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

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386 Bibliografía [87] P. Libermann, C.M. Marle, Symplectic geometry and analytical mechanics. Mathematics and its Applications, 35. D. Reidel Publishing Co., Dordrecht, 1987. [88] C. López, E. Martínez, M.F. Rañada, Dynamical Symmetries, non- Cartan Symmetries and Superintegrability of the n-Dimensional Harmonic Oscillator , J. Phys. A: Math. Gen. 32 (1999) 1241-1249. [89] K. Mackenzie , Lie groupoids and Lie algebroids in differential geometry. London Math. Soc. Lect. Note Series 124 (Cambridge Univ. Press) (1987). [90] K. Mackenzie , Lie algebroids and Lie pseudoalgebras. Bull. London Math. Soc. 27 (1995) 97-147. [91] L. Mangiarotti, G. Sardanashvily,Gauge mechanics. World Scientific Publishing Co., Inc., River Edge, NJ, 1998 [92] R. S. Marnning, J.H. Maddocks, A continuum rod model of sequencedependent dna structure. J. Chem. Phys. 105 (1996), 56265646. [93] G. Marmo, E.J. Saletan, A. Simoni, B. Vitale, Dynamical systems. A differential geometric approach to symmetry and reduction. Wiley-Interscience Publication, John Wiley & Sons, Ltd., Chichester, (1985). [94] G. Martin, Dynamical structures for k-vector fields. Internat. J. Theoret. Phys. 27 (5) (1988), 571–585. [95] G. Martin, A Darboux theorem for multi-symplectic manifolds. Seat. Math. Phys. 16 (2) (1988), 133–138. [96] E. Martínez, Lagrangian mechanics on Lie algebroids.Acta Appl. Math.67 (2001), no. 3, 295–320. [97] E. Martínez, Classical Field Theory on Lie Algebroids: Multisimplectic Formalism. arXiv:math/0411352 . [98] E. Martínez E, Geometric formulation of Mechanics on Lie algebroids. In Proceedings of the VIII Fall Workshop on Geometry and Physics, Medina del Campo, 1999, Publicaciones de la RSME, 2 (2001), 209-222. [99] E. Martínez, Classical field theory on Lie algebroids: variational aspects. J. Phys. A 38 (2005), no. 32, 7145–7160.
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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 389 and 390: Apéndice C Índice de símbolos En
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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,
Page 401 and 402: Bibliografía 383 [50] M.J. Gotay,
Page 403: Bibliografía 385 [75] M. de León,
Page 407 and 408: Bibliografía 389 [124] D. J. Saund
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Silvia Vilari˜no Fernández NUEVAS APORTACIONES AL ESTUDIO ...

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