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Green's functions for symmetric loading of an elastic sphere with application to contact problems
Accepted manuscript   Open access   Peer reviewed

Green's functions for symmetric loading of an elastic sphere with application to contact problems

Andrew N. Norris and Alexey S. Titovich
Journal of Mechanics of Materials and Structures, Vol.7(7), pp.701-719
2012
DOI:
https://doi.org/10.7282/T3Q52RBP

Abstract

Green’s function Sphere Contact
A compact form for the static Green’s function for symmetric loading of an elastic sphere is derived. The expression captures the singularity in closed form using standard functions and quickly convergent series. Applications to problems involving contact between elastic spheres are discussed. An exact solution for a point load on a sphere is presented and subsequently generalized for distributed loads. Examples for constant and Hertzian-type distributed loads are provided, where the latter is also compared to the Hertz contact theory for identical spheres. The results show that the form of the loading assumed in Hertz contact theory is valid for contact angles up to about 10 degrees. For larger angles, the actual displacement is smaller and the contact surface is no longer flat.
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Accepted Manuscript (AM) Open Access
url
http://dx.doi.org/10.2140/jomms.2012.7.701View
Version of Record (VoR) Journal of Mechanics of Materials and Structures
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