On the weak viscous effect of the reflection and transmission over an arbitrary topography

Abstract: In this article, monochromatic viscous waves propagating over an arbitrary topography are studied, specifically the effect of bottom sliding coefficient and molecular viscosity. In the theoretical formulation, the perturbation approximation is directly applied to the Navier-Stokes equation and boundary conditions which are specified to correspond to realistic situations. Furthermore, the arbitrary topography is approximated using successive shelves separated by abrupt steps. On each shelf, the solution is repr… Show more

“…Subsequently, it can be found that Equations ( 30), ( 33), ( 34), (37), and (38) are 2M(N+1) linear equations, that can be used to solve the 2M(N+1) unknowns, A m,n and B m,n . Furthermore, Equations ( 37) and ( 38) can be reduced to the original equations of EMM for normal water-wave-scattering without structures where α = 0 and d m = 0 [28,35].…”

Bragg Reflections of Oblique Water Waves by Periodic Surface-Piercing and Submerged Breakwaters

“…Subsequently, it can be found that Equations ( 30), ( 33), ( 34), (37), and (38) are 2M(N+1) linear equations, that can be used to solve the 2M(N+1) unknowns, A m,n and B m,n . Furthermore, Equations ( 37) and ( 38) can be reduced to the original equations of EMM for normal water-wave-scattering without structures where α = 0 and d m = 0 [28,35].…”

Bragg Reflections of Oblique Water Waves by Periodic Surface-Piercing and Submerged Breakwaters

Flexural-gravity wave interaction with undulating bottom topography in the presence of uniform current: An asymptotic approach

A coupled-mode study on weakly viscous Bragg scattering of surface gravity waves