On the Splitting of Invariant Manifolds in Multidimensional Near-Integrable Hamiltonian Systems
Title | On the Splitting of Invariant Manifolds in Multidimensional Near-Integrable Hamiltonian Systems PDF eBook |
Author | U Haagerup |
Publisher | |
Pages | 162 |
Release | 2014-09-11 |
Genre | Hamiltonian systems |
ISBN | 9781470403737 |
Presents the problem of the splitting of invariant manifolds in multidimensional Hamiltonian systems, stressing the canonical features of the problem. This book offers introduction of a canonically invariant scheme for the computation of the splitting matrix.
On the Splitting of Invariant Manifolds in Multidimensional Near-integrable Hamiltonian Systems
Title | On the Splitting of Invariant Manifolds in Multidimensional Near-integrable Hamiltonian Systems PDF eBook |
Author | Pierre Lochak |
Publisher | American Mathematical Soc. |
Pages | 164 |
Release | 2003-03-21 |
Genre | Mathematics |
ISBN | 9780821864975 |
In this text we take up the problem of the splitting of invariant manifolds in multidimensional Hamiltonian systems, stressing the canonical features of the problem. We first conduct a geometric study, which for a large part is not restricted to the perturbative situation of near-integrable systems. This point of view allows us to clarify some previously obscure points, in particular the symmetry and variance properties of the splitting matrix (indeed its very definition(s)) and more generally the connection with symplectic geometry. Using symplectic normal forms, we then derive local exponential upper bounds for the splitting matrix in the perturbative analytic case, under fairly general circumstances covering in particular resonances of any multiplicity. The next technical input is the introduction of a canonically invariant scheme for the computation of the splitting matrix. It is based on the familiar Hamilton-Jacobi picture and thus again is symplectically invariant from the outset. It is applied here to a standard Hamiltonian exhibiting many of the important features of the problem and allows us to explore in a unified way the question of finding lower bounds for the splitting matrix, in particular that of justifying a first order computation (the so-called Poincare-Melnikov approximation). Although we do not specifically address the issue in this paper we mention that the problem of the splitting of the invariant manifold is well-known to be connected with the existence of a global instability in these multidimensional Hamiltonian systems and we hope the present study will ultimately help shed light on this important connection first noted and explored by V. I. Arnold.
On the Splitting of Invariant Manifolds in Multidimensional Near-Integrable Hamiltonian Systems
Title | On the Splitting of Invariant Manifolds in Multidimensional Near-Integrable Hamiltonian Systems PDF eBook |
Author | Pierre Lochak |
Publisher | American Mathematical Soc. |
Pages | 162 |
Release | 2003 |
Genre | Mathematics |
ISBN | 0821832689 |
Presents the problem of the splitting of invariant manifolds in multidimensional Hamiltonian systems, stressing the canonical features of the problem. This book offers introduction of a canonically invariant scheme for the computation of the splitting matrix.
Exponentially Small Splitting of Invariant Manifolds of Parabolic Points
Title | Exponentially Small Splitting of Invariant Manifolds of Parabolic Points PDF eBook |
Author | |
Publisher | American Mathematical Soc. |
Pages | 102 |
Release | |
Genre | |
ISBN | 0821834452 |
Measure and Capacity of Wandering Domains in Gevrey Near-Integrable Exact Symplectic Systems
Title | Measure and Capacity of Wandering Domains in Gevrey Near-Integrable Exact Symplectic Systems PDF eBook |
Author | Laurent Lazzarini |
Publisher | American Mathematical Soc. |
Pages | 106 |
Release | 2019-02-21 |
Genre | Domains of holomorphy |
ISBN | 147043492X |
A wandering domain for a diffeomorphism of is an open connected set such that for all . The authors endow with its usual exact symplectic structure. An integrable diffeomorphism, i.e., the time-one map of a Hamiltonian which depends only on the action variables, has no nonempty wandering domains. The aim of this paper is to estimate the size (measure and Gromov capacity) of wandering domains in the case of an exact symplectic perturbation of , in the analytic or Gevrey category. Upper estimates are related to Nekhoroshev theory; lower estimates are related to examples of Arnold diffusion. This is a contribution to the “quantitative Hamiltonian perturbation theory” initiated in previous works on the optimality of long term stability estimates and diffusion times; the emphasis here is on discrete systems because this is the natural setting to study wandering domains.
Proceedings Of The International Congress Of Mathematicians 2010 (Icm 2010) (In 4 Volumes) - Vol. I: Plenary Lectures And Ceremonies, Vols. Ii-iv: Invited Lectures
Title | Proceedings Of The International Congress Of Mathematicians 2010 (Icm 2010) (In 4 Volumes) - Vol. I: Plenary Lectures And Ceremonies, Vols. Ii-iv: Invited Lectures PDF eBook |
Author | Rajendra Bhatia |
Publisher | World Scientific |
Pages | 4137 |
Release | 2011-06-06 |
Genre | Mathematics |
ISBN | 9814462934 |
ICM 2010 proceedings comprises a four-volume set containing articles based on plenary lectures and invited section lectures, the Abel and Noether lectures, as well as contributions based on lectures delivered by the recipients of the Fields Medal, the Nevanlinna, and Chern Prizes. The first volume will also contain the speeches at the opening and closing ceremonies and other highlights of the Congress.
The Complete Dimension Theory of Partially Ordered Systems with Equivalence and Orthogonality
Title | The Complete Dimension Theory of Partially Ordered Systems with Equivalence and Orthogonality PDF eBook |
Author | K. R. Goodearl |
Publisher | American Mathematical Soc. |
Pages | 134 |
Release | 2005 |
Genre | Mathematics |
ISBN | 0821837168 |
Introduction Partial commutative monoids Continuous dimension scales Espaliers Classes of espaliers Bibliography Index