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Mathematical Model of a Marine Hose-String at a Buoy Part 2 — Dynamic Problem

  • M. J. Brown
Part of the Lecture Notes on Coastal and Estuarine Studies book series (COASTAL, volume 12)

Abstract

In Chapter 13, a mathematical model was presented for predicting the stresses in a static hose-string. The model presented there and in Brown (1982) was extended by Brown (1983) to obtain a mathematical model of a hose-string attached to a dynamic buoy, such that the stresses due to the hose parameters could be investigated independently from any stresses caused by wave-motion. The model is further extended in this paper to show that the effects arising from wave-motion can be studied.

Keywords

Wave Profile Extra Reinforcement Central Difference Approximation Maximum Maximum Steel Flange 
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.

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References

  1. Bishop, R.E.D. and Johnson, I., 1960. The mechanics of vibration. Cambridge University Press, pp 282–284.Google Scholar
  2. Brown, M.J., 1982. Analysis of the stresses on a floating hose, Part 1 — Attached to a static buoy. University of Leeds, report for Dunlop Oil and Marine.Google Scholar
  3. Brown, M.J., 1983. Analysis of the stresses on a floating hose, Part 2 — Attached to a dynamic buoy. University of Leeds, report for Dunlop Oil and Marine.Google Scholar
  4. Dunlop Oil and Marine Division, England, 1971. Offhsore hose manual.Google Scholar
  5. Dunlop Oil and Marine Division, 1973. A study of forces acting on a monobuoy due to environmental conditionsGoogle Scholar
  6. Ghose, P.K., 1981. A numerical method for non-linear transient analysis of oil carrying offshore hose. University of Newcastle upon Tyne, report for the SRC Marine Technology Program.Google Scholar
  7. Graham, H., 1982. Newcastle model hose tests. Report for Dunlop Oil and Marine DivisionGoogle Scholar
  8. Kinsman, B., 1965. Wind waves their generation and propogation on the ocean surface. Prentice-Hall, p 295.Google Scholar

Copyright information

© Springer-Verlag New York, Inc. 1985

Authors and Affiliations

  • M. J. Brown
    • 1
  1. 1.Department of Applied Mathematical StudiesThe University of LeedsLeeds, West YorkshireUK

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