We consider, in an open subset, energies depending on the perimeter of a subset E (or some equivalent surface integral) and on a function u which is defined only on the complement. We compute the lower semicontinuous envelope of such energies. This relaxation has to take into account the fact that in the limit, the “holes” E may collapse into a discontinuity of u, 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.
A relaxation result for energies defined on pairs set-function / Braides, A; Chambolle, A; Solci, Margherita. - 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
SOLCI, Margherita
2007-01-01
Abstract
We consider, in an open subset, energies depending on the perimeter of a subset E (or some equivalent surface integral) and on a function u which is defined only on the complement. We compute the lower semicontinuous envelope of such energies. This relaxation has to take into account the fact that in the limit, the “holes” E may collapse into a discontinuity of u, 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.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
