Roughness and multiscaling of planar crack fronts

Abstract

We consider numerically the roughness of a planar crack front within the long-range elastic string model, with a tunable disorder correlation length . The problem is shown to have two important length scales, and the Larkin length Lc. Multiscaling of the crack front is observed for scales below , provided that the disorder is strong enough. The asymptotic scaling with a roughness exponent ζ ≈ 0.39 is recovered for scales larger than both and Lc. If Lc > , these regimes are separated by a third regime characterized by the Larkin exponent ζL ≈ 0.5. We discuss the experimental implications of our results.