Add to ORKGIt was shown by V. E. Zakharov that the equations for water waves can be posed as a Hamiltonian dynamical system, and that the equilibrium solution is an elliptic stationary point. This talk will discuss two aspects of the water wave equations in this context. Firstly, we generalize the formulation of Zakharov to include overturning wave profiles, answering a question posed by T. Nishida. Secondly, we will discuss the question of Birkhoff normal forms for the water waves equations in the setting of spatially periodic solutions, including the function space mapping properties of these transformations.Non UBCUnreviewedAuthor affiliation: McMaster UniversityFacult
We consider the gravity-capillary water waves equations for a bi-dimensional fluid with a periodic o...
AbstractThis paper shows the use of consistent variational modelling to obtain and verify an accurat...
This paper is a study of the problem of nonlinear wave motion of the free surface of a body of uid ...
Consider a Hamiltonian PDE having an elliptic equilibrium at zero. Assuming a suitable condition on ...
: We consider the Birkhoff normal form for the water wave problem posed in a fluid of infinite depth...
We consider the gravity water waves system with a one-dimensional periodic interface in infinite dep...
We use a Hamiltonian normal form approach to study the dynamics of the water wave problem in the sma...
We consider the problem of extending to PDEs Birkhoff normal form theorem on Hamiltonian systems clo...
The time-dependent motion of water waves with a parametrically-defined free surface is mapped to a f...
We show that the governing equations for two-dimensional water waves with constant vorticity can be ...
An overview of a Hamiltonian framework for the description of nonlinear modulation of surface water ...
The subject of this paper is the dynamics of wave motion in the two-dimensional Kelvin-Helmholtz pro...
In these lectures we present an extension of Birkhoff normal form theorem to some Hamiltonian PDEs. ...
Includes bibliographical references (page 72)The system of equations describing incompressible invis...
This thesis is concerned with the water wave problem. Using local bifurcation we establish small-amp...
We consider the gravity-capillary water waves equations for a bi-dimensional fluid with a periodic o...
AbstractThis paper shows the use of consistent variational modelling to obtain and verify an accurat...
This paper is a study of the problem of nonlinear wave motion of the free surface of a body of uid ...
Consider a Hamiltonian PDE having an elliptic equilibrium at zero. Assuming a suitable condition on ...
: We consider the Birkhoff normal form for the water wave problem posed in a fluid of infinite depth...
We consider the gravity water waves system with a one-dimensional periodic interface in infinite dep...
We use a Hamiltonian normal form approach to study the dynamics of the water wave problem in the sma...
We consider the problem of extending to PDEs Birkhoff normal form theorem on Hamiltonian systems clo...
The time-dependent motion of water waves with a parametrically-defined free surface is mapped to a f...
We show that the governing equations for two-dimensional water waves with constant vorticity can be ...
An overview of a Hamiltonian framework for the description of nonlinear modulation of surface water ...
The subject of this paper is the dynamics of wave motion in the two-dimensional Kelvin-Helmholtz pro...
In these lectures we present an extension of Birkhoff normal form theorem to some Hamiltonian PDEs. ...
Includes bibliographical references (page 72)The system of equations describing incompressible invis...
This thesis is concerned with the water wave problem. Using local bifurcation we establish small-amp...
We consider the gravity-capillary water waves equations for a bi-dimensional fluid with a periodic o...
AbstractThis paper shows the use of consistent variational modelling to obtain and verify an accurat...
This paper is a study of the problem of nonlinear wave motion of the free surface of a body of uid ...