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| Naji, M. |
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| Motta, Antonella |
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| Aletan, Dirar |
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| Mohamed, Tarek |
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| Ertürk, Emre |
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| Taccardi, Nicola |
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| Kononenko, Denys |
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| Petrov, R. H. | Madrid |
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| Alshaaer, Mazen | Brussels |
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| Bih, L. |
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| Casati, R. |
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| Muller, Hermance |
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| Kočí, Jan | Prague |
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| Šuljagić, Marija |
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| Kalteremidou, Kalliopi-Artemi | Brussels |
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| Azam, Siraj |
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| Ospanova, Alyiya |
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| Blanpain, Bart |
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| Ali, M. A. |
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| Popa, V. |
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| Rančić, M. |
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| Ollier, Nadège |
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| Azevedo, Nuno Monteiro |
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| Landes, Michael |
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| Rignanese, Gian-Marco |
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Carreras, Laura
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Topics
Publications (8/8 displayed)
- 2023Benchmark test for mode I fatigue-driven delamination in GFRP composite laminatescitations
- 20213D progressive fatigue delamination model:Deliverable 5.1
- 20213D progressive fatigue delamination model
- 2021UPWARDS Deliverable D5.4:Report and data on the effect of fatigue loading history on damage development
- 2021A continuum damage model for composite laminatescitations
- 2021Effect of environment conditioning on mode II fracture behaviour of adhesively bonded jointscitations
- 2019An evaluation of mode-decomposed energy release rates for arbitrarily shaped delamination fronts using cohesive elementscitations
- 2015Thermal analysis of metal organic precursors for functional oxide preparation: Thin films versus powderscitations
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article
An evaluation of mode-decomposed energy release rates for arbitrarily shaped delamination fronts using cohesive elements
Abstract
Computing mode-decomposed energy release rates in arbitrarily shaped delaminations involving large fracture process zones has not been previously investigated. The J-integral is a suitable method for calculating this, because its domain-independence can be employed to reduce the integration domain to a cohesive interface, and reduce it to a line integral. However, the existing formulations for the evaluation of the mode-decomposed J-integrals rely on the assumption of negligible fracture process zones. In this work, a method for the computation of the mode-decomposed J-integrals in three-dimensional problems involving large fracture process zones and using the cohesive zone model approach is presented. The formulation is applicable to curved fronts with non-planar crack faces. A growth driving direction criterion, which takes into account the loading state at each point, is used to render the integration paths and to decompose the J-integral into loading modes. This results in curved and non-planar integration paths crossing the cohesive zone. Furthermore, its implementation into the finite element framework is also addressed. The formulation is validated against virtual crack closure technique (VCCT) and linear elastic fracture mechanics (LEFM)-based analytical solutions and the significance and generality of the formulation are demonstrated with crack propagation in a three-dimensional composite structure.