Invariant Manifolds and Dispersive Hamiltonian Evolution Equations
Title | Invariant Manifolds and Dispersive Hamiltonian Evolution Equations PDF eBook |
Author | Kenji Nakanishi |
Publisher | European Mathematical Society |
Pages | 264 |
Release | 2011 |
Genre | Hamiltonian systems |
ISBN | 9783037190951 |
The notion of an invariant manifold arises naturally in the asymptotic stability analysis of stationary or standing wave solutions of unstable dispersive Hamiltonian evolution equations such as the focusing semilinear Klein-Gordon and Schrodinger equations. This is due to the fact that the linearized operators about such special solutions typically exhibit negative eigenvalues (a single one for the ground state), which lead to exponential instability of the linearized flow and allows for ideas from hyperbolic dynamics to enter. One of the main results proved here for energy subcritical equations is that the center-stable manifold associated with the ground state appears as a hyper-surface which separates a region of finite-time blowup in forward time from one which exhibits global existence and scattering to zero in forward time. The authors' entire analysis takes place in the energy topology, and the conserved energy can exceed the ground state energy only by a small amount. This monograph is based on recent research by the authors. The proofs rely on an interplay between the variational structure of the ground states and the nonlinear hyperbolic dynamics near these states. A key element in the proof is a virial-type argument excluding almost homoclinic orbits originating near the ground states, and returning to them, possibly after a long excursion. These lectures are suitable for graduate students and researchers in partial differential equations and mathematical physics. For the cubic Klein-Gordon equation in three dimensions all details are provided, including the derivation of Strichartz estimates for the free equation and the concentration-compactness argument leading to scattering due to Kenig and Merle.
Attractors of Hamiltonian Nonlinear Partial Differential Equations
Title | Attractors of Hamiltonian Nonlinear Partial Differential Equations PDF eBook |
Author | Alexander Komech |
Publisher | Cambridge University Press |
Pages | |
Release | 2021-09-30 |
Genre | Mathematics |
ISBN | 100903605X |
This monograph is the first to present the theory of global attractors of Hamiltonian partial differential equations. A particular focus is placed on the results obtained in the last three decades, with chapters on the global attraction to stationary states, to solitons, and to stationary orbits. The text includes many physically relevant examples and will be of interest to graduate students and researchers in both mathematics and physics. The proofs involve novel applications of methods of harmonic analysis, including Tauberian theorems, Titchmarsh's convolution theorem, and the theory of quasimeasures. As well as the underlying theory, the authors discuss the results of numerical simulations and formulate open problems to prompt further research.
PDE Dynamics
Title | PDE Dynamics PDF eBook |
Author | Christian Kuehn |
Publisher | SIAM |
Pages | 260 |
Release | 2019-04-10 |
Genre | Mathematics |
ISBN | 1611975654 |
This book provides an overview of the myriad methods for applying dynamical systems techniques to PDEs and highlights the impact of PDE methods on dynamical systems. Also included are many nonlinear evolution equations, which have been benchmark models across the sciences, and examples and techniques to strengthen preparation for research. PDE Dynamics: An Introduction is intended for senior undergraduate students, beginning graduate students, and researchers in applied mathematics, theoretical physics, and adjacent disciplines. Structured as a textbook or seminar reference, it can be used in courses titled Dynamics of PDEs, PDEs 2, Dynamical Systems 2, Evolution Equations, or Infinite-Dimensional Dynamics.
Geometric Numerical Integration and Schrödinger Equations
Title | Geometric Numerical Integration and Schrödinger Equations PDF eBook |
Author | Erwan Faou |
Publisher | European Mathematical Society |
Pages | 152 |
Release | 2012 |
Genre | Mathematics |
ISBN | 9783037191002 |
The goal of geometric numerical integration is the simulation of evolution equations possessing geometric properties over long periods of time. Of particular importance are Hamiltonian partial differential equations typically arising in application fields such as quantum mechanics or wave propagation phenomena. They exhibit many important dynamical features such as energy preservation and conservation of adiabatic invariants over long periods of time. In this setting, a natural question is how and to which extent the reproduction of such long-time qualitative behavior can be ensured by numerical schemes. Starting from numerical examples, these notes provide a detailed analysis of the Schrodinger equation in a simple setting (periodic boundary conditions, polynomial nonlinearities) approximated by symplectic splitting methods. Analysis of stability and instability phenomena induced by space and time discretization are given, and rigorous mathematical explanations are provided for them. The book grew out of a graduate-level course and is of interest to researchers and students seeking an introduction to the subject matter.
XVIIth International Congress on Mathematical Physics
Title | XVIIth International Congress on Mathematical Physics PDF eBook |
Author | Arne Jensen |
Publisher | World Scientific |
Pages | 743 |
Release | 2014 |
Genre | Science |
ISBN | 9814449245 |
This is an in-depth study of not just about Tan Kah-kee, but also the making of a legend through his deeds, self-sacrifices, fortitude and foresight. This revised edition sheds new light on his political agonies in Mao's China over campaigns against capitalists and intellectuals.
Strichartz Estimates for Wave Equations with Charge Transfer Hamiltonians
Title | Strichartz Estimates for Wave Equations with Charge Transfer Hamiltonians PDF eBook |
Author | Gong Chen |
Publisher | American Mathematical Society |
Pages | 84 |
Release | 2021-12-09 |
Genre | Mathematics |
ISBN | 1470449749 |
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Type II blow up solutions with optimal stability properties for the critical focussing nonlinear wave equation on $mathbb {R}^{3+1}$
Title | Type II blow up solutions with optimal stability properties for the critical focussing nonlinear wave equation on $mathbb {R}^{3+1}$ PDF eBook |
Author | Stefano Burzio |
Publisher | American Mathematical Society |
Pages | 88 |
Release | 2022-07-18 |
Genre | Mathematics |
ISBN | 1470453460 |
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