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[1]
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P. Acosta-Humánez and D. Blázquez-Sanz.
Non-integrability of some Hamiltonians with rational potentials.
Discrete Contin. Dyn. Syst. Ser. B, 10(2-3):265-293, 2008.
[ MR |
Scopus ]
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[2]
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P.B. Acosta Humánez.
Genealogy of simple permutations with order a power of two.
Rev. Colombiana Mat., 42(1):1-14, 2008.
[ MR ]
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[3]
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P.B. Acosta-Humánez and D. Blázquez-Sanz.
Hamiltonian system and variational equations with polynomial
coefficients.
In G.S. Ladde, N.G. Medhin, Ch. Peng, and M. Sambandham, editors,
Dynamic systems and applications. Vol. 5, pages 6-10. Dynamic,
Atlanta, GA, 2008.
[ MR ]
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[4]
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E.M. Alessi, G. Gómez, and J.J. Masdemont.
Cráteres lunares y movimiento de cuerpos menores en el entorno
Tierra-Luna.
In DDAYS 2008 (Cuarta reunión de la red temática
DANCE), pages 1-27. DDAYS Materials, 2008.
[ URL ]
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[5]
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E.M. Alessi, G. Gómez, and J.J. Masdemont.
LEO-Lissajous transfers in the Earth-Moon system.
In IAC-08-C.1.3.7, pages 1-14. IAC Papers Archive, 2008.
[ URL ]
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[6]
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F. Angulo, E. Fossas, T.M. Seara, and G. Olivar.
Bounding the output error in a buck power converter using
perturbation theory.
Math. Probl. Eng., pages Art. ID 732039, 20, 2008.
[ MR ]
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[7]
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I. Baldomá and A. Haro.
One dimensional invariant manifolds of Gevrey type in real-analytic
maps.
Discrete Contin. Dyn. Syst. Ser. B, 10(2-3):295-322, 2008.
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[8]
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I. Baldomá and T.M. Seara.
The inner equation for generic analytic unfoldings of the Hopf-zero
singularity.
Discrete Contin. Dyn. Syst. Ser. B, 10(2-3):323-347, 2008.
[ MR ]
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[9]
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E. Barrabés, G. Gómez, J.M. Mondelo, and M. Ollé.
Numerical parametrizations of libration point trajectories and their
invariant manifolds.
Adv. Astronaut. Sci., 129:1153-1168, 2008.
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[10]
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D. Blázquez-Sanz.
Differential Galois theory and Lie-Vessiot systems.
PhD thesis, Univ. Politècnica de Catalunya. VDM - Verlag Dr.
Müller, October 2008.
[ URL ]
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[11]
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D. Blázquez-Sanz.
The evolution of group theory in differential equations.
Lect. Mat., 29(2):83-93, 2008.
[ MR ]
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[12]
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A.V. Borisov, Yu.N. Fedorov, and I.S. Mamaev.
Chaplygin ball over a fixed sphere: an explicit integration.
Regul. Chaotic Dyn., 13(6):557-571, 2008.
[ MR ]
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[13]
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H.W. Braden and Yu.N. Fedorov.
An extended Abel-Jacobi map.
J. Geom. Phys., 58(10):1346-1354, 2008.
[ MR ]
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[14]
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F. Calogero and D. Gómez-Ullate.
Asymptotically isochronous systems.
J. Nonlinear Math. Phys., 15(4):410-426, 2008.
[ MR |
Scopus ]
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[15]
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E. Canalias and J.J. Masdemont.
Computing natural transfers between Sun-Earth and
Earth-Moon Lissajous libration point orbits.
Acta Astronaut., 63(1-4):238-248, 2008.
[ Scopus ]
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[16]
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E. Canalias and J.J. Masdemont.
Dynamical systems tools applied to transfer orbits in spacecraft
mission design.
In Workshop on Stability and Instability in Mechanical Systems:
Applications and Numerical Tools - WSIMS 08, pages 1-133. Institut de
Matemàtiques de la Universitat de Barcelona, 2008.
[ URL ]
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[17]
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A. Delshams, E. Fontich, and À. Jorba.
Prologue [Special issue dedicated to Carles Simó on the
occasion of his 60th anniversary].
Discrete Contin. Dyn. Syst. Ser. B, 10(2-3):i-iii, 2008.
[ MR ]
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[18]
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A. Delshams, M. Gidea, R. de la Llave, and T.M. Seara.
Geometric approaches to the problem of instability in Hamiltonian
systems. An informal presentation.
In W. Craig, editor, Hamiltonian dynamical systems and
applications, volume 24 of NATO Sci. Peace Secur. Ser. B Phys.
Biophys., pages 285-336. Springer, Dordrecht, 2008.
[ DOI |
MR ]
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[19]
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A. Delshams, R. de la Llave, and T.M. Seara.
Geometric properties of the scattering map of a normally hyperbolic
invariant manifold.
Adv. Math., 217(3):1096-1153, 2008.
[ MR |
Scopus ]
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[20]
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A. Delshams, J. Masdemont, and P. Roldán.
Computing the scattering map in the spatial Hill's problem.
