Numerical simulations of the quasi-stationary stage of ripple excitation by steep gravity–capillary waves
From MaRDI portal
Publication:3352699
DOI10.1017/S0022112091000812zbMath0728.76018OpenAlexW2021238486MaRDI QIDQ3352699
K. D. Ruvinsky, G. I. Freidman, F. I. Feldstein
Publication date: 1991
Published in: Journal of Fluid Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1017/s0022112091000812
Related Items
Gravity capillary waves generated by a moving pressure distribution in the presence of constant vorticity and dissipation ⋮ Reconciling different formulations of viscous water waves and their mass conservation ⋮ Study of the parametric oscillator driven by narrow-band noise to model the response of a fluid surface to time-dependent accelerations ⋮ Analytic calculation of two-dimensional linear viscous gravity-capillary waves on deep water generated by a moving forcing at non-critical conditions: wave patterns and spatial decay rate ⋮ Free-surface wave damping due to viscosity and surfactants. ⋮ Interfaces in incompressible flows ⋮ Well-posedness of water wave model with viscous effects ⋮ Derivation of dissipative Boussinesq equations using the Dirichlet-to-Neumann operator approach ⋮ On the physical mechanism of front–back asymmetry of non-breaking gravity–capillary waves ⋮ On an eddy viscosity model for energetic deep-water surface gravity wave breaking ⋮ Nonlinear interactions between a free-surface flow with surface tension and a submerged cylinder ⋮ Theory of weakly damped free-surface flows: a new formulation based on potential flow solutions ⋮ Evaluation of an eddy viscosity type wave breaking model for intermediate water depths ⋮ Energy dissipation in two-dimensional unsteady plunging breakers and an eddy viscosity model ⋮ Generation of two-dimensional steep water waves on finite depth with and without wind ⋮ Models for Damped Water Waves ⋮ Numerical investigation of meniscus deformation and flow in an isothermal liquid bridge subject to high-frequency vibrations under zero gravity conditions. ⋮ The velocity and vorticity fields beneath gravity-capillary waves exhibiting parasitic ripples
Cites Work
- Three-dimensional instabilities of nonlinear gravity-capillary waves
- Numerical calculations of steady gravity-capillary waves using an integro-differential formulation
- Numerical solution of the exact equations for capillary–gravity waves
- Steady Gravity-Capillary Waves On Deep Water-1. Weakly Nonlinear Waves
- Some effects of surface tension on steep water waves. Part 2
- Steady Gravity-Capillary Waves on Deep Water-II. Numerical Results for Finite Amplitude
- Some effects of surface tension on steep water waves. Part 3
- Statistical properties of water waves. Part 1. Steady-state distribution of wind-driven gravity-capillary waves
- The instabilities of gravity waves of finite amplitude in deep water I. Superharmonics
- The instabilities of gravity waves of finite amplitude in deep water II. Subharmonics
- The theory of symmetrical gravity waves of finite amplitude. I
