Nash-Moser theory for standing water waves.
From MaRDI portal
Publication:5951855
DOI10.1007/s002050100147zbMath1033.76005MaRDI QIDQ5951855
John F. Toland, P. I. Plotnikov
Publication date: 18 March 2004
Published in: Archive for Rational Mechanics and Analysis (Search for Journal in Brave)
iterationexistencea priori boundsEuler equationsLagrangian descriptionperfect fluidfree boundaryparallel vertical wallssmall-amplitude standing waves
PDEs in connection with fluid mechanics (35Q35) Water waves, gravity waves; dispersion and scattering, nonlinear interaction (76B15)
Related Items
Small divisor problems in fluid mechanics ⋮ KAM for PDEs ⋮ Standing lattice wave patterns of a Boussinesq system ⋮ Reducibility of quantum harmonic oscillator on \(\mathbb{R}^d\) perturbed by a quasi: periodic potential with logarithmic decay ⋮ Long time stability of small finite gap solutions of the cubic nonlinear Schrödinger equation on \(\mathbb{T}^2\) ⋮ Recent advances on the global regularity for irrotational water waves ⋮ Existence and amplitude bounds for irrotational water waves in finite depth ⋮ Computation of three-dimensional standing water waves ⋮ Growth of Sobolev norms for abstract linear Schrödinger equations ⋮ Traveling quasi-periodic water waves with constant vorticity ⋮ Reducibility of 1D quantum harmonic oscillator with decaying conditions on the derivative of perturbation potentials ⋮ Reducibility of quantum harmonic oscillator on $\mathbb{R}^d$ with differential and quasi-periodic in time potential ⋮ Non-existence of small-amplitude doubly periodic waves for dispersive equations ⋮ Time quasi-periodic vortex patches of Euler equation in the plane ⋮ Quasi-Periodic Standing Wave Solutions of Gravity-Capillary Water Waves ⋮ Quasi-Periodic Traveling Waves on an Infinitely Deep Perfect Fluid Under Gravity ⋮ Pure gravity traveling quasi‐periodic water waves with constant vorticity ⋮ Spatially quasi-periodic bifurcations from periodic traveling water waves and a method for detecting bifurcations using signed singular values ⋮ Reducibility of 1-d Schrödinger equation with time quasiperiodic unbounded perturbations. I ⋮ Periodic solutions of fully nonlinear autonomous equations of Benjamin-Ono type ⋮ Reducibility of 1-d quantum harmonic oscillator equation with unbounded oscillation perturbations ⋮ Lagrangian motion of fluid particles in gravity-capillary standing waves ⋮ Standing waves on infinite depth. ⋮ Reducibility of 1-d Schrödinger equation with unbounded time quasiperiodic perturbations. III ⋮ Time quasi-periodic gravity water waves in finite depth ⋮ Quasi-periodic solutions for quasi-linear generalized KdV equations ⋮ Standing waves in near-parallel vortex filaments ⋮ Quasi-periodic water waves ⋮ Diamond shaped standing wave patterns of a two-dimensional Boussinesq system ⋮ Reducibility of 1-d Schrödinger equation with time quasiperiodic unbounded perturbations. II ⋮ Transverse instability of the line solitary water-waves ⋮ Standing waves for a two-way model system for water waves ⋮ Computation of time-periodic solutions of the Benjamin-Ono equation ⋮ Time quasi-periodic traveling gravity water waves in infinite depth ⋮ Harmonic stability of standing water waves ⋮ Weakly nonlinear gravity three-dimensional unbounded interfacial waves: perturbation method and variational formulation ⋮ Standing waves on an infinitely deep perfect fluid under gravity ⋮ Computing time-periodic solutions of a model for the vortex sheet with surface tension ⋮ Quasi-periodic travelling gravity–capillary waves ⋮ Gravity capillary standing water waves
This page was built for publication: Nash-Moser theory for standing water waves.