Discrete Contin. Dyn. Syst. Ser. B, 10(2-3):455-483, 2008.
[ MR ]
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[21]
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O. Díaz-Espinosa and R. de la Llave.
Renormalization of arbitrary weak noises for one-dimensional critical
dynamical systems: summary of results and numerical explorations.
In M. Lyubich and M. Yampolsky, editors, Holomorphic dynamics
and renormalization, volume 53 of Fields Inst. Commun., pages
331-359. Amer. Math. Soc., Providence, RI, 2008.
[ MR ]
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[22]
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L. Garcia-Taberner and J.J. Masdemont.
A methodology unifying bang-bang controls and low-thrust trajectories
for the reconfiguration of spacecraft formations.
Adv. Astron. Sci., 129:709-720, 2008.
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[23]
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D. Gómez-Ullate, A. Hone, S. Lombardo, and J. Puig.
Nonlinear evolution equations and dynamical systems 2007.
J. Nonlinear Math. Phys., 15(suppl. 3):i-x, 2008.
Held in L'Ametlla de Mar, June 15-24, 2007.
[ MR ]
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[24]
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D. Gómez-Ullate, A. Hone, S. Lombardo, and J. Puig, editors.
Nonlinear Evolution Equations and Dynamical Systems 2007,
volume 15, suppl. 3 of J. Nonlinear Math. Phys.
Atlantis Press, Paris, 2008.
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[25]
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A. González-Enríquez and R. de la Llave.
Analytic smoothing of geometric maps with applications to KAM
theory.
J. Differential Equations, 245(5):1243-1298, 2008.
[ MR |
Scopus ]
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[26]
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G. Huguet.
The role of hyperbolic invariant objects: From Arnold diffusion
to biological clocks.
PhD thesis, Univ. Politècnica de Catalunya, October 2008.
[ URL ]
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[27]
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R. de la Llave.
KAM theory for equilibrium states in 1-D statistical mechanics
models.
Ann. Henri Poincaré, 9(5):835-880, 2008.
[ MR |
Scopus ]
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[28]
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R. de la Llave and N.P. Petrov.
Boundaries of Siegel disks: numerical studies of their dynamics and
regularity.
Chaos, 18(3):033135, 11, 2008.
[ MR ]
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[29]
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R. de la Llave, M. Shub, and C. Simó.
Entropy estimates for a family of expanding maps of the circle.
Discrete Contin. Dyn. Syst. Ser. B, 10(2-3):597-608, 2008.
[ MR ]
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[30]
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H.E. Lomelí, J.D. Meiss, and R. Ramírez-Ros.
Canonical Melnikov theory for diffeomorphisms.
Nonlinearity, 21(3):485-508, 2008.
[ MR ]
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[31]
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H.E. Lomelí and R. Ramírez-Ros.
Separatrix splitting in 3D volume-preserving maps.
SIAM J. Appl. Dyn. Syst., 7(4):1527-1557, 2008.
[ MR ]
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[32]
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A. Luque and J. Villanueva.
Computation of derivatives of the rotation number for parametric
families of circle diffeomorphisms.
Phys. D, 237(20):2599-2615, 2008.
[ MR |
Scopus ]
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[33]
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J.J. Masdemont.
The skeleton of the dynamics provided by invariant manifolds of
libration point orbits and some applications.
In Proc. of 2nd Conference on Nonlinear Science and Complexity
NSC08, pages 1-12. ISEP - Instituto Superior de Engenharia do Porto, 2008.
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[34]
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M. Ollé, J.R. Pacha, and J. Villanueva.
Kolmogorov-Arnold-Moser aspects of the periodic Hamiltonian
Hopf bifurcation.
Nonlinearity, 21(8):1759-1811, 2008.
[ MR |
Scopus ]
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[35]
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M. Romero-Gómez, E. Athanassoula, J.J. Masdemont, and
C. García-Gómez.
The formation of spiral arms and rings in barred galaxies.
In Proc. of Chaos, Complexity and Transport: Theory and
Applications 2007, pages 300-308. World Scientific, 2008.
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[36]
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M. Romero-Gómez, J.J. Masdemont, and E. Athanassoula.
The formation of spiral arms and rings in barred galaxies from the
dynamical systems point of view.
In Workshop on Stability and Instability in Mechanical Systems:
Applications and Numerical Tools - WSIMS 08, pages 1-40. Institut de
Matemàtiques de la Universitat de Barcelona, 2008.
[ URL ]
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[37]
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M. Romero-Gómez, J.J. Masdemont, and E. Athanassoula.
Una nueva teoría sobre la formación de anillos y espirales
en galaxias barradas.
In DDAYS 2008 (Cuarta reunión de la red temática
DANCE), pages 1-42. DDAYS Materials, 2008.
[ URL ]
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[38]
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M. Sánchez, G. Gómez, J.J. Masdemont, and L.F. Peñin.
Design and analysis capabilities of LODATO for formation flying
libration point missions.
ESA Publications, SP-654:8 pp., 2008.
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[39]
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J. Villanueva.
Kolmogorov theorem revisited.
J. Differential Equations, 244(9):2251-2276, 2008.
[ MR |
Scopus ]
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