%0 Report %D 2013 %T Ambrosio-Tortorelli approximation of cohesive fracture models in linearized elasticity %A Matteo Focardi %A Flaviana Iurlano %K Functions of bounded deformation %X

We provide an approximation result in the sense of $\Gamma$-convergence for cohesive fracture energies of the form \[ \int_\Omega \mathscr{Q}_1(e(u))\,dx+a\,\mathcal{H}^{n-1}(J_u)+b\,\int_{J_u}\mathscr{Q}_0^{1/2}([u]\odot\nu_u)\,d\mathcal{H}^{n-1}, \] where $\Omega\subset{\mathbb R}^n$ is a bounded open set with Lipschitz boundary, $\mathscr{Q}_0$ and $\mathscr{Q}_1$ are coercive quadratic forms on ${\mathbb M}^{n\times n}_{sym}$, $a,\,b$ are positive constants, and $u$ runs in the space of fields $SBD^2(\Omega)$ , i.e., it's a special field with bounded deformation such that its symmetric gradient $e(u)$ is square integrable, and its jump set $J_u$ has finite $(n-1)$-Hausdorff measure in ${\mathbb R}^n$. The approximation is performed by means of Ambrosio-Tortorelli type elliptic regularizations, the prototype example being \[ \int_\Omega\Big(v|e(u)|^2+\frac{(1-v)^2}{\varepsilon}+{\gamma\,\varepsilon}|\nabla v|^2\Big)\,dx, \] where $(u,v)\in H^1(\Omega,{\mathbb R}^n){\times} H^1(\Omega)$, $\varepsilon\leq v\leq 1$ and $\gamma>0$.

%I SISSA %G en %U http://hdl.handle.net/1963/6615 %1 6573 %2 Mathematics %4 1 %# MAT/05 ANALISI MATEMATICA %$ Submitted by Flaviana Iurlano (iurlano@sissa.it) on 2013-05-13T11:26:04Z No. of bitstreams: 1 coesivo17_preprint_SISSA.pdf: 482275 bytes, checksum: 890efd398f9ff18a36d5b18fc90f8107 (MD5)