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Fully dispersive models for moving loads on ice sheets

Published online by Cambridge University Press:  31 July 2019

E. Dinvay
Affiliation:
Department of Mathematics, University of Bergen, Postbox 7800, 5020 Bergen, Norway
H. Kalisch*
Affiliation:
Department of Mathematics, University of Bergen, Postbox 7800, 5020 Bergen, Norway
E. I. Părău
Affiliation:
School of Mathematics, University of East Anglia, Norwich Research Park, NorwichNR4 7TJ, UK
*
Email address for correspondence: [email protected]

Abstract

The response of a floating elastic plate to the motion of a moving load is studied using a fully dispersive weakly nonlinear system of equations. The system allows for an accurate description of waves across the whole spectrum of wavelengths and also incorporates nonlinearity, forcing and damping. The flexural–gravity waves described by the system are time-dependent responses to a forcing with a described weight distribution, moving at a time-dependent velocity. The model is versatile enough to allow the study of a wide range of situations including the motion of a combination of point loads and loads of arbitrary shape. Numerical solutions of the system are compared to data from a number of field campaigns on ice-covered lakes, and good agreement between the deflectometer records and the numerical simulations is observed in most cases. Consideration is also given to waves generated by a decelerating load, and it is shown that a decelerating load may trigger a wave response with a far greater amplitude than a load moving at constant celerity.

