Expoente de Lyapunov para um Gás de Lennard–Jones - CBPFIndex

Referências Bibliográficas
[1] R. O. Vallejos & C. Anteneodo. Theoretical estimates for the largest lyapunov exponent
of many-particle systems. Phys. Rev. E, 66(2):021110, Aug (2002). 1, 3, 4, 15, 76
[2] C. Anteneodo; R. N. P. Maia & R. O. Vallejos. Lyapunov exponent of many-particle
systems: Testing the stochastic approach. Phys. Rev. E, 68(3):036120, Sep (2003). 1,
4, 15, 77, 89
[3] R. O. Vallejos & C. Anteneodo. Largest lyapunov exponent of long-range xy systems.
Physica A: Statistical Mechanics and its Applications, 340(1-3):178–186, September
(2004). 1, 4, 15, 89
[4] R. N. Púpio Maia. Dinâmica e termodinâmica do modelo xy de alcance infinito.
Dissertação de Mestrado, Centro Brasileiro de Pesquisas Físicas–CBPF, (Rio de Ja-
neiro 2004). 1, 15, 77
[5] L. Meirovitch. Methods of Analytical Dynamics. McGraw–Hill, (New York, 1970). 1, 9
[6] N. S. Krylov. Works on the Foundations of Statistical Physics. Princeton University
Press, (Princeton, 1979). 2
[7] L. Casetti; M. Pettini & E. G. D. Cohen. Geometric approach to hamiltonian dynamics
and statistical mechanics. Physics Reports, 337:238–341, (2000). 2, 3, 16
[8] R. van Zon; H. van Beijeren & Ch. Dellago. Largest lyapunov exponent for many particle
systems at low densities. Phys. Rev. Lett., 80(10):2035–2038, Mar (1998). 2, 91
[9] J. Ford. The Fermi-Pasta-Ulam problem: Paradox turns discovery. Physics Reports,
213:271–310, May (1992). 2, 65
[10] A. J. Lichtenberg & M. A. Liberman. Regular and Stochastic Motion: Applied Mathe-
matical Sciences 38. Springer-Verlag, (New York, 1983). 3, 10, 12
[11] M. Hénon. Numerical exploration of hamiltonian systems. In Chaotic Behaviour of
deterministic systems: Les Houches 1981 Session XXXVI. North-Holland, (1983). 3, 11
[12] L. Casetti; M. Cerruti-Sola; M. Modugno; G. Pettini; M. Pettini & R. Gatto. Dynamical
and statistical properties of hamiltonian systems with many degrees of freedom. La
Rivista del Nuovo Cimento, 22(1):1–74, January (1999). 3, 16
129