Results 331 to 340 of about 1,473,692 (365)
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Periodic-Orbit Theory of Quantum Transport in Antidot Lattices
, 1995In a recent experiment Weiss et al. (Phys. Rev. Lett., 70 (1993) 4118) observed novel quantum oscillations in the magnetoconductance of large antidot lattices whose classical dynamics is chaotic.
G. Hackenbroich, F. Oppen
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Molecular-Transition State, Resonances, and Periodic-Orbit Theory
, 1994The dynamics of the molecular transition state, in a reaction or photodissociation process, may be analyzed by semiclassical methods. We investigate the classical dynamics of the transition state in the dissociation HgI2 (X 1Σ+g)→hνHgI(X 2Σ+)+I, and ...
I. Burghardt, P. Gaspard
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Following Periodic Orbits [PDF]
, 1994 As a parameter of a map is varied, periodic orbits are often seen to appear and shift in position and perhaps period double or blink out of existence. The orbit-following capability is for tracing their behavior as a parameter is varied. The orbit following routine runs for two dimensional maps, including for example the time-2π maps of periodically ...
Helena E. Nusse +2 more
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Periodic Orbit Theory and Spectral Statistics for Quantum Graphs
, 1998We quantize graphs (networks) which consist of a finite number of bonds and vertices. We show that the spectral statistics of fully connected graphs is well reproduced by random matrix theory.
T. Kottos, U. Smilansky
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Periodic-orbit resonance in the quasi-one-dimensional organic superconductor (TMTSF)2ClO4
, 2005We report the observation of periodic-orbit resonance POR in a metal possessing pure quasi-onedimensional Q1D Fermiology—namely, the organic linear-chain compound TMTSF 2ClO4, whose Fermi surface consists of a pair of weakly warped sheets.
Susumu Takahashi +4 more
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Bifurcations of Periodic Orbits
2008This chapter and Chapter IX use the theory of normal forms developed in Chapter VI. They contain an introduction to generic bifurcation theory and its applications. Bifurcation theory has grown into a vast subject with a large literature; so, this chapter can only present the basics of the theory.
Dan Offin +2 more
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Periodic orbit analysis for the delayed Filippov system
Proceedings of the American Mathematical Society, 2018Zuowei Cai, Jianhua Huang, Lihong Huang
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Stationkeeping strategy for quasi-periodic orbit around Earth–Moon L2 point
Chinese Control and Decision Conference, 2016Y. Qian +4 more
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1994
An intensively used method for finding periodic orbits is Newton’s method and variants thereof. We describe Newton’s method and the Quasi-Newton method later in this section. Newton→s method uses the initialization point y1, marked by the small cross, as its initial point.
Helena E. Nusse +2 more
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An intensively used method for finding periodic orbits is Newton’s method and variants thereof. We describe Newton’s method and the Quasi-Newton method later in this section. Newton→s method uses the initialization point y1, marked by the small cross, as its initial point.
Helena E. Nusse +2 more
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