Gravity waves on water of variable depth
From MaRDI portal
Publication:5529400
DOI10.1017/S0022112066000892zbMath0149.45701MaRDI QIDQ5529400
Publication date: 1966
Published in: Journal of Fluid Mechanics (Search for Journal in Brave)
Related Items
Applicability of the Rayleigh hypothesis to real materials, Boundary-layer transition at high free-stream disturbance levels – beyond Klebanoff modes, Swimming speeds of filaments in nonlinearly viscoelastic fluids, On the order of the linear instability of a plasma, Instability of a Vortex Sheet Leaving a Semi‐Infinite Plate, Water waves in shallow channels of rapidly varying depth, The effects of a discontinuity in the forcing function of a singular integral equation, The runup of solitary waves, A higher-order Hele-Shaw approximation with application to gas flows through shallow micro-channels, The long range persistence of wakes behind a row of roughness elements, Free streamline flows with singularities, ACTION AND PERIOD OF HOMOCLINIC AND PERIODIC ORBITS FOR THE UNFOLDING OF A SADDLE-CENTER BIFURCATION, An integral formulation procedure for the solutions to Helmholtz's equation in spherically symmetric media, On the numerical simulation of the nonbreaking solitary waves run up on sloping beaches, On the shoreline boundary conditions for Boussinesq-type models, Run-up amplification of transient long waves, Propagation of long waves over water of slowly varying depth, Sudden twisting of a penny-shaped flaw in a certain non-homogeneous elastic medium, Nonlinear interaction of surface waves in a basin covered with broken ice, Algebraic/transcendental disturbance growth behind a row of roughness elements, Asymptotic expansions of the kontorovich—lebedev transform, On weak reflection of water waves, Run-up of solitary waves, The eigenvalue problem for infinite compact complex symmetric matrices with application to the numerical computation of complex zeros of \(J_ 0(z)- iJ_ 1(z)\) and of Bessel functions \(J_ m(z)\) of any real order \(m\), A comparison of two different types of shoreline boundary conditions
