We consider, in an open subset of , energies depending on the perimeter of a subset (or some equivalent surface integral) and on a function which is defined only on . We compute the lower semicontinuous envelope of such energies. This relaxation has to take into account the fact that in the limit, the "holes" may collapse into a discontinuity of , whose surface will be counted twice in the relaxed energy. We discuss some situations where such energies appear, and give, as an application, a new proof of convergence for an extension of Ambrosio-Tortorelli's approximation to the Mumford-Shah functional. © EDP Sciences.
A relaxation result for energies defined on pairs set-function and applications / Braides, A.; Chambolle, A.; Solci, M.. - In: ESAIM. COCV. - ISSN 1292-8119. - 13:4(2007), pp. 717-734. [10.1051/cocv:2007032]
A relaxation result for energies defined on pairs set-function and applications
Braides A.;Chambolle A.;
2007-01-01
Abstract
We consider, in an open subset of , energies depending on the perimeter of a subset (or some equivalent surface integral) and on a function which is defined only on . We compute the lower semicontinuous envelope of such energies. This relaxation has to take into account the fact that in the limit, the "holes" may collapse into a discontinuity of , whose surface will be counted twice in the relaxed energy. We discuss some situations where such energies appear, and give, as an application, a new proof of convergence for an extension of Ambrosio-Tortorelli's approximation to the Mumford-Shah functional. © EDP Sciences.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
