Morini, Lorenzo and Radi, Enrico and Movchan, Alexander and Movchan, Natalia Stroh formalism in analysis of skew-symmetric and symmetric weight functions for interfacial cracks. Working Paper arXiv (Submitted)
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Abstract
The focus of the article is on analysis of skew-symmetric weight matrix functions for interfacial cracks in two dimensional anisotropic solids. It is shown that the Stroh formalism proves to be an efficient approach to this challenging task. Conventionally, the weight functions, both symmetric and skew-symmetric, can be identified as a non-trivial singular solutions of the homogeneous boundary value problem for a solid with a crack. For a semi-infinite crack, the problem can be reduced to solving a matrix Wiener-Hopf functional equation. Instead, the Stroh matrix representation of displacements and tractions, combined with a Riemann-Hilbert formulation, is used to obtain an algebraic eigenvalue problem, that is solved in a closed form. The proposed general method is applied to the case of a quasi-static semi-infinite crack propagation between two dissimilar orthotropic media: explicit expressions for the weight matrix functions are evaluated and then used in the computation of complex stress intensity factor corresponding to an asymmetric load acting on the crack faces.
| Item Type: | Working Paper (Working Paper) |
|---|---|
| Subjects: | T Technology > T Technology (General) T Technology > TA Engineering (General). Civil engineering (General) T Technology > TH Building construction |
| Research Area: | Computer Science and Applications |
| Depositing User: | Caterina Tangheroni |
| Date Deposited: | 14 Mar 2016 14:19 |
| Last Modified: | 14 Mar 2016 14:19 |
| URI: | http://eprints.imtlucca.it/id/eprint/3228 |
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- Stroh formalism in analysis of skew-symmetric and symmetric weight functions for interfacial cracks. (deposited 14 Mar 2016 14:19) [Currently Displayed]
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