Silvia Vilari˜no Fernández NUEVAS APORTACIONES AL ESTUDIO ...

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388 Bibliografía [111] L.K. Norris, Symplectic geometry on T ∗ M derived from n-symplectic geometry on LM, J. Geom. Phys. 13 (1994) 51-78. [112] L.K. Norris, Schouten-Nijenhuis Brackets, J. Math. Phys. 38 (1997) 2694- 2709. [113] L. K. Norris, n-symplectic algebra of observables in covariant Lagrangian field theory, J. Math. Phys. 42(10) (2001) 4827–4845. [114] P.J. Olver, Applications of Lie groups to differential equations. Graduate Texts in Mathematics, 107. Springer-Verlag, New York, 1986. [115] M.F. Rañada, Integrable Three Particle Systems, Hidden Symmetries and Deformations of the Calogero-Moser System , J. Math. Phys. 36(7) (1995) 3541- 3558. [116] M.F. Rañada, Superintegrable n = 2 Systems, Quadratic Constants of Motion, and Potential of Drach , J. Math. Phys. 38(8) (1995) 4165-4178. [117] A.M. Rey, N. Román-Roy, M. Salgado, Günther’s formalism (ksymplectic formalism) in classical field theory: Skinner-Rusk approach and the evolution operator, J. Math. Phys. 46(5) (2005) 052901, 24 pp. [118] N. Román-Roy, A. M. Rey, M. Salgado, Modesto, S. Vilariño, On the k-symplectic, k-cosymplectic and multysimplectic formalism of Classical Field Theories. http://arxiv.org/abs/0705.4364 [119] N. Román-Roy, M. Salgado, S. Vilariño, Symmetries and conservation laws in the Günther k-symplectic formalism of field theory. Rev. Math. Phys. 19 (2007), no. 10, 1117–1147. [120] G. Sardanashvily, Gauge theory in jet manifolds, Hadronic Press Monographs in Applied Mathematics. Hadronic Press, Inc., Palm Harbor, FL, 1993. [121] G. Sardanashvily, Generalized Hamiltonian formalism for field theory. Constraint systems, World Scientific Publishing Co., Inc., River Edge, NJ, 1995. [122] W. Sarlet, F. Cantrijn, Higher-order Noether symmetries and constants of the motion, J. Phys. A: Math. Gen. 14 (1981) 479-492. [123] D. J. Saunders: An Alternative Approach to the Cartan Form in Lagrangian Field Theories, J. Phys. A: Math. Gen. 20 (1987), 339-349.
Bibliografía 389 [124] D. J. Saunders: Jet Fields, Connections and Second-Order Differential Equations, J. Phys. A: Math. Gen. 20 (1987), 3261-3270. [125] D. J. Saunders: The Geometry of Jet Bundles, London Math. Soc. Lecture Notes Series, 142, Cambridge Univ. Press, Cambridge, 1989. [126] R. Skinner, R. Rusk. Generalized Hamiltonian dynamics. I. Formulation on T ∗ M ⊕ T M.J. Math. Phys.24 (11) (1983) 2589.2594. [127] P. Schaller, T. Strobl, Poisson structure induced (topological) field theories, Mod. Phys. Lett., A), (1994), 3129-3136. [128] J. Sniatycki, On the geometric structure of classical field theory in Lagrangian formulation, Math. Proc. Cambridge Philos. Soc. 68 (1970) 475-484. [129] J. Spillmann M. Teschner, CORDE: Cosserat Rod Elements for the Dynamic Simulation of One-Dimensional Elastic Objects,Eurographics/ ACM SIG- GRAPH Symposium on Computer Animation (2007), pp. 110 [130] T. Strobl, Gravity from Lie algebroid morphisms. Comm. Math. Phys. 246 (2004), no. 3, 475–502. [131] J. Szilasi, A setting for spray and Finsler geometry. In: Handbook of Finsler geometry, Vol. 2, ed. P. L. Antonelli, Kluwer Academic Publishers, Dordrecht, 2003, 1185-1426. [132] W.M. Tulczyjew, Hamiltonian systems, Lagrangian systems and the Legendre transformation, Symposia Mathematica 16 (1974) 247–258. [133] W. M. Tulczyjew, Les sous-variétés lagrangiennes et la dynamique lagrangienne. (French) C. R. Acad. Sci. Paris Sér. A-B 283 (1976), no. 8, Av, A675– A678. [134] W. M. Tulczyjew, Les sous-variétés lagrangiennes et la dynamique hamiltonienne. (French) C. R. Acad. Sci. Paris Sér. A-B283 (1976), no. 1, Ai, A15-A18. [135] J. Vankerschaver Euler-Poincaré reduction for discrete field theories. J. Math. Phys. 48 (2007), no. 3, 032902, 17 pp. [136] J. Vankerschaver Continuous and discrete aspects of classical field theories with nonholonomic constraints. PhD diss., Ghent University. http://www.cds.caltech.edu/ jvk/thesis/thesis-jvk.pdf
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Silvia Vilariño Fernández NUEVAS
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A mi familia
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Índice general Agradecimientos VII
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4.1. La sucesión exacta corta cons
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7.2.1. Estructura k-cosimpléctica.
