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On the problem of stability for higher-order derivative Lagrangian systems

✍ Scribed by Enrico Pagani; Giampietro Tecchiolli; Sergio Zerbini

Publisher
Springer
Year
1987
Tongue
English
Weight
342 KB
Volume
14
Category
Article
ISSN
0377-9017

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✦ Synopsis

The problem of stability for dynamical systems whose Lagrangian function depends on the derivatives of a higher order than one is studied. The difficulty of this analysis arises from the indefiniteness of the Hamiltonian, so that the well-known Lagrange-Dirichlet theorem cannot be used and the methods of the canonical perturbation theory (KAM theory) must be employed. We show, with an example, that the indefiniteness of the energy does not forbid the stability.

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Exponential Stability of Solutions for H
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✍ Xiao Tijun; Liang Jin πŸ“‚ Article πŸ“… 1997 πŸ› Elsevier Science 🌐 English βš– 215 KB

This paper investigates the condition ensuring the exponential stability of solutions for the following higher order abstract Cauchy problem ny1 Β‘ Ε½ n. Ε½ i .