Abstract
In edge-notched tension specimens of unidirectional fiber-polymer composites, an initial transverse crack or notch might not propagate forward. Instead, sideways cracks parallel to fibers may grow axially from the initial crack tip. When the fibers are inclined from the specimen axis, a sideways crack propagates along the inclined fibers. Unless a potential sideways orthogonal cohesive crack is considered to exist a priori at the right location, the cohesive crack model cannot predict the sideways branching correctly. The crack band model can, because it involves a damage model with tensorial strength criterion, instead of scalar stress-separation law. We obtain approximate analytical solutions by the method of stress relief zones bordered by lines of slope k calibrated by J-integral. Our analysis, verified by finite element simulations, yields formulae for the structure size effect of orthogonal or inclined sideways cracks, taking into account the effect of the length of original transverse crack or notch, and the effect of the ratio of fracture energies \(\varGamma _f\) and \(\varGamma _s\) of the forward and sideways cracks, respectively. The sideways cracks develop only if the ratio \(\varGamma _s/\varGamma _f\) is small enough, below a certain critical value (on-the-order of \(10^{-1}\)) depending on material parameters. Measuring the size effect of sideways cracks yields \(\varGamma _s\) and the corresponding fracture process zone size. The theory is shown to match Nairn’s tests with varying notch depths. The results can be applied to all kinds of orthotropic composites.
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07 July 2020
International Journal of Fracture
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Acknowledgements
Partial funding under ARO Grant W911NF-19-1-0039 to Northwestern University is gratefully acknowledged. The first author thanks The Scientific and Technological Research Council of Turkey for financially supporting his post-doctoral research at Northwestern University
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Dönmez, A., Bažant, Z.P. Size effect on branched sideways cracks in orthotropic fiber composites. Int J Fract 222, 155–169 (2020). https://doi.org/10.1007/s10704-020-00439-1
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DOI: https://doi.org/10.1007/s10704-020-00439-1