This paper deals with the homogenization of two-dimensional oscillating convex functionals, the densities of which are equicoercive but not uniformly bounded from above. Using a uniform-convergence result for the minimizers, which holds for this type of scalar problems in dimension two, we prove in particular that the limit energy is local and recover the validity of the analogue of the well-known periodic homogenization formula in this degenerate case. However, in the present context the classical argument leading to integral representation based on the use of cut-off functions is useless due to the unboundedness of the densities. In its place we build sequences with bounded energy, which converge uniformly to piecewise-affine functions, taking point-wise extrema of recovery sequences for affine functions. © 2009 IOP Publishing Ltd and London Mathematical Society.

Homogenization of non-uniformly bounded periodic diffusion energies in dimension two / Braides, A.; Briane, M.; Casado-Diaz, J.. - In: NONLINEARITY. - ISSN 0951-7715. - 22:6(2009), pp. 1459-1480. [10.1088/0951-7715/22/6/010]

Homogenization of non-uniformly bounded periodic diffusion energies in dimension two

Braides A.;
2009-01-01

Abstract

This paper deals with the homogenization of two-dimensional oscillating convex functionals, the densities of which are equicoercive but not uniformly bounded from above. Using a uniform-convergence result for the minimizers, which holds for this type of scalar problems in dimension two, we prove in particular that the limit energy is local and recover the validity of the analogue of the well-known periodic homogenization formula in this degenerate case. However, in the present context the classical argument leading to integral representation based on the use of cut-off functions is useless due to the unboundedness of the densities. In its place we build sequences with bounded energy, which converge uniformly to piecewise-affine functions, taking point-wise extrema of recovery sequences for affine functions. © 2009 IOP Publishing Ltd and London Mathematical Society.
2009
22
6
1459
1480
Braides, A.; Briane, M.; Casado-Diaz, J.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/20.500.11767/139512
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