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  • 1
    Online Resource
    Online Resource
    The Geometry of Higher-Order Hamilton Spaces : Applications to Hamiltonian Mechanics (2003)
    Dordrecht : Springer Netherlands
    Details
    UID:
    b3kat_BV042415478
    Format: 1 Online-Ressource (XVI, 247 p)
    ISBN: 9789401000703 , 9789401039956
    Series Statement: Fundamental Theories of Physics, An International Book Series on The Fundamental Theories of Physics: Their Clarification, Development and Application 132
    Note: As is known, the Lagrange and Hamilton geometries have appeared relatively recently [76, 86]. Since 1980 these geometries have been intensively studied by mathematicians and physicists from Romania, Canada, Germany, Japan, Russia, Hungary, U.S.A. etc. Prestigious scientific meetings devoted to Lagrange and Hamilton geometries and their applications have been organized in the above mentioned countries and a number of books and monographs have been published by specialists in the field: R. Miron [94, 95], R. Miron and M. Anastasiei [99, 100], R. Miron, D. Hrimiuc, H. Shimada and S. Sabau [115], P.L. Antonelli, R. Ingarden and M. Matsumoto [7]. Finsler spaces, which form a subclass of the class of Lagrange spaces, have been the subject of some excellent books, for example by: M. Matsumoto [76], M. Abate and G. Patrizio [1], D. Bao, S.S. Chernand Z. Shen [17] and A. Bejancu and H.R. Farran [20]. Also, we would like to point out the monographs of M. , Crampin [34], O. Krupkova [72] and D. Opri~, I. Butulescu [125], D. Saunders [144], which contain pertinent applications in analytical mechanics and in the theory of partial differential equations. Applications in mechanics, cosmology, theoretical physics and biology can be found in the well known books of P.L. Antonelli and T. Zawstaniak [11], G.S. Asanov [14], S. Ikeda [59], M. de Leone and P. Rodrigues [73]. The importance of Lagrange and Hamilton geometries consists of the fact that variational problems for important Lagrangians or Hamiltonians have numerous applications in various fields, such as mathematics, the theory of dynamical systems, optimal control, biology, and economy. In this respect, P.L. Antonelli's remark is interesting: "There is now strong evidence that the symplectic geometry of Hamiltonian dynamical systems is deeply connected to Cartan geometry, the dual of Finsler geometry", (see V.I. Arnold, I.M. Gelfand and V.S. Retach [13]). , The above mentioned applications have also imposed the introduction x Radu Miron of the notions of higher order Lagrange spaces and, of course, higher order Hamilton spaces. The base manifolds of these spaces are bundles of accelerations of superior order. The methods used in the construction of these geometries are the natural extensions of the classical methods used in the edification of Lagrange and Hamilton geometries. These methods allow us to solve an old problem of differential geometry formulated by Bianchi and Bompiani [94] more than 100 years ago, namely the problem of prolongation of a Riemannian structure g defined on the base manifold M, to the tangent k bundle T M, k〉 1. By means of this solution of the previous problem, we can construct, for the first time, good examples of regular Lagrangians and Hamiltonians of higher order
    Language: English
    DOI: 10.1007/978-94-010-0070-3
    URL: Volltext
    URL: Volltext  (lizenzpflichtig)
    URL: lizenzpflichtig
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  • 2
    Online Resource
    Online Resource
    The Geometry of Higher-Order Hamilton Spaces : Applications to Hamiltonian Mechanics (2003)
    Dordrecht :Springer Netherlands :
    Details
    UID:
    almahu_9949199407302882
    Format: XVI, 247 p. , online resource.
    Edition: 1st ed. 2003.