Type
JFM Papers
Copyright
© 2019 Cambridge University Press 

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References

Aceves-Sánchez, P., Minzoni, A. A. & Panayotaros, P. 2013 Numerical study of a nonlocal model for water-waves with variable depth. Wave Motion 50, 8093.Google Scholar
Babaei, H., Van der Sanden, J., Short, N. & Barrette, P. 2016 Lake ice cover deflection induced by moving vehicles: comparing theoretical results with satellite observations. In Proceedings of TAC 2016: Efficient Transportation-Managing the Demand-2016 Conference and Exhibition of the Transportation Association of Canada. Transport Association of Canada.Google Scholar
Beltaos, S. 1981 Field studies on the response of floating ice sheets to moving loads. Can. J. Civil Engng 8, 18.Google Scholar
Blyth, M. G. & Părău, E. I. 2016 The stability of capillary waves on fluid sheets. J. Fluid Mech. 804, 534.Google Scholar
Bonnefoy, F., Meylan, M. H. & Ferrant, P. 2009 Nonlinear higher-order spectral solution for a two-dimensional moving load on ice. J. Fluid Mech. 621 (2009), 215242.Google Scholar
Carter, J. D. 2018 Bidirectional Whitham equations as models of waves on shallow water. Wave Motion 82, 5161.Google Scholar
Craig, W. & Groves, M. D. 1994 Hamiltonian long-wave approximations to the water-wave problem. Wave Motion 19 (1994), 367389.Google Scholar
Craig, W., Guyenne, P. & Kalisch, H. 2005 Hamiltonian long-wave expansions for free surfaces and interfaces. Commun. Pure Appl. Maths 58, 15871641.Google Scholar
Craig, W. & Sulem, C. 1993 Numerical simulation of gravity waves. J. Comput. Phys. 108, 7383.Google Scholar
Davys, J. W., Hosking, R. J. & Sneyd, A. D. 1985 Waves due to a steadily moving source on a floating ice plate. J. Fluid Mech. 158, 269287.Google Scholar
Dinvay, E., Dutykh, D. & Kalisch, H. 2019 A comparative study of bi-directional Whitham systems. Appl. Numer. Maths 141, 248262.Google Scholar
Dinvay, E., Moldabayev, D., Dutykh, D. & Kalisch, H. 2017 The Whitham equation with surface tension. Nonlinear Dyn. 88, 11251138.Google Scholar
Ehrnström, M. & Kalisch, H. 2009 Traveling waves for the Whitham equation. Differ. Integral. Equ. 22, 11931210.Google Scholar
Ehrnström, M. & Kalisch, H. 2013 Global bifurcation for the Whitham equation. Math. Model. Natural Phenom. 8, 1330.Google Scholar
Goodman, D. J., Wadhams, P. & Squire, V. A. 1980 The flexural response of a tabular ice island to ocean swell. Ann. Glaciol. 1, 2327.Google Scholar
Guyenne, P. & Părău, E. I. 2012 Computations of fully-nonlinear hydroelastic solitary waves on deep water. J. Fluid Mech. 713, 307329.Google Scholar
Guyenne, P. & Părău, E. I. 2014a Finite-depth effects on solitary waves in a floating ice-sheet. J. Fluids Struct. 49, 242262.Google Scholar
Guyenne, P. & Părău, E. I. 2014b Forced and unforced flexural-gravity solitary waves. In Proc. IUTAM, vol. 11, pp. 4457. Elsevier.Google Scholar
Guyenne, P. & Părău, E. I. 2017 Numerical simulation of solitary-wave scattering and damping in fragmented sea ice. In Proceedings of the 27th International Ocean and Polar Engineering Conference (ISOPE 2017), pp. 373380. International Society of Offshore and Polar Engineers (ISOPE).Google Scholar
Hosking, R. J., Sneyd, A. D. & Waugh, D. W. 1988 Viscoelastic response of a floating ice plate to a steadily moving load. J. Fluid Mech. 196, 409430.Google Scholar
Hur, V. M. & Johnson, M. 2015a Modulational instability in the Whitham equation for water waves. Stud. Appl. Maths 134, 120143.Google Scholar
Hur, V. M. & Johnson, M. 2015b Modulational instability in the Whitham equation with surface tension and vorticity. Nonlinear Anal. 129, 104118.Google Scholar
Kheysin, D. Ye. 1963 Moving load on an elastic plate which floats on the surface of an ideal fluid. Izv. Akad Nauk USSR, Otd, Tekh. i Mashinostroenie 1, 178180 (in Russian).Google Scholar
Kheysin, D. Ye. 1971 Some unsteady-state problems in ice-cover dynamics. In Studies in Ice Physics and Ice Engineering (ed. Yakovlev, G. N.), pp. 6978. Israel Program for Scientific Translations.Google Scholar
Lannes, D. & Saut, J.-C. 2013 Remarks on the full dispersion Kadomtsev-Petviashvli equation. Kinet. Relat. Models 6, 9891009.Google Scholar
Liu, A. K. & Mollo-Christensen, E. 1988 Wave propagation in a solid ice pack. J. Phys. Oceanogr. 18, 17021712.Google Scholar
Madsen, P. A., Murray, R. & Sørensen, O. R. 1991 A new form of the Boussinesq equations with improved linear dispersion characteristics. Coast. Engng 15, 371388.Google Scholar
Marchenko, A. V. 1988 Long waves in shallow liquid under ice cover. Z. Angew Math. Mech. 52, 180183.Google Scholar
