Add to ORKGWe propose a new model of ergodic optimization for expanding dynamical systems: the holonomic setting. In fact, we introduce an extension of the standard model used in this theory. The formulation we consider here is quite natural if one wants a meaning for possible variations of a real trajectory under the forward shift. In other contexts (for twist maps, for instance), this property appears in a crucial way. A version of the Aubry–Mather theory for symbolic dynamics is introduced. We are mainly interested here in problems related to the properties of maximizing probabilities for the two-sided shift. Under the transitive hypothesis, we show the existence of sub-actions for Holder potentials also in the holonomic setting. We analyze then co...
Abstract. The results of transition state theory are derived rigorously in the general context of er...
Abstract: We study the statistical properties of trajectories of a class of dynamical syst...
We consider a generalization of the Frenkel-Kontorova model in higher dimension leading to a new the...
We propose a new model of ergodic optimization for expanding dynamical systems: the holonomic settin...
Sub-actions can be interpreted as a concept which corresponds by duality to maximizing probabilities...
This book focuses on the interpretation of ergodic optimal problems as questions of variational dyna...
Given a topological dynamical systems (Formula presented.), consider a sequence of continuous potent...
Holonomic techniques have deep roots going back to Wallis, Euler, and Gauss, and have evolved in mod...
John Mather’s seminal works in Hamiltonian dynamics represent some of the most important contributio...
Let f be a real-valued function defined on the phase space of a dynamical system. Ergodic optimizati...
We consider a one-sided transitive subshift of finite type σ: Σ → Σ and a Hölder observable A. In t...
We consider a one-sided transitive subshift of finite type $ \sigma: \Sigma \to \Sigma $ and a Hölde...
John Mather's seminal works in Hamiltonian dynamics represent some of the most important contributio...
This dissertation consists principally of four of the author’s research articles, included as Chapte...
We survey an area of recent development, relating dynamics to theo-retical computer science. We disc...
Abstract. The results of transition state theory are derived rigorously in the general context of er...
Abstract: We study the statistical properties of trajectories of a class of dynamical syst...
We consider a generalization of the Frenkel-Kontorova model in higher dimension leading to a new the...
We propose a new model of ergodic optimization for expanding dynamical systems: the holonomic settin...
Sub-actions can be interpreted as a concept which corresponds by duality to maximizing probabilities...
This book focuses on the interpretation of ergodic optimal problems as questions of variational dyna...
Given a topological dynamical systems (Formula presented.), consider a sequence of continuous potent...
Holonomic techniques have deep roots going back to Wallis, Euler, and Gauss, and have evolved in mod...
John Mather’s seminal works in Hamiltonian dynamics represent some of the most important contributio...
Let f be a real-valued function defined on the phase space of a dynamical system. Ergodic optimizati...
We consider a one-sided transitive subshift of finite type σ: Σ → Σ and a Hölder observable A. In t...
We consider a one-sided transitive subshift of finite type $ \sigma: \Sigma \to \Sigma $ and a Hölde...
John Mather's seminal works in Hamiltonian dynamics represent some of the most important contributio...
This dissertation consists principally of four of the author’s research articles, included as Chapte...
We survey an area of recent development, relating dynamics to theo-retical computer science. We disc...
Abstract. The results of transition state theory are derived rigorously in the general context of er...
Abstract: We study the statistical properties of trajectories of a class of dynamical syst...
We consider a generalization of the Frenkel-Kontorova model in higher dimension leading to a new the...