Small Divisor Problem in the Theory of Three-Dimensional Water Gravity Waves

Small Divisor Problem in the Theory of Three-Dimensional Water Gravity Waves
Author :
Publisher : American Mathematical Soc.
Total Pages : 144
Release :
ISBN-10 : 9780821843826
ISBN-13 : 0821843826
Rating : 4/5 (26 Downloads)

Book Synopsis Small Divisor Problem in the Theory of Three-Dimensional Water Gravity Waves by : GŽrard Iooss

Download or read book Small Divisor Problem in the Theory of Three-Dimensional Water Gravity Waves written by GŽrard Iooss and published by American Mathematical Soc.. This book was released on 2009-06-05 with total page 144 pages. Available in PDF, EPUB and Kindle. Book excerpt: The authors consider doubly-periodic travelling waves at the surface of an infinitely deep perfect fluid, only subjected to gravity $g$ and resulting from the nonlinear interaction of two simply periodic travelling waves making an angle $2\theta$ between them. Denoting by $\mu =gL/c^{2}$ the dimensionless bifurcation parameter ( $L$ is the wave length along the direction of the travelling wave and $c$ is the velocity of the wave), bifurcation occurs for $\mu = \cos \theta$. For non-resonant cases, we first give a large family of formal three-dimensional gravity travelling waves, in the form of an expansion in powers of the amplitudes of two basic travelling waves. ``Diamond waves'' are a particular case of such waves, when they are symmetric with respect to the direction of propagation. The main object of the paper is the proof of existence of such symmetric waves having the above mentioned asymptotic expansion. Due to the occurence of small divisors, the main difficulty is the inversion of the linearized operator at a non trivial point, for applying the Nash Moser theorem. This operator is the sum of a second order differentiation along a certain direction, and an integro-differential operator of first order, both depending periodically of coordinates. It is shown that for almost all angles $\theta$, the 3-dimensional travelling waves bifurcate for a set of ``good'' values of the bifurcation parameter having asymptotically a full measure near the bifurcation curve in the parameter plane $(\theta,\mu ).$


Small Divisor Problem in the Theory of Three-Dimensional Water Gravity Waves Related Books

Small Divisor Problem in the Theory of Three-Dimensional Water Gravity Waves
Language: en
Pages: 144
Authors: GŽrard Iooss
Categories: Science
Type: BOOK - Published: 2009-06-05 - Publisher: American Mathematical Soc.

DOWNLOAD EBOOK

The authors consider doubly-periodic travelling waves at the surface of an infinitely deep perfect fluid, only subjected to gravity $g$ and resulting from the n
Quasi-periodic Standing Wave Solutions of Gravity-Capillary Water Waves
Language: en
Pages: 171
Authors: Massimiliano Berti
Categories: Education
Type: BOOK - Published: 2020-04-03 - Publisher: American Mathematical Soc.

DOWNLOAD EBOOK

The authors prove the existence and the linear stability of small amplitude time quasi-periodic standing wave solutions (i.e. periodic and even in the space var
Almost Global Solutions of Capillary-Gravity Water Waves Equations on the Circle
Language: en
Pages: 276
Authors: Massimiliano Berti
Categories: Mathematics
Type: BOOK - Published: 2018-11-02 - Publisher: Springer

DOWNLOAD EBOOK

The goal of this monograph is to prove that any solution of the Cauchy problem for the capillary-gravity water waves equations, in one space dimension, with per
Free Boundary Problems in Fluid Dynamics
Language: en
Pages: 373
Authors: Albert Ai
Categories:
Type: BOOK - Published: - Publisher: Springer Nature

DOWNLOAD EBOOK

Quasi-Periodic Traveling Waves on an Infinitely Deep Perfect Fluid Under Gravity
Language: en
Pages: 170
Authors: Roberto Feola
Categories: Mathematics
Type: BOOK - Published: 2024-04-17 - Publisher: American Mathematical Society

DOWNLOAD EBOOK

View the abstract.