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Moving loads on ice plates of finite thickness

Published online by Cambridge University Press:  26 April 2006

J. Strathdee ,
W. H. Robinson  and
E. M. Haines
J. Strathdee
Affiliation:
Physics and Engineering Laboratory, DSIR, Lower Hutt, New Zealand
W. H. Robinson
Affiliation:
Physics and Engineering Laboratory, DSIR, Lower Hutt, New Zealand
E. M. Haines
Affiliation:
Physics and Engineering Laboratory, DSIR, Lower Hutt, New Zealand
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Abstract

The response of a floating ice plate to a moving load is given in terms of a pair of Green's functions. General expressions for these Green's functions are derived for the case of an infinite isotropic plate of uniform thickness supported on a fluid base of uniform depth. The distributions of stress and strain in the vicinity of a concentrated load receive significant contributions from waves of length comparable with the plate thickness and their description necessitates an exact description of thickness effects. Circumstances in which the classical thin-plate theory can be recovered are discussed. The steady-state response to a uniformly moving load displays a so-called ‘critical’ behaviour for load velocities in the neighbourhood of a threshold value at which radiation commences. At the critical speed the amplitude is limited by dissipative forces in the ice plate. To describe this a simple viscoelastic term is included in our model. Calculations indicate that thin-plate theory is accurate to within 5% for distances greater than twenty times the ice thickness.

Type
Research Article
Information
Journal of Fluid Mechanics , Volume 226 , May 1991 , pp. 37 - 61
Copyright
© 1991 Cambridge University Press

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References

Aki, K. & Richakds, P. G., 1980 Quantitative Seismology, vol. 1, pp. 167182. San Francisco: W. H. Freeman and Co.
Bates, H. F. & Shapiro, L. H., 1981 Stress amplification under a moving load on floating ice. J. Geophys. Res. 86, 6638.Google Scholar
Beltaos, S.: 1981 Field studies on the response of floating ice sheets to moving loads. Can. J. Civil Engng 8, 1.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. 269.Google Scholar
Doronin, Yu. P. & Kheisin, D. E., 1977 Sea Ice, p. 156 (English transl.). Office of Polar Programmes and the National Science Foundation, Amerind, New Delhi.
Eyre, D.: 1977 The flexural motions of a floating ice sheet induced by moving vehicles. J. Glaciol. 19, 555.Google Scholar
Hosking, R. J., Sneyd, A. O. & Waugh, O. W., 1988 Viscoelastic response of a floating ice plate to a steadily moving load. J. Fluid Mech. 196, 409.Google Scholar
Jeffreys, H.: 1976 The Earth, p. 28. Cambridge University Press.
Kennett, B. L. N.: 1983 Seismic Wave Propagation in Stratified Media. Cambridge University Press.
Kerr, A. D.: 1976 The bearing capacity of floating ice plate subjected to static or quasistatic loads. J. Glacial. 17, 229.Google Scholar
Kerr, A. D.: 1983 The critical velocities of a load moving on a floating ice plate that is subjected to inplane forces. Cold Regions Sci. Tech. 5, 267.Google Scholar
Lighthill, M. J.: 1978 Waves in Fluids. Cambridge University Press.
Nevel, D. E.: 1970 Moving loads on a floating ice sheet. US Army CRREL Res. Rep. 261.Google Scholar
Schulkes, R. M. S. M., Hosking, R. J. & Sneyd, A. D., 1987 Waves due to a steadily moving source on a floating ice plate. Part 2. J. Fluid Mech. 180, 297.Google Scholar
Schulkes, R. M. S. M. & Sneyd, A. D. 1988 Time-dependent response of a floating ice-sheet to a steadily moving load. J. Fluid Mech. 186, 25.Google Scholar
Squire, V. A. & Allen, A. J., 1980 Propagation of flexural gravity waves in sea ice. In Sea Ice Processes and Models (ed. R. S. Pritchard), p. 237. University of Washington Press.
Squire, V. A., Robinson, W. H., Haskell, T. G. & Moore, S. C., 1985 Dynamic strain response of lake and sea ice to moving loads. Cold Regions Sci. Tech. 11, 123.Google Scholar
Squire, V. A., Robinson, W. H., Langhorne, P. J. & Haskell, T. G., 1988 Vehicles and aircraft on floating ice. Nature 333, 159.Google Scholar
Strathdee, J., Robinson, W. H. & Haines, E. M., 1989 Moving loads on ice plates of finite thickness. DSIR Physics and Engineering Laboratory Report.Google Scholar
Takizawa, T.: 1985 Deflection of a floating sea ice sheet induced by a moving load. Cold Regions Sci. Tech. 11, 171.Google Scholar
Takizawa, T.: 1988 Response of a floating sea ice sheet to a steadily moving load. J. Geophys. Res. 93, 5100.Google Scholar