Hamiltonian formulation of a class of constrained fourth-order differential equations in the Ostrogradsky framework
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Author
Date
2018-12-19Type
- Journal Article
ETH Bibliography
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Abstract
We consider a class of Lagrangians that depend not only on some configurational variables and their first time derivatives, but also on second time derivatives, thereby leading to fourth-order evolution equations. The proposed higher-order Lagrangians are obtained by expressing the variables of standard Lagrangians in terms of more basic variables and their time derivatives. The Hamiltonian formulation of the proposed class of models is obtained by means of the Ostrogradsky formalism. The structure of the Hamiltonians for this particular class of models is such that constraints can be introduced in a natural way for eliminating expected instabilities of the fourth-order evolution equations. Moreover, canonical quantization of the constrained equations can be achieved by means of Dirac's approach to generalized Hamiltonian dynamics. Show more
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https://doi.org/10.3929/ethz-b-000313159Publication status
publishedExternal links
Journal / series
Journal of Physics CommunicationsVolume
Pages / Article No.
Publisher
IOP PublishingSubject
Classical mechanics; Classical field theory; Hamiltonian formulation of fourth-order equations; Stability; Constraints; Ostrogradsky formalism; Higher derivative theoriesOrganisational unit
03359 - Oettinger, Christian (emeritus) / Oettinger, Christian (emeritus)
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ETH Bibliography
yes
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