We study the weak* lower semicontinuity of functionals of the form $$ F(V)=supess_{x in Om} f(x,V (x)),, $$ where $Omsubset R^N$ is a bounded open set, $Vin L^{infty}(Omega;MM)cap Ker A$ and $A$ is a constant-rank partial differential operator. The notion of $A$-Young quasiconvexity, which is introduced here, provides a sufficient condition when $f(x,cdot)$ is only lower semicontinuous. We also establish necessary conditions for weak* lower semicontinuity. Finally, we discuss the divergence and curl-free cases and, as an application, we characterise the strength set in the context of electrical resistivity.
Lower semicontinuity of supremal functional under differential constraint
PRINARI, Francesca AgneseSecondo
2015
Abstract
We study the weak* lower semicontinuity of functionals of the form $$ F(V)=supess_{x in Om} f(x,V (x)),, $$ where $Omsubset R^N$ is a bounded open set, $Vin L^{infty}(Omega;MM)cap Ker A$ and $A$ is a constant-rank partial differential operator. The notion of $A$-Young quasiconvexity, which is introduced here, provides a sufficient condition when $f(x,cdot)$ is only lower semicontinuous. We also establish necessary conