Hostname: page-component-78c5997874-fbnjt Total loading time: 0 Render date: 2024-11-12T23:54:09.906Z Has data issue: false hasContentIssue false
  • English
  • Français

Flexural-gravity waves in ice channel with a lead

Published online by Cambridge University Press:  28 June 2021

L.D. Zeng Open the ORCID record for L.D. Zeng [Opens in a new window] ,
A.A. Korobkin ,
B.Y. Ni  and
Y.Z. Xue
L.D. Zeng
Affiliation:
College of Shipbuilding Engineering, Harbin Engineering University, Harbin150001, PR China
A.A. Korobkin*
Affiliation:
School of Mathematics, University of East Anglia, NorwichNR4 7TJ, United Kingdom
B.Y. Ni
Affiliation:
College of Shipbuilding Engineering, Harbin Engineering University, Harbin150001, PR China
Y.Z. Xue
Affiliation:
College of Shipbuilding Engineering, Harbin Engineering University, Harbin150001, PR China
*
Email address for correspondence: a.korobkin@uea.ac.uk
Get access Rights & Permissions [Opens in a new window]

Abstract

The flexural-gravity symmetric waves propagating in an ice channel with a lead of open water in the ice cover are investigated within the linear theory of hydroelasticity. The ice sheets are modelled as either elastic or as rigid plates. Deflections of the elastic ice sheets are described by the linear elastic plate equation. The flexural-gravity waves propagating along the channel and their dispersion relations are obtained by the normal mode method. It is shown that the dispersion relations for elastic ice approach the dispersion relations for rigid ice as the rigidity of ice increases or the wavelength decreases. The region in the plane ice thickness/wavenumber, where the ice cover can be treated as rigid with a prescribed accuracy, is determined. The effects of the ice thickness and width of the lead on the phase speeds are studied to determine critical speeds of a vehicle moving along the channel. It is shown that wave modes have several critical speeds, which may merge for some parameters of the channel. The presence of the lead significantly changes the characteristics of waves in an ice channel. Short waves, which propagate in a channel fully covered with ice, weakly depend on gravity and the presence of water in the channel. However, short waves propagating in the same channel but with a lead of open water are gravity-dominated waves localised in the lead. We conclude that flexural-gravity waves in an ice channel with a lead are less pronounced than in the channel completely covered by ice.

JFM classification

Geophysical and Geological Flows: Ice sheets Waves/Free-surface Flows: Channel flow Waves/Free-surface Flows: Wave-structure interactions
Type
JFM Papers
Information
Journal of Fluid Mechanics , Volume 921 , 25 August 2021 , A10
Check for updates
Copyright
© The Author(s), 2021. Published by Cambridge University Press

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

REFERENCES

Batyaev, E.A. & Khabakhpasheva, T.I. 2015 Hydroelastic waves in a channel covered with a free ice sheet. Fluid Dyn. 50 (6), 775788.CrossRefGoogle Scholar
Beltaos, S. 2004 Wave-generated fractures in river ice covers. Cold Reg. Sci. Technol. 40 (3), 179191.CrossRefGoogle Scholar
Brocklehurst, P., Korobkin, A. & Parau, E.I. 2011 Hydroelastic wave diffraction by a vertical cylinder. Phil. Trans. R. Soc. A 369 (1947), 28322851.CrossRefGoogle ScholarPubMed
Chung, H. & Linton, C.M. 2005 Reflection and transmission of waves across a gap between two semi-infinite elastic plates on water. Q. J. Mech. Appl. Maths 58 (1), 115.CrossRefGoogle Scholar
Daly, S.F. 1993 Wave propagation in ice-covered channels. J. Hydraul. Engng 119 (8), 895910.CrossRefGoogle Scholar
Daly, S.F. 1995 Fracture of river ice covers by river waves. J. Cold Reg. Engng 9 (1), 4152.CrossRefGoogle Scholar
Dinvay, E., Kalisch, H. & Parau, E.I. 2019 Fully dispersive models for moving loads on ice sheets. J. Fluid Mech. 876, 122149.CrossRefGoogle Scholar
Eastham, M.S.P. 1970 Theory of Ordinary Differential Equations. Van Nostrand Reinhold.Google Scholar
Fuamba, M., Bouaanani, N. & Marche, C. 2007 Modeling of dam break wave propagation in a partially ice-covered channel. Adv. Water Resour. 30 (12), 24992510.CrossRefGoogle Scholar
Guyenne, P. & Parau, E.I. 2012 Computations of fully nonlinear hydroelastic solitary waves on deep water. J. Fluid Mech. 713, 307329.CrossRefGoogle Scholar
Guyenne, P. & Parau, E.I. 2017 Numerical study of solitary wave attenuation in a fragmented ice sheet. Phys. Rev. Fluids 2 (3), 034002.CrossRefGoogle Scholar
Korobkin, A.A., Khabakhpasheva, T.I. & Papin, A.A. 2014 Waves propagating along a channel with ice cover. Eur. J. Mech. (B/Fluids) 47, 166175.CrossRefGoogle Scholar
Marchenko, A. 1997 Resonance interactions of waves in an ice channel. J. Appl. Math. Mech. 61 (6), 931940.CrossRefGoogle Scholar
Marchenko, A. 1999 Parametric excitation of flexural-gravity edge waves in the fluid beneath an elastic ice sheet with a crack. Eur. J. Mech. (B/Fluids) 18 (3), 511525.CrossRefGoogle Scholar
Nzokou, F., Morse, B. & Quach-Thanh, T. 2009 River ice cover flexure by an incoming wave. Cold Reg. Sci. Technol. 55 (2), 230237.CrossRefGoogle Scholar
Nzokou, F., Morse, B., Robert, J.-L., Richard, M. & Tossou, E. 2011 Water wave transients in an ice-covered channel. Can. J. Civil Engng 38 (4), 404414.CrossRefGoogle Scholar
Parau, E.I. & Dias, F. 2002 Nonlinear effects in the response of a floating ice plate to a moving load. J. Fluid Mech. 460, 281305.CrossRefGoogle Scholar
Porter, R. 2018 Trapping of waves by thin floating ice floes. Q. J. Mech. Appl. Maths 71 (4), 463483.Google Scholar
Ren, K., Wu, G.X. & Li, Z.F. 2020 Hydroelastic waves propagating in an ice-covered channel. J. Fluid Mech. 886, A28.CrossRefGoogle Scholar
Shi, Y.Y., Li, Z.F. & Wu, G.X. 2019 Interaction of wave with multiple wide polynyas. Phys. Fluids 31 (6), 067111.Google Scholar
Shishmarev, K.A., Khabakhpasheva, T.I. & Korobkin, A.A. 2016 The response of ice cover to a load moving along a frozen channel. Appl. Ocean Res. 59, 313326.CrossRefGoogle Scholar
Squire, V.A. 2007 Of ocean waves and sea-ice revisited. Cold Reg. Sci. Technol. 49 (2), 110133.CrossRefGoogle Scholar
Squire, V.A. 2011 Past, present and impendent hydroelastic challenges in the polar and subpolar seas. Phil. Trans. R. Soc. A 369 (1947), 28132831.CrossRefGoogle ScholarPubMed
Timoshenko, S. & Young, D.H. 1955 Vibration Problems in Engineering, 3rd edn. D. van Nostrand company.Google Scholar
Wang, Z., Parau, E.I., Milewski, P.A. & Vanden-Broeck, J.-M. 2014 Numerical study of interfacial solitary waves propagating under an elastic sheet. Proc. Math. Phys. Engng 470 (2168), 20140111.Google ScholarPubMed
Williams, T.D. & Squire, V.A. 2006 Scattering of flexural–gravity waves at the boundaries between three floating sheets with applications. J. Fluid Mech. 569, 113140.CrossRefGoogle Scholar
Xia, X. & Shen, H.T. 2002 Nonlinear interaction of ice cover with shallow water waves in channels. J. Fluid Mech. 467, 259268.CrossRefGoogle Scholar