Allowing for Rotations about the Normal in Nonlinear Theories of Shells |
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| Authors: | Semenyuk N. P. Trach V. M. |
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| Affiliation: | (1) S. P. Timoshenko Institute of Mechanics, National Academy of Sciences of Ukraine, Kiev;(2) Ukrainian State University of Water Management and Natural Resources, Rivne, Ukraine |
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| Abstract: | Consideration is given to three versions of nonlinear strain–displacement relations in the case of small strains and moderately small angles of rotation: (i) relations that neglect rotations about the normal in conformity with the hypotheses of the Donnel–Mushtary–Vlasov theory; (ii) relations, derived from the elasticity equations using Novozhilov's tensor, that exactly allow for rotations; and (iii) relations, proposed by Sanders, that allow for rotations but neglect shear strains. These versions are compared by comparing the solutions of the stability problem for a corrugated cylindrical shell. It is established that the critical loads are close when rotations are allowed for exactly and when Sanders' technique is used |
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| Keywords: | nonlinear theory of shells rotation about the normal stability corrugated surface |
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