Add to ORKGWe will review the achievements of Henri Poincar e in the theory of dy- namical systems and will add a number of extensions and generalizations of his results. It is pointed out that the attention given to two degrees-of-freedom Hamiltonian sys- tems is rather deceptive as near stable equilibrium such systems play a special part. We illustrate Poincar e's theory of critical exponents for the Hamiltonian (1 : 2 : 2)- resonance. To assess the measures of chaos, asymptotic estimates in terms of magni- tude and timescales can be given. Another of Poincar e's topic, bifurcations, is brie y reviewed
A non-vanishing Lyapunov exponent 1 provides the very definition of deterministic chaos in the solu...
Integrability and chaos are antinomic concepts [1]. This is specially clear for classical dynamics, ...
International audienceThis twelfth volume in the Poincaré Seminar Series presents a complete and int...
This article is mainly historical, except for the discussion of integrability and characteristic exp...
We present an outline of our recent work on Large Poincaré Systems (LPS) which form an important cla...
Hamiltonian systems with two or more degrees of freedom are generally nonintegrable which usually i...
With contributions from a number of pioneering researchers in the field, this collection is aimed no...
Hamiltonian systems with two or more degrees of freedom are generally nonintegrable which usually i...
We use Moser's normal forms to study chaotic motion in two-degree hamiltonian systems near a saddle ...
We study the onset of widespread chaos in Hamiltonian systems with two degrees of freedom. Such syst...
Drawing on his work on the qualitative theory of differential equations, in this memoir Poincaré dev...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
Abstract: The dynamics of a system subjected to a potential equal to the sum of the Henon{Heiles pot...
The favourable reception of the first edition and the encouragement received from many readers have ...
Methods proving the existence of chaos in the sense of Poincaré-Birkhoff-Smale horseshoes are presen...
A non-vanishing Lyapunov exponent 1 provides the very definition of deterministic chaos in the solu...
Integrability and chaos are antinomic concepts [1]. This is specially clear for classical dynamics, ...
International audienceThis twelfth volume in the Poincaré Seminar Series presents a complete and int...
This article is mainly historical, except for the discussion of integrability and characteristic exp...
We present an outline of our recent work on Large Poincaré Systems (LPS) which form an important cla...
Hamiltonian systems with two or more degrees of freedom are generally nonintegrable which usually i...
With contributions from a number of pioneering researchers in the field, this collection is aimed no...
Hamiltonian systems with two or more degrees of freedom are generally nonintegrable which usually i...
We use Moser's normal forms to study chaotic motion in two-degree hamiltonian systems near a saddle ...
We study the onset of widespread chaos in Hamiltonian systems with two degrees of freedom. Such syst...
Drawing on his work on the qualitative theory of differential equations, in this memoir Poincaré dev...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
Abstract: The dynamics of a system subjected to a potential equal to the sum of the Henon{Heiles pot...
The favourable reception of the first edition and the encouragement received from many readers have ...
Methods proving the existence of chaos in the sense of Poincaré-Birkhoff-Smale horseshoes are presen...
A non-vanishing Lyapunov exponent 1 provides the very definition of deterministic chaos in the solu...
Integrability and chaos are antinomic concepts [1]. This is specially clear for classical dynamics, ...
International audienceThis twelfth volume in the Poincaré Seminar Series presents a complete and int...