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Shapes of worn stones

Published online by Cambridge University Press:  26 February 2010

William J. Firey
Affiliation:
Oregon State University, Corvallis, Oregon 97331
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Often stones on beaches pounded by waves wear into quite smooth, regular shapes, sometimes apparently ellipsoidal and even spherical [8]. This paper begins with an idealization of this wearing process for materials isotropic with respect to wear, then develops an equation governing the idealized process, and goes on to show that a stone which is initially convex and centrally symmetric tends to assume a spherical shape as a consequence of the governing equation. This conclusion is predicated on the assumption that the mathematical conditions describing the wearing process are those of a well-posed problem.

Type
Research Article
Copyright
Copyright © University College London 1974

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References

1.Archard, J. F. and Hirst, W.. “The wear of metals under unlubricated conditions”, Proc. Roy Soc. London, Ser. A, 236 (1956), 397410.Google Scholar
2.Blaschke, W.. “Über affine Geometrie VII; Neue Extremeigenschaften von Ellipse und Ellipsoid”, S.-B. Sächs. Akad. Wiss. Leipzig Math.-Natur. Kl., 69 (1917), 306318.Google Scholar
3.Bonnesen, T. and Fenchel, W.. Theorie der konvexen Körper (Berlin 1934).Google Scholar
4.Busemann, H.. Convex Surfaces (New York 1958).Google Scholar
5.Fenchel, W. and Jessen, B.. “Mengenfunktionen und konvexen Körper”, Det Kgl. Danske Videnskab. Selskab, Mat.-fys. Medd., 16 (1938), 3.Google Scholar
6.Grünbaum, B.. Convex Polytopes (New York 1967).Google Scholar
7.Marcus, M. and Minc, H.. A Survey of Matrix Theory and Matrix Inequalities (Boston 1964).Google Scholar
8.Reynolds, G.. “Two weeks on the west coast”, Pacific Yachting, 6, No. 3 (Mar. 1973), 2630.Google Scholar
9.Santaló, L. A.. “Un invariante afln para los cuerpos convexos del espacio de n dimensionas”, Portugaliae Math., 8 (1949), 155161.Google Scholar
10.Walter, W.. Differential-und Integralungleichungen (Berlin, Göttingen, Heidelberg, New York 1964).Google Scholar