Phase field approximation of cohesive fracture models

Abstract

We obtain a cohesive fracture model as a -limit of scalar damage models in which the elastic coefficient is computed from the damage variable v through a function fk of the form fk(v)=min\1,k1/2 f(v)\, with f diverging for v close to the value describing undamaged material. The resulting fracture energy can be determined by solving a one-dimensional vectorial optimal profile problem. It is linear in the opening s at small values of s and has a finite limit as s∞. If the function f is allowed to depend on the index k, for specific choices we recover in the limit Dugdale's and Griffith's fracture models, and models with surface energy density having a power-law growth at small openings.