Stroh formalism in analysis of skew-symmetric and symmetric weight functions for interfacial cracks
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Publication:5137374
DOI10.1177/1081286512462299OpenAlexW2162311868MaRDI QIDQ5137374
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Publication date: 2 December 2020
Published in: Mathematics and Mechanics of Solids (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1202.5418
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Cites Work
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- Perturbation of mode III interfacial cracks
- On the problem of a pair of point forces applied to the faces of a semi- infinite plane crack
- Symmetric and skew-symmetric weight functions in 2D perturbation models for semi-infinite interfacial cracks
- Evaluation of the Lazarus-Leblond constants in the asymptotic model of the interfacial wavy crack
- Weight functions and fundamental fields for the penny-shaped and the half-plane crack in the three-space
- Interfacial crack-tip field in anisotropic elastic solids
- Fracture mechanics for piezoelectric ceramics
- Dynamic weight functions for a moving crack. I. Mode I loading
- Three-dimensional crack-face weight functions for the semi-infinite interface crack. I: Variation of the stress intensity factors due to some small perturbation of the crack front
- An exact solution of the 3-D problem of an interface semi-infinite plane crack
- High-order asymptotics and perturbation problems for 3D interfacial cracks
- Asymptotic Behaviour of the Elastic Solution near the Tip of a Crack Situated at a Nonideal Interface
- Dynamic steady-state crack propagation in quasi-crystals
- Singularities, interfaces and cracks in dissimilar anisotropic media
- Steady State Problems in Anisotropic Elasticity
- Weight Function Analysis of Interface Cracks: Mismatch Versus Oscillation
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