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[1]
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P.B. Acosta-Humánez.
Galoisian approach to supersymmetric quantum mechanics.
PhD thesis, Univ. Politècnica de Catalunya, July 2009.
[ URL ]
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[2]
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P.B. Acosta-Humánez.
Nonautonomous Hamiltonian systems and Morales-Ramis theory.
I. The case x”=f(x,t).
SIAM J. Appl. Dyn. Syst., 8(1):279-297, 2009.
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[3]
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P.B. Acosta-Humánez, M. Álvarez Ramírez, and J. Delgado.
Non-integrability of some few body problems in two degrees of
freedom.
Qual. Theory Dyn. Syst., 8(2):209-239, 2009.
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MR ]
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[4]
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P.B. Acosta-Humánez, D. Blázquez-Sanz, and C.A. Vargas-Contreras.
On Hamiltonian potentials with quartic polynomial normal
variational equations.
Nonlinear Stud., 16(3):299-313, 2009.
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[5]
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E.M. Alessi, G. Gómez, and J.J. Masdemont.
Leaving the Moon by means of invariant manifolds of libration point
orbits.
Commun. Nonlinear Sci. Numer. Simul., 14(12):4153-4167, 2009.
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MR |
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[6]
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E.M. Alessi, G. Gómez, and J.J. Masdemont.
Transfer orbits in the Earth-Moon system and refinements to JPL
ephemerides.
In Proceedings of the 21st International Symposium on Space
Flight Dynamics, pages 1-15. CNES, 2009.
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[7]
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E. Athanassoula, M. Romero-Gómez, A. Bosma, and J.J. Masdemont.
Rings and spirals in barred galaxies II. Ring and spiral
morphology.
Mon. Not. Roy. Astron. Soc., 400:1706-1720, 2009.
[ Scopus ]
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[8]
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E. Athanassoula, M. Romero-Gómez, and J.J. Masdemont.
Rings and spirals in barred galaxies I. Building blocks.
Monthly Notices Roy. Astronom. Soc., 394:67-81, 2009.
[ Scopus ]
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[9]
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E. Barrabés, G. Gómez, J.M. Mondelo, and M. Ollé.
Automatic generation of Lissajous-type libration point trajectories
and its manifolds for large energies.
In Proceedings of the 21th International Symposium on Space
Flight Dynamics, pages 1-15. Centre National d'Études Spatiales, 2009.
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[10]
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E. Barrabés, J.M. Mondelo, and M. Ollé.
Dynamical aspects of multi-round horseshoe-shaped homoclinic orbits
in the RTBP.
Celestial Mech. Dynam. Astronom., 105(1-3):197-210, 2009.
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MR |
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[11]
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E. Barrabés, J.M. Mondelo, and M. Ollé.
Numerical continuation of families of homoclinic connections of
periodic orbits in the RTBP.
Nonlinearity, 22(12):2901-2918, 2009.
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[12]
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I. Basak.
Explicit solution of the Zhukovski-Volterra gyrostat.
Regul. Chaotic Dyn., 14(2):223-236, 2009.
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MR |
Scopus ]
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[13]
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D. Blázquez-Sanz.
Affine structures on jet and Weil bundles.
Colloq. Math., 114(2):291-305, 2009.
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MR ]
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[14]
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F. Borondo, A. Luque, J. Villanueva, and D.A. Wisniacki.
A dynamical systems approach to Bohmian trajectories in a 2D
harmonic oscillator.
J. Phys. A-Math. Theor., 42(49):495103, 14 pp., 2009.
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MR ]
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[15]
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R. Calleja and R. de la Llave.
Fast numerical computation of quasi-periodic equilibrium states in
1D statistical mechanics, including twist maps.
Nonlinearity, 22(6):1311-1336, 2009.
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MR |
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[16]
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F. Calogero, D. Gómez-Ullate, P.M. Santini, and M. Sommacal.
Towards a theory of chaos explained as travel on Riemann surfaces.
J. Phys. A-Math. Theor., 42(1):015205, 26 pp., 2009.
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MR |
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[17]
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F. Cano, F. Loray, J.J. Morales-Ruiz, M. Spivakovsky, and P. Sad.
Présentation [Équations différentielles et
singularités. En l'honneur de J.M. Aroca].
Astérisque, 323:vii-ix, 2009.
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[18]
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C. Christopher, J. Llibre, Ch. Pantazi, and S. Walcher.
Inverse problems for invariant algebraic curves: explicit
computations.
Proc. Roy. Soc. Edinburgh Sect. A, 139(2):287-302, 2009.
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MR ]
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[19]
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A. Delshams and G. Huguet.
Geography of resonances and Arnold diffusion in a priori unstable
Hamiltonian systems.
Nonlinearity, 22(8):1997-2077, 2009.
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MR |
Scopus ]
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[20]
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E. Fantino, G. Gómez, J.J. Masdemont, and Y. Ren.
On the relation between the Earth's weak stability boundary region
and the low-energy transfers to the Moon.
In Proceedings of the 21st International Symposium on Space
Flight Dynamics, pages 1-15. CNES, 2009.
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[21]
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Yu.N. Fedorov and B. Jovanović.
Hamiltonization of the generalized Veselova LR system.
Regul. Chaotic Dyn., 14(4-5):495-505, 2009.
[ DOI |
MR |
Scopus ]
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[22]
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Yu.N. Fedorov, A.J. Maciejewski, and M. Przybylska.
The Poisson equations in the nonholonomic Suslov problem:
integrability, meromorphic and hypergeometric solutions.