Marchenko, A. V. 2016 Damping of surface waves propagating below solid ice. In The 26th International Ocean and Polar Engineering Conference, ISOPE. International Society of Offshore and Polar Engineers (ISOPE).Google Scholar
Marko, J. R. 2003 Observations and analyses of an intense waves-in-ice event in the Sea of Okhotsk. J. Geophys. Res. 108 (C9), 3296.Google Scholar
Matiushina, A. A., Pogorelova, A. V. & Kozin, V. M. 2016 Effect of impact load on the ice cover during the landing of an airplane. Intl J. Offshore Polar Engng 26, 612.Google Scholar
Miles, J. & Sneyd, A. D. 2003 The response of a floating ice sheet to an accelerating line load. J. Fluid Mech. 497, 435439.Google Scholar
Milinazzo, F., Shinbrot, M. & Evans, N. W. 1995 A mathematical analysis of the steady response of floating ice to the uniform motion of a rectangular load. J. Fluid Mech. 287, 173197.Google Scholar
Moldabayev, D., Kalisch, H. & Dutykh, D. 2015 The Whitham equation as a model for surface water waves. Physica D 309, 99107.Google Scholar
Nevel, D. E.1970 Moving loads on a floating ice sheet. CRREL Res. Rep. 261, US Army Cold Regions Research and Engineering Laboratory, Hanover, NH, USA.Google Scholar
Nicholls, D. P. & Reitich, F. 2001 A new approach to analyticity of Dirichlet–Neumann operators. Proc. R. Soc. Edin. A 131, 14111433.Google Scholar
Nugroho, W. S., Wang, K., Hosking, R. J. & Milinazzo, F. 1999 Time-dependent response of a floating flexible plate to an impulsively started steadily moving load. J. Fluid Mech. 381, 337355.Google Scholar
Nwogu, O. 1993 Alternative form of Boussinesq equations for nearshore wave propagation. J. Waterway Port Coastal Ocean Engng 119, 618638.Google Scholar
Page, C. & Părău, E. I. 2014 Hydraulic falls under a floating ice plate due to submerged obstructions. J. Fluid Mech. 745, 208222.Google Scholar
Părău, E. I. & Vanden-Broeck, J.-M. 2011 Three-dimensional waves beneath an ice sheet due to a steadily moving pressure. Phil. Trans. R. Soc. Lond. A 369, 29732988.Google Scholar
Părău, E. I. & Dias, F. 2002 Nonlinear effects in the response of a floating ice plate to a moving load. J. Fluid Mech. 460, 281305.Google Scholar
Plotnikov, P. I. & Toland, J. F. 2011 Modelling nonlinear hydroelastic waves. Phil. Trans. R. Soc. Lond. A 369, 29422956.Google Scholar
Pogorelova, A. V. 2008 Wave resistance of an air-cushion vehicle in unsteady motion over an ice sheet. J. Appl. Mech. Tech. Phys. 49, 7179.Google Scholar
Sanford, N., Kodama, K., Carter, J. D. & Kalisch, H. 2014 Stability of traveling wave solutions to the Whitham equation. Phys. Lett. A 378, 21002107.Google Scholar
Schulkes, R. M. S. M. & Sneyd, A. D. 1988 Time-dependent response of floating ice to a steadily moving load. J. Fluid Mech. 186, 2546.Google Scholar
Squire, V. A., Robinson, W. H., Langhorne, P. J. & Haskell, T. G. 1988a Vehicles and aircraft on floating ice. Nature 333, 159161.Google Scholar
Squire, V. A., Hosking, R. J., Kerr, A. D. & Langhorne, P. J. 1988b Moving Loads on Ice Plates. Kluwer.Google Scholar
Takizawa, T. 1978 Deflection of a floating ice sheet subjected to a moving load II. Low Temp. Sci. A 37, 6978 (in Japanese).Google Scholar
Takizawa, T. 1985 Deflection of a floating sea ice sheet induced by a moving load. Cold Reg. Sci. Technol. 11, 171180.Google Scholar
Takizawa, T. 1987 Field studies on response of a floating sea ice sheet to a steadily moving load. Contrib. Inst. Low Temp. Sci. A 36, 3176.Google Scholar
Takizawa, T. 1988 Response of a floating sea ice sheet to a steadily moving load. J. Geophys. Res. 93, 51005112.Google Scholar
Van der Sanden, J. & Short, N. H. 2017 Radar satellites measure ice cover displacements induced by moving vehicles. Cold Reg. Sci. Technol. 133, 5662.Google Scholar
Vargas-Magana, R. M. & Panayotaros, P. 2016 A Whitham–Boussinesq long-wave model for variable topography. Wave Motion 65, 156174.Google Scholar
Wang, K., Hosking, R. J. & Milinazzo, F. 2004 Time-dependent response of a floating viscoelastic plate to an impulsively started moving load. J. Fluid Mech. 521, 295317.Google Scholar
Wei, G., Kirby, J. T., Grilli, S. T. & Subramanya, R. 1995 A fully nonlinear Boussinesq model for surface waves. Part 1. Highly nonlinear unsteady waves. J. Fluid Mech. 294, 7192.Google Scholar
Whitham, G. B. 1967 Variational methods and applications to water waves. Proc. R. Soc. Lond. A 299, 625.Google Scholar
Whitham, G. B. 1974 Linear and Nonlinear Waves. Wiley.Google Scholar
Wilson, J. T.1955 Coupling between moving loads and flexural waves in floating ice sheets. US Army SIPRE Report 34.Google Scholar
Xia, X. & Shen, H. T. 2002 Nonlinear interaction of ice cover with shallow water waves in channels. J. Fluid Mech. 467, 259268.Google Scholar