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Statistical properties of time-dependent systems : doctoral dissertationOliveira, Diego Fregolente Mendes deIn the dissertation I have dealt with time-dependent (nonautonomous) systems, the conservative (Hamiltonian) as well as dissipative, and investigated their dynamical and statistical properties. In ... conservative (Hamiltonian) time-dependent systems the energy is not conserved, whilst the Liouville theorem about the conservation of the phase space volume still applies. We are interested to know, whether the system can gain energy, and whether this energy can grow unbounded, up to infinity, and we are interested in the system's behaviour in the mean, as well as its statistical properties. An example of such a system goes back to the 1940s, when Fermi proposed the acceleration of cosmic rays (in the first place protons) upon the collisions with moving magnetic domains in the interstellar medium of our Galaxy, and in other galaxies. He then proposed a simple mechanical one-dimensional model, the so-called Fermi-Ulam Model (FUM), where a point particle is moving between two rigid walls, one being at rest and the other one oscillating. If the oscillation is periodic and smooth, it turned out in a nontrivial way, which is, in the modern era of understanding the chaotic dynamical systems, well understood, namely that the unbounded increasing of the energy (the so-called Fermi acceleration) is not possible, due to the barriers in form of invariant tori, which partition the phase space into regions, between which the transitions are not possible. The research has then been extended to other simple dyanamical systems, which have complex dynamics. The first was so-called bouncer model, in which a point particle bounces off the oscillating platform in a gravitational field. In this simple system the Fermi acceleration is possible. Later the research was directed towards two-dimensional billiard systems. It turned out that the Fermi acceleration is possible in all such systems, which are at least partially chaotic (of the mixed type), or even in a system that is integrable as static, namely in case of the elliptic billiard. (The circle billiard is an exception, because it is always integrable, as the angular momentum is conserved even in time-dependent case.) The study of time-dependent systems has developed strongly worldwide around the 1990s, in particular in 2000s, and became one of the central topics in nonlinear dynamics. It turned out, quite generally, but formal and implicit, in the sense of mathematical existence theorems, that in nonautonomous Hamilton systems the energy can grow unbounded, meaning that the system ``pumps" the energy from the environment with which it interacts. There are many open questions: how does the energy increase with time, in particular in the mean of some representative ensemble of initial conditions (typically the phase space of two-dimensional time-dependent billiards is four-dimensional.) It turned out that almost everywhere the power laws apply, empirically, based on the numerical calculations, but with various acceleration exponents. If the Fermi acceleration is not posssible, like e.g. in the FUM, due to the invariant tori, then after a certain time of acceleration stage the crossover into the regime of saturation takes place, whose characteristics also follow the power laws. One of the central themes in the dissertation is the study of these power laws, their critical exponents, analytical relationships among them, using the scaling analysis (Leonel, McClintock and Silva, Phys. Rev. Lett. 2004). Furthermore, the central theme is the question, what happens, if, in a nonautonomous Hamilton system which exhibits Fermi acceleration, we introduce dissipation, either at the collisions with the walls (collisional dissipation) or during the free motion (in-flight dissipation, due to the viscosity of the fluid or the drag force etc.). Dissipation typically transforms the periodic points into point attractors and chaotic components into chaotic attractors. The Fermi acceleration is always suppressed. We are interested in the phase portraits.Vrsta gradiva - disertacija ; neleposlovje za odrasleZaložništvo in izdelava - [Maribor : D. F. M. de Oliveira], 2012Jezik - angleškiCOBISS.SI-ID - 19304200
Povezava(-e):
Digitalna knjižnica Univerze v Mariboru – DKUM
Digitalna knjižnica Slovenije - dLib.siDostop z namenskih računalnikov v prostorih NUK
Avtor
Oliveira, Diego Fregolente Mendes de
Drugi avtorji
Robnik, Marko, 1954-
Teme
Univerzitetna in visokošolska dela |
nelinearna dinamika |
dinamični sistemi |
konservativni sistemi |
disipativni sistemi |
časovno odvisni sistemi |
Fermijevo pospeševanje |
biljardi |
brcani sistemi |
kaos |
kaotični atraktorji |
periodični atraktorji |
bifurkacije |
kriza roba |
disertacije |
nonlinear dynamics |
dynamical systems |
conservative systems |
dissipative systems |
time-dependent systems |
Fermi acceleration |
billiards |
kicked systems |
chaos |
chaotic attractors |
periodic attractors |
bifurcations |
boundary crisis |
dissertations
Signatura – lokacija, inventarna št. ... |
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D DIS 0000000053 OLIVEIRA D.F.M. Statistical IN: 920120073 D DIS 53 OLIVEIRA D.F.M. Statistical IN: 920120073 |
prosto - za čitalnico
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Vnos na polico
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Oliveira, Diego Fregolente Mendes de | |
Robnik, Marko, 1954- | 11337 |
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