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y k-cosimpléctico, de modo que los
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Capítulo 6: Formulación k-cosimpl
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Capítulo 1 Formulación k-simpléc
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1.1.1 Fundamentos geométricos. 5 E
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1.1.1 Fundamentos geométricos. 7 (
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1.1.1 Fundamentos geométricos. 9 D
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1.1.2 Campos de k-vectores y seccio
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1.1.3 Formalismo hamiltoniano. Ecua
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1.2 El enfoque lagrangiano. 21 Teni
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1.2.1 Elementos geométricos. 23 El
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1.2.1 Elementos geométricos. 25 Ob
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1.2.1 Elementos geométricos. 27 De
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1.2.3 Campos de k-vectores y sopde
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1.2.3 Campos de k-vectores y sopde
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1.2.4 Formalismo lagrangiano. Ecuac
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1.3 Equivalencia entre las formulac
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44 2 Simetrías y Leyes de conserva
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Capítulo 3 Teoría de Campos con l
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3.1.2 El fibrado de las formas de l
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3.1.4 Las ecuaciones de campo no-ho
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3.2 El proyector no-holonómico. 87
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3.2 El proyector no-holonómico. 89
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3.3 La ecuación momento no-holonó
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3.4.1 “Cosserat rods”(Barra Cos
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3.4.1 “Cosserat rods”(Barra Cos
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3.4.3 Ligaduras lineales. 101 Si la
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3.4.3 Ligaduras lineales. 103 donde
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3.4.3 Ligaduras lineales. 105 Demos
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3.4.4 Ligaduras definidas por conex
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3.5 Teoría hamiltoniana k-simpléc
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3.5 Teoría hamiltoniana k-simpléc
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114 4 Relación entre conexiones no
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144 5 Formulación k-simpléctica e
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Capítulo 6 Formulación k-cosimpl
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6.1.1 Fundamentos geométricos. 225
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6.1.1 Fundamentos geométricos. 227
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6.2.1 Elementos geométricos. 241 f
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6.2.1 Elementos geométricos. 243 p
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6.2.1 Elementos geométricos. 245 d
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6.2.2 Ecuaciones en derivadas parci
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6.2.2 Ecuaciones en derivadas parci
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6.2.3 Formalismo lagrangiano: ecuac
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6.3 Equivalencia entre la formulaci
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266 7 Formalismo k-cosimpléctico y
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308 8 Formalismo k-cosimpléctico e
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Page 379 and 380: A continuación multiplicamos la ex
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Page 395 and 396: Conclusiones. El punto de partida d
Page 397 and 398: Bibliografía [1] R. Abraham-J. E.
Page 399 and 400: Bibliografía 381 [25] J. Cortés,
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Page 403 and 404: Bibliografía 385 [75] M. de León,
Page 405: Bibliografía 387 [100] E. Martíne
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Silvia Vilari˜no Fernández NUEVAS APORTACIONES AL ESTUDIO ...

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