to solutions of the hype...
This thesis is organized around two main themes : on one hand (chapter 1 to 3) we study the Lyapunov...
Lyapunov exponents measure the asymptotic behavior of tangent vectors under iteration, positive expo...
Cette thèse est articulée autour de deux thématiques : la première (chapitres 1 à 3) est l’étude des...
In this thesis we study a number of systems with varying degrees of hyperbolicity, including uniform...
39 pages, 10 figuresInternational audienceBy the results of G. Forni and of R. Treviño, the Lyapunov...
International audienceLet (ρλ)λ∈Λ be a holomorphic family of representations of a surface group π1(S...
Abstract. Consider the Banach manifold of real analytic linear cocycles with values in the general l...
We prove a conjecture of Viana which states that Lyapunov exponents vary continuously when restricte...
In the first part of the thesis we investigate Lyapunov exponents for general flat vector bundles ov...
Neste trabalho nós estudamos os expoentes de Lyapunov de aplicações f : Td → Td homotópicas a u...
More minor corrections (in the statement of Corollary 3 and the bibliography)We compute the sum of t...
Abstract. We study several new invariants associated to a holomorphic projective struc-ture on a Rie...
In this paper we pursue a more geometric approach to compactification of the Hitchin component. Our ...