Abstract
The problem of oblique wave (internal wave) propagation over a small deformation in a channel flow consisting of two layers was considered. The upper fluid was assumed to be bounded above by a rigid lid, which is an approximation for the free surface, and the lower one was bounded below by an impermeable bottom surface having a small deformation; the channel was unbounded in the horizontal directions. Assuming irrotational motion, the perturbation technique was employed to calculate the first-order corrections of the velocity potential in the two fluids by using Green’s integral theorem suitably with the introduction of appropriate Green’s functions. Those functions help in calculating the reflection and transmission coefficients in terms of integrals involving the shape function c(x) representing the bottom deformation. Three-dimensional linear water wave theory was utilized for formulating the relevant boundary value problem. Two special examples of bottom deformation were considered to validate the results. Consideration of a patch of sinusoidal ripples (having the same wave number) shows that the reflection coefficient is an oscillatory function of the ratio of twice the x-component of the wave number to the ripple wave number. When this ratio approaches one, the theory predicts a resonant interaction between the bed and the interface, and the reflection coefficient becomes a multiple of the number of ripples. High reflection of incident wave energy occurs if this number is large. Similar results were observed for a patch of sinusoidal ripples having different wave numbers. It was also observed that for small angles of incidence, the reflected energy is greater compared to other angles of incidence up to π / 4. These theoretical observations are supported by graphical results.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Bhatta DD, Debnath L (2006). Two layer transient water waves over a viscoelastic ocean bed. Journal of Applied Mathematics and Computing, 22, 133–147.
Chamberlain PG, Porter D (2005). Wave scattering in a two-layer fluid of varying depth. Journal of Fluid Mechanics, 524, 207–228.
Davies AG (1982). The reflection of wave energy by undulations of the sea bed. Dynamics of Atmosphere and Oceans, 6, 207–232.
Kassem SE (1986). Wave source potentials for two superposed fluids, each of finite depth. Mathematical Proceedings of Cambridge Philosophical Society, 100, 595–599.
Lamb H (1932). Hydrodynamics. 6th ed, Cambridge University Press, Cambridge, UK.
Linton CM, Cadby JR (2002). Scattering of oblique waves in a two-layer fluid. Journal of Fluid Mechanics, 461, 343–364.
Linton CM, McIver M (1995). The interaction of waves with horizontal cylinders in two-layer fluids. Journal of Fluid Mechanics, 304, 213–229.
Maity P, Mandal BN (2006). Scattering of oblique waves by bottom undulations in a two-layer fluid. Journal of Applied Mathematics and Computing, 22, 21–39.
Mandal BN, Basu U (1993). Diffraction of interface waves by a bottom deformation. Archives of Mechanics, 45(3), 271–277.
Mandal BN, Basu U (1996). Oblique interface-wave diffraction by a small bottom deformation in two superposed fluids. Archives of Mechanics, 19(2), 363–370.
Mei CC (1985). Resonant reflection of surface water waves by periodic sandbars. Journal Fluid Mechanics, 152, 315–335.
Miles JW (1981). Oblique surface wave diffraction by a cylindrical obstacle. Journal of Atmosphere and Oceans, 6, 121–123.
Mohapatra S, Bora SN (2009a). Water wave interaction with a sphere in a two-layer fluid flowing through a channel of finite depth. Archive of Applied Mechanics, 79, 725–740.
Mohapatra S, Bora SN (2009b). Scattering of internal waves in a two-layer fluid flowing through a channel with small undulations. Ocean Dynamics, 59, 615–625.
Mohapatra S, Bora SN (2011). Reflection and transmission of water waves in a two-layer fluid flowing through a channel with undulating bed. Zeitschrift fur Angewandte Mathematik und Mechanik, 91(1), 46–56.
Sturova IV (1994). Planar problem of hydrodynamic shaking of a submerged body in the presence of motion in a two-layered fluid. Journal Applied Mechanics and Technical Physics, 35, 670–679.
Sturova IV (1999). Problems of radiation and diffraction for a circular cylinder in a stratified fluid. Fluid Dynamics, 34, 521–533.
Author information
Authors and Affiliations
Corresponding author
Additional information
Smrutiranjan Mohapatra received his M.Sc. from Sambalpur University, India, and his PhD from the Indian Institute of Technology, Guwahati, India in 2009. He also worked as a post doctoral fellow at the Indian Institute of Science, Bangalore, India, prior to accepting his present position of Assistant Professor in the Department of Mathematics, Institute of Chemical Technology Mumbai, India. His main areas of interest are water wave scattering and two-layer fluid. He has approximately 10 research publications to his credit.
Swaroop Nandan Bora received his M.Sc. from the University of Delhi, India, and his PhD from Dalhousie University, Halifax, Canada, in Engineering Mathematics. He is an Associate Professor in the Department of Mathematics, Indian Institute of Technology, Guwahati, India. His research interests focus on water waves, flows through porous media, and special functions. He has 23 research publications to his credit and is involved in a number of sponsored projects.
Rights and permissions
About this article
Cite this article
Mohapatra, S., Bora, S.N. Oblique water wave scattering by bottom undulation in a two-layer fluid flowing through a channel. J. Marine. Sci. Appl. 11, 276–285 (2012). https://doi.org/10.1007/s11804-012-1133-2
Received:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11804-012-1133-2