We analyze a finite-difference approximation of a functional of Ambrosio–Tortorelli type in brittle fracture, in the discrete-to-continuum limit. In a suitable regime between the competing scales, namely if the discretization step δ is smaller than the ellipticity parameter ε, we show the Γ-convergence of the model to the Griffith functional, containing only a term enforcing Dirichlet boundary conditions and no Lp fidelity term. Restricting to two dimensions, we also address the case in which a (linearized) constraint of non-interpenetration of matter is added in the limit functional, in the spirit of a recent work by Chambolle, Conti and Francfort.
A derivation of Griffith functionals from discrete finite-difference models / Crismale, V.; Scilla, G.; Solombrino, F.. - In: CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS. - ISSN 0944-2669. - 59:6(2020), p. 193. [10.1007/s00526-020-01858-7]
A derivation of Griffith functionals from discrete finite-difference models
Scilla G.;Solombrino F.
2020
Abstract
We analyze a finite-difference approximation of a functional of Ambrosio–Tortorelli type in brittle fracture, in the discrete-to-continuum limit. In a suitable regime between the competing scales, namely if the discretization step δ is smaller than the ellipticity parameter ε, we show the Γ-convergence of the model to the Griffith functional, containing only a term enforcing Dirichlet boundary conditions and no Lp fidelity term. Restricting to two dimensions, we also address the case in which a (linearized) constraint of non-interpenetration of matter is added in the limit functional, in the spirit of a recent work by Chambolle, Conti and Francfort.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