Nonlinearity, 22(9):2231-2259, 2009.
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MR |
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[23]
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E. Fontich, R. de la Llave, and Y. Sire.
Construction of invariant whiskered tori by a parameterization
method. I. Maps and flows in finite dimensions.
J. Differential Equations, 246(8):3136-3213, 2009.
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MR |
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[24]
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E. Fontich, R. de la Llave, and Y. Sire.
A method for the study of whiskered quasi-periodic and
almost-periodic solutions in finite and infinite dimensional Hamiltonian
systems.
Electron. Res. Announc. Math. Sci., 16:9-22, 2009.
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MR ]
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[25]
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E. Fossas, S.J. Hogan, and T.M. Seara.
Two-parameter bifurcation curves in power electronic converters.
Internat. J. Bifur. Chaos Appl. Sci. Engrg., 19(1):349-357,
2009.
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MR |
Scopus ]
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[26]
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L. Garcia-Taberner and J.J. Masdemont.
Maneuvering spacecraft formations using a dynamically adapted finite
element methodology.
J. Guid. Control Dyn., 32(5):1585-1597, 2009.
[ Scopus ]
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[27]
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L. Garcia-Taberner and J.J. Masdemont.
Reconfiguration of spacecraft formations in the vicinity of libration
points.
In 60th International Astronautical Congress 2009, pages
4739-4747. IAC, 2009.
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[28]
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M. Gidea and J.J. Masdemont.
Preface.
Commun. Nonlinear Sci. Numer. Simul., 14:4122, 2009.
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[29]
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D. Gómez-Ullate, N. Kamran, and R. Milson.
An extended class of orthogonal polynomials defined by a
Sturm-Liouville problem.
J. Math. Anal. Appl., 359(1):352-367, 2009.
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MR |
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[30]
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M.S. Gonchenko and S.V. Gonchenko.
On cascades of elliptic periodic points in two-dimensional symplectic
maps with homoclinic tangencies.
Regul. Chaotic Dyn., 14(1):116-136, 2009.
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MR |
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[31]
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A. Guillamon and G. Huguet.
A computational and geometric approach to phase resetting curves and
surfaces.
SIAM J. Appl. Dyn. Syst., 8(3):1005-1042, 2009.
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MR |
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[32]
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A. Guillamon and M. Sabatini.
The number of limit cycles in planar systems and generalized Abel
equations with monotonous hyperbolicity.
Nonlinear Anal., 71(5-6):1941-1949, 2009.
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MR ]
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[33]
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X. Li and R. de la Llave.
Construction of quasi-periodic solutions of delay differential
equations via KAM techniques.
J. Differential Equations, 247(3):822-865, 2009.
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MR ]
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[34]
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R. de la Llave.
A smooth center manifold theorem which applies to some ill-posed
partial differential equations with unbounded nonlinearities.
J. Dynam. Differential Equations, 21(3):371-415, 2009.
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MR |
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[35]
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R. de la Llave and E. Valdinoci.
A generalization of Aubry-Mather theory to partial differential
equations and pseudo-differential equations.
Ann. Inst. H. Poincaré Anal. Non Linéaire,
26(4):1309-1344, 2009.
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MR |
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[36]
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R. de la Llave and E. Valdinoci.
Symmetry for a Dirichlet-Neumann problem arising in water waves.
Math. Res. Lett., 16(5):909-918, 2009.
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MR ]
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[37]
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R. de la Llave and A. Windsor.
An application of topological multiple recurrence to tiling.
Discrete Contin. Dyn. Syst. Ser. S, 2(2):315-324, 2009.
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[38]
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J. Llibre and M. Ollé.
On some particular solutions of the n-body problem.
In Proceedings of the VII Jornadas de Trabajo en Mecánica
Celeste, number 1 in ROA, pages 45-52. Real Instituto de la Armada de San
Fernando (Ministerio de Defensa), 2009.
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[39]
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J. Llibre and Ch. Pantazi.
Darboux theory of integrability for a class of nonautonomous vector
fields.
J. Math. Phys., 50(10):102705, 19 pp., 2009.
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MR ]
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[40]
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A. Luque and J. Villanueva.
Numerical computation of rotation numbers of quasi-periodic planar
curves.
Phys. D, 238(20):2025-2044, 2009.
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MR ]
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[41]
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M.R. Massa Esteve and A. Delshams.
Euler's beta integral in Pietro Mengoli's works.
Arch. Hist. Exact Sci., 63(3):325-356, 2009.
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MR ]
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[42]
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J.J. Morales-Ruiz and S. Simon.
On the meromorphic non-integrability of some N-body problems.
Discrete Contin. Dyn. Syst., 24(4):1225-1273, 2009.
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MR |
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[43]
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M. Romero-Gómez, E. Athanassoula, J.J. Masdemont, and
C. García-Gómez.
Invariant manifolds as building blocks for the formation of spiral
arms and rings in barred galaxies.
In Chaos in astronomy, Astrophys. Space Sci. Proc., pages
85-92. Springer, Berlin, 2009.
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[44]
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M. Romero-Gómez, J.J. Masdemont, C. García-Gómez, and
E. Athanassoula.
The role of the unstable equilibrium points in the transfer of matter
in galactic potentials.
Commun. Nonlinear Sci. Numer. Simul., 14(12):4123-4138, 2009.
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MR |
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[45]
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T.M. Seara and J. Villanueva.
Numerical computation of the asymptotic size of the rotation domain
for the Arnold family.
Phys. D, 238(2):197-208, 2009.
[ DOI |
MR ]
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