    ISBN: 9789401000703
    Series Statement: Fundamental Theories of Physics, 132
    Note: 1 Geometry of the k-Tangent Bundle TkM -- 1.1 The Category of k-Accelerations Bundles -- 1.2 Liouville Vector Fields. k-Semisprays -- 1.3 Nonlinear Connections -- 1.4 The Dual Coefficients of a Nonlinear Connection -- 1.5 The Determination of a Nonlinear Connection -- 1.6 d-Tensor Fields. N-Linear Connections -- 1.7 Torsion and Curvature -- 2 Lagrange Spaces of Higher Order -- 2.1 Lagrangians of Order k -- 2.2 Variational Problem -- 2.3 Higher Order Energies -- 2.4 Jacobi-Ostrogradski Momenta -- 2.5 Higher Order Lagrange Spaces -- 2.6 Canonical Metrical N-Connections -- 2.7 Generalized Lagrange Spaces of Order k -- 3 Finsler Spaces of Order k -- 3.1 Spaces F(k)n -- 3.2 Cartan Nonlinear Connection in F(k)n -- 3.3 The Cartan Metrical N-Linear Connection -- 4 The Geometry of the Dual of k-Tangent Bundle -- 4.1 The Dual Bundle (T*k M, ?*k, M) -- 4.2 Vertical Distributions. Liouville Vector Fields -- 4.3 The Structures J and J* -- 4.4 Canonical Poisson Structures on T*kM -- 4.5 Homogeneity -- 5 The Variational Problem for the Hamiltonians of Order k -- 5.1 The Hamilton-Jacobi Equations -- 5.2 Zermelo Conditions -- 5.3 Higher Order Energies. Conservation of Energy ?k ?1(H) -- 5.4 The Jacobi-Ostrogradski Momenta -- 5.5 Nöther Type Theorems -- 6 Dual Semispray. Nonlinear Connections -- 6.1 Dual Semispray -- 6.2 Nonlinear Connections -- 6.3 The Dual Coefficients of the Nonlinear Connection N -- 6.4 The Determination of the Nonlinear Connection by a Dual k-Semispray -- 6.5 Lie Brackets. Exterior Differential -- 6.6 The Almost Product Structure ?. The Almost Contact Structure $$ \mathbb{F} $$ -- 6.7 The Riemannian Structure G on T*kM -- 6.8 The Riemannian Almost Contact Structure $$(\mathop \mathbb{G}\limits^ \vee ,\mathop \mathbb{F}\limits^ \vee )$$ -- 7 Linear Connections on the Manifold T*kM -- 7.1 The Algebra of Distinguished Tensor Fields -- 7.2 N-Linear Connections -- 7.3 The Torsion and Curvature of an N-Linear Connection -- 7.4 The Coefficients of a N-Linear Connection -- 7.5 The h-,??- and ?k-Covariant Derivatives in Local Adapted Basis -- 7.6 Ricci Identities. Local Expressions of d-Tensor of Curvature and Torsion. Bianchi Identities -- 7.7 Parallelism of the Vector Fields on the Manifold T*kM -- 7.8 Structure Equations of a N-Linear Connection -- 8 Hamilton Spaces of Order k ? 1 -- 8.1 The Spaces H(k)n -- 8.2 The k-Tangent Structure J and the Adjoint k-Tangent Structure J* -- 8.3 The Canonical Poisson Structure of the Hamilton Space H(k)n -- 8.4 Legendre Mapping Determined by a Lagrange Space L(k)n= (M, L) -- 8.5 Legendre Mapping Determined by a Hamilton Space of Order k -- 8.6 The Canonical Nonlinear Connection of the Space H(k)n -- 8.7 Canonical Metrical N-Linear Connection of the Space H(k)n -- 8.8 The Hamilton Space H(k)n of Electrodynamics -- 8.9 The Riemannian Almost Contact Structure Determined by the Hamilton Space H(k)n -- 9 Subspaces in Hamilton Spaces of Order k -- 9.1 Submanifolds $${T^{*k}}\mathop M\limits^ \vee$$ in the Manifold T*kM -- 9.2 Hamilton Subspaces $${{\mathop H\limits^ \vee} ^{(k)m}}$$ in H(k)n. Darboux Frames -- 9.3 Induced Nonlinear Connection -- 9.4 The Relative Covariant Derivative -- 9.5 The Gauss-Weingarten Formula -- 9.6 The Gauss-Codazzi Equations -- 10 The Cartan Spaces of Order k as Dual of Finsler Spaces of Order k -- 10.1 C(k)n-Spaces -- 10.2 Geometrical Properties of the Cartan Spaces of Order k -- 10.3 Canonical Presymplectic Structures, Variational Problem of the Space C(kn) -- 10.4 The Cartan Spaces C(k)n as Dual of Finsler Spaces F(k)n -- 10.5 Canonical Nonlinear Connection. N-Linear Connections -- 10.6 Parallelism of Vector Fields in Cartan Space C(kn) -- 10.7 Structure Equations of Metrical Canonical N-Connection -- 10.8 Riemannian Almost Contact Structure of the Space C(kn) -- 11 Generalized Hamilton and Cartan Spaces of Order k. Applications to Hamiltonian Relativistic Optics -- 11.1 The Space GH(kn) -- 11.2 Metrical N-Linear Connections -- 11.3 Hamiltonian Relativistic Optics -- 11.4 The Metrical Almost Contact Structure of the Space GH(kn) -- 11.5 Generalized Cartan Space of Order k -- References.
    In: Springer Nature eBook
    Additional Edition: Printed edition: ISBN 9789401039956
    Additional Edition: Printed edition: ISBN 9781402015748
    Additional Edition: Printed edition: ISBN 9789401000710
    Language: English
    DOI: 10.1007/978-94-010-0070-3
    URL: https://doi.org/10.1007/978-94-010-0070-3
    Library Location Call Number Volume/Issue/Year Availability
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    Online Resource
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    HU Berlin
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