Γ-convergence of free-discontinuity problems

  • Filippo Cagnetti

    Department of Mathematics, University of Sussex, Brighton, United Kingdom
  • Gianni Dal Maso

    SISSA, Trieste, Italy
  • Lucia Scardia

    Department of Mathematics, Heriot-Watt University, Edinburgh, United Kingdom
  • Caterina Ida Zeppieri

    Institut für numerische und angewandte Mathematik, WWU Münster, Germany
Γ-convergence of free-discontinuity problems cover
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Abstract

We study the Γ-convergence of sequences of free-discontinuity functionals depending on vector-valued functions u which can be discontinuous across hypersurfaces whose shape and location are not known a priori. The main novelty of our result is that we work under very general assumptions on the integrands which, in particular, are not required to be periodic in the space variable. Further, we consider the case of surface integrands which are not bounded from below by the amplitude of the jump of u.

We obtain three main results: compactness with respect to Γ-convergence, representation of the Γ-limit in an integral form and identification of its integrands, and homogenisation formulas without periodicity assumptions. In particular, the classical case of periodic homogenisation follows as a by-product of our analysis. Moreover, our result covers also the case of stochastic homogenisation, as we will show in a forthcoming paper.

Cite this article

Filippo Cagnetti, Gianni Dal Maso, Lucia Scardia, Caterina Ida Zeppieri, Γ-convergence of free-discontinuity problems. Ann. Inst. H. Poincaré Anal. Non Linéaire 36 (2019), no. 4, pp. 1035–1079

DOI 10.1016/J.ANIHPC.2018.11.003