We consider a system obtained by coupling two Euler-Poinsot systems. The motivation to consider such a system can be traced back to the Riemann Ellipsoids problem. We deal with the problems of integrability and existence of region,of chaotic motions
The present paper investigates stability analysis and numerical treatment of chaotic fractional diff...
This is the first book to systematically state the fundamental theory of integrability and its devel...
We give a complete bifurcation and stability analysis for the relative equilibria of the dynamics of...
We consider differential systems obtained by coupling two Euler–Poinsot systems. The motivation to c...
We provide a result of non-analytic integrability of the so-called J 2-problem. Precisely by using t...
Integrability and chaos are antinomic concepts [1]. This is specially clear for classical dynamics, ...
This thesis presents two descriptions of complexity in dynamical systems. The algebraic approach dea...
This book shows that the phenomenon of integrability is related not only to Hamiltonian systems, but...
Rigid body dynamics is taught in mechanics courses as the highlight of non-trivial integrability. Ye...
This invaluable book examines qualitative and quantitative methods for nonlinear differential equati...
We will review the achievements of Henri Poincar e in the theory of dy- namical systems and will add...
We present an outline of our recent work on Large Poincaré Systems (LPS) which form an important cla...
In this thesis we investigate a chaos in dynamical systems described by the Hamilton function using ...
Melnikov’s method is applied to the planar double pendulum proving it to be a chaotic system. The pa...
International audienceVarious solutions are displayed and analyzed (both analytically and numericall...
The present paper investigates stability analysis and numerical treatment of chaotic fractional diff...
This is the first book to systematically state the fundamental theory of integrability and its devel...
We give a complete bifurcation and stability analysis for the relative equilibria of the dynamics of...
We consider differential systems obtained by coupling two Euler–Poinsot systems. The motivation to c...
We provide a result of non-analytic integrability of the so-called J 2-problem. Precisely by using t...
Integrability and chaos are antinomic concepts [1]. This is specially clear for classical dynamics, ...
This thesis presents two descriptions of complexity in dynamical systems. The algebraic approach dea...
This book shows that the phenomenon of integrability is related not only to Hamiltonian systems, but...
Rigid body dynamics is taught in mechanics courses as the highlight of non-trivial integrability. Ye...
This invaluable book examines qualitative and quantitative methods for nonlinear differential equati...
We will review the achievements of Henri Poincar e in the theory of dy- namical systems and will add...
We present an outline of our recent work on Large Poincaré Systems (LPS) which form an important cla...
In this thesis we investigate a chaos in dynamical systems described by the Hamilton function using ...
Melnikov’s method is applied to the planar double pendulum proving it to be a chaotic system. The pa...
International audienceVarious solutions are displayed and analyzed (both analytically and numericall...
The present paper investigates stability analysis and numerical treatment of chaotic fractional diff...
This is the first book to systematically state the fundamental theory of integrability and its devel...
We give a complete bifurcation and stability analysis for the relative equilibria of the dynamics of...
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