Titlebook: Solitons and Chaos; Ioannis Antoniou,Franklin J. Lambert Conference proceedings 1991 Springer-Verlag Berlin Heidelberg 1991 Chaos.Integrab

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G. Dewel,P. Borckmans glaubt, dass bei der ?konomischen Analyse generell der Fehler gemacht würde anzunehmen, dass der Zeitfaktor keine Rolle spiele. Die wirtschaftliche Entwicklung k?nne aber ohne den Einbezug von Institutionen und Zeitfaktoren nicht analysiert werden, denn wirtschaftlicher Wandel sei ein ubiquit?rer,

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Integration of Non-Integrable Systems of tori. It is also apparent in Poincaré’s classification [2] into “integrable” and “non-integrable” systems. As was shown by the KAM theory [1,3], non-integrability leads to the . of random trajectories. In this paper, we summarize our work on “l(fā)arge Poincaré systems” (hereafter refered to as LPS)

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What is the Role of Dynamical Chaos in Irreversible Processes?itions and velocities of the particles. Because of the time-reversal symmetry of Hamiltonian systems, we can recover these initial conditions, if we reverse the velocities a short time after the beginning of the process. However, when we wait too long before reversing the velocities, a return to the

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Damping, Quantum Field Theory and Thermodynamicshe infinite volume limit the set of the states of the damped oscillator splits into disjoint folia, each one parametrized by the time t in such a manner that time evolution is described in terms of trajectories across the folia.

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