Higher-order Lagrangian systems: Geometric structures, dynamics, and constraints

Gràcia, Xavier; Pons, Josep M.; Román‐Roy, Narciso

doi:10.1063/1.529066

Cited by 58 publications

(58 citation statements)

References 33 publications

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“…[39,41] and citations therein). In passing, we should mention that the currently popular Hamilton-Jacobi [47] and Legendre-Ostrogradskiȋ [48] approaches for a treatment of constrained systems, though highly convenient in certain cases (e.g., in higher-order Lagrangian systems), have not found as yet any particular utility in the present context.…”

Section: Discussionmentioning

confidence: 99%

Path-integral approach to ’t Hooft’s derivation of quantum physics from classical physics

2005

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Section: Discussionmentioning

confidence: 99%

Path-integral approach to ’t Hooft’s derivation of quantum physics from classical physics

2005

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“…However, it is notable that in the standard approach, the Hamiltonian approach with higherorder derivatives has been formulated by Ostrogradiski [38] and discussed in many papers [39][40][41][42][43][44]. In Ostrogradiski's approach, the Hamiltonian is defined by H ¼ P n P m n À1 a n _ q ða n Þ n p n;a n À Lðq n ; _ q n ;...;q ðm n Þ n Þ;m n !1;n ¼ 1;2;... where p n;a n obeys the recursion formula p n;i nÀ1 ¼ oL .…”

Section: Exponential Non-standard Lagrangians With Higherorder Derivamentioning

confidence: 99%

Non-Standard Lagrangians with Higher-Order Derivatives and the Hamiltonian Formalism

El-Nabulsi

2015

Proc. Natl. Acad. Sci., India, Sect. A Phys. Sci.

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“…Observe that relations (29), (30) and (31) arise because the commutativity of diagram (32) demands it.…”

Section: Let ∇ K Be An Extended Connection Operator Associated Withmentioning

confidence: 99%

“…Most of these results have also been generalized for higher-order Lagrangian systems [10], [27], [30], [31], and for the case of more general types of singular differential equations on manifolds (implicit systems of equations) [25]. Finally, although a covariant description of this operator was not available, it has also been used to study several characteristics of some physical models in field theory, namely the bosonic string [1], [2], [26].…”

Section: Introductionmentioning

confidence: 99%

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Echeverría-Enríquez¹,

Marín-Solano²,

Muñoz-Lecanda³

et al. 2003

Acta Applicandae Mathematicae

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The "time-evolution K-operator" (or "relative Hamiltonian vector field") in mechanics is a powerful tool which can be geometrically defined as a vector field along the Legendre map. It has been extensively used by several authors for studying the structure and properties of the dynamical systems (mainly the non-regular ones), such as the relation between the Lagrangian and Hamiltonian formalisms, constraints, and higher-order mechanics.This paper is devoted to defining a generalization of this operator for field theories, in a covariant formulation. In order to do this, we use sections along maps, in particular multivector fields (skew-symmetric contravariant tensor fields of order greater than 1), jet fields and connection forms along the Legendre map. As a relevant result, we use these geometrical objects to obtain the solutions of the Lagrangian and Hamiltonian field equations, and the equivalence among them (specially for non-regular field theories).

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Higher-order Lagrangian systems: Geometric structures, dynamics, and constraints

Cited by 58 publications

References 33 publications

Path-integral approach to ’t Hooft’s derivation of quantum physics from classical physics

Path-integral approach to ’t Hooft’s derivation of quantum physics from classical physics

Non-Standard Lagrangians with Higher-Order Derivatives and the Hamiltonian Formalism

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