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Nonlinear Correction to the Euler Buckling Formula for Compressible Cylinders

Abstract:
Euler’s celebrated buckling formula gives the critical load N for the buckling of a slender cylindrical column with radius B and length L as N/(π 3B2)=(E/4)(B/L)2, where E is Young’s modulus. Its derivation relies on the assumptions that linear elasticity applies to this problem, and that the slenderness (B/L) is an infinitesimal quantity. Here we ask the following question: What is the first nonlinear correction in the right hand-side of this equation when terms up to (B/L)4 are kept? To answer this question, we specialize the exact solution of non-linear elasticity for the homogeneous compression of a thick cylinder with lubricated ends to the theory of third-order elasticity. In particular, we highlight the way second- and third-order constants —including Poisson’s ratio— all appear in the coefficient of (B/L)4.

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Publication date:
2010-01-01


UUID:
uuid:32ee034f-4594-401d-bd03-b18c2a50c916
Local pid:
oai:eprints.maths.ox.ac.uk:964
Deposit date:
2011-05-20
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