Homogenization of interfacial energies and
construction of plane-like minimizers in periodic media
through a cell problem
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1.
CMAP, Ecole Polytechnique, CNRS, 91128 Palaiseau
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2.
Ecole Normale Supérieure, 45 rue d'Ulm, 75230 Paris Cedex 05
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Received:
01 July 2008
Revised:
01 January 2009
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35B27, 74Q05, 49Q20, 53A10.
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We consider the homogenization of a periodic interfacial
energy, such as considered in recents papers by
Caffarelli and De La Llave [14],
or Dirr, Lucia and Novaga [16].
In particular, we include the case where an external forcing
field (which is unbounded in the limit) is present, and suggest two different
ways to take care of this additional perturbation.
We provide a proof of a $\Gamma$-limit,
however, we also observe that thanks to the coarea formula, in many
cases such a result is already known in the framework of $BV$ homogenization.
This leads to an interesting new construction for the plane-like
minimizers in periodic media of Caffarelli and De La Llave, through
a cell problem.
Citation: Antonin Chambolle, Gilles Thouroude. Homogenization of interfacial energies andconstruction of plane-like minimizers in periodic mediathrough a cell problem[J]. Networks and Heterogeneous Media, 2009, 4(1): 127-152. doi: 10.3934/nhm.2009.4.127
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Abstract
We consider the homogenization of a periodic interfacial
energy, such as considered in recents papers by
Caffarelli and De La Llave [14],
or Dirr, Lucia and Novaga [16].
In particular, we include the case where an external forcing
field (which is unbounded in the limit) is present, and suggest two different
ways to take care of this additional perturbation.
We provide a proof of a $\Gamma$-limit,
however, we also observe that thanks to the coarea formula, in many
cases such a result is already known in the framework of $BV$ homogenization.
This leads to an interesting new construction for the plane-like
minimizers in periodic media of Caffarelli and De La Llave, through
a cell problem.
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