Conditions for strong ellipticity and M-eigenvalues |
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| Authors: | Liqun Qi Hui-Hui Dai Deren Han |
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| Affiliation: | 1. Department of Applied Mathematics, The Hong Kong Polytechnic University, Hong Kong, China; 2. Department of Mathematics, The City University of Hong Kong, Hong Kong, China; 3. School of Mathematics and Computer Sciences, Nanjing Normal University, Nanjing 210097, China |
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| Abstract: | The strong ellipticity condition plays an important role in nonlinear elasticity and in materials. In this paper, we define M-eigenvalues for an elasticity tensor. The strong ellipticity condition holds if and only if the smallest M-eigenvalue of the elasticity tensor is positive. If the strong ellipticity condition holds, then the elasticity tensor is rank-one positive definite. The elasticity tensor is rank-one positive definite if and only if the smallest Z-eigenvalue of the elasticity tensor is positive. A Z-eigenvalue of the elasticity tensor is an M-eigenvalue but not vice versa. If the elasticity tensor is second-order positive definite, then the strong ellipticity condition holds. The converse conclusion is not right. Computational methods for finding M-eigenvalues are presented. |
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| Keywords: | Elasticity tensor strong ellipticity M-eigenvalue Z-eigenvalue |
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