Linear instability for periodic orbits of non-autonomous Lagrangian systems

Порталури, Алессандро; Wu, Li; Yang, Ran

doi:10.48550/arxiv.1907.05864

2019

DOI: 10.48550/arxiv.1907.05864

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Linear instability for periodic orbits of non-autonomous Lagrangian systems

Алессандро Порталури¹,

Li Wu²,

Ran Yang³

Abstract: Inspired by the classical Poincaré criterion about the instability of orientation preserving minimizing closed geodesics on surfaces, we investigate the relation intertwining the instability and the variational properties of periodic solutions of a non-autonomous Lagrangian on a finite dimensional Riemannian manifold.We establish a general criterion for a priori detecting the linear instability of a periodic orbit on a Riemannian manifold for a (maybe not Legendre convex) non-autonomous Lagrangian simply by lo… Show more

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Cited by 2 publications

References 29 publications

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Sturm theory with applications in geometry and classical mechanics

Barutello

Offin

Порталури

et al. 2020

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Classical Sturm non-oscillation and comparison theorems as well as the Sturm theorem on zeros for solutions of second order differential equations have a natural symplectic version, since they describe the rotation of a line in the phase plane of the equation. In the higher dimensional symplectic version of these theorems, lines are replaced by Lagrangian subspaces and intersections with a given line are replaced by non-transversality instants with a distinguished Lagrangian subspace. Thus the symplectic Sturm theorems describe some properties of the Maslov index.Starting from the celebrated paper of Arnol'd on symplectic Sturm theory for optical Hamiltonians, we provide a generalization of his results to general Hamiltonians. We finally apply these results for detecting some geometrical information about the distribution of conjugate and focal points on semi-Riemannian manifolds and for studying the geometrical properties of the solutions space of singular Lagrangian systems arising in Celestial Mechanics.

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Sturm theory with applications in geometry and classical mechanics

Barutello

Offin

Порталури

et al. 2020

Preprint

View full text Add to dashboard Cite

show abstract

Spectral flow, Brouwer degree and Hill's determinant formula

Порталури¹,

Wu²

2020

Preprint

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In 2005 a new topological invariant defined in terms of the Brouwer degree of a determinant map, was introduced by Musso, Pejsachowicz and the first name author for counting the conjugate points along a semi-Riemannian geodesic. This invariant was defined in terms of a suspension of a complexified family of linear second order Dirichlet boundary value problems.In this paper, starting from this result, we generalize this invariant to a general self-adjoint Morse-Sturm system and we prove a new spectral flow formula. Finally we discuss the relation between this spectral flow formula and the Hill's determinant formula and we apply this invariant for detecting instability of periodic orbits of a Hamiltonian system.

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Linear instability for periodic orbits of non-autonomous Lagrangian systems

Cited by 2 publications

References 29 publications

Sturm theory with applications in geometry and classical mechanics

Sturm theory with applications in geometry and classical mechanics

Spectral flow, Brouwer degree and Hill's determinant formula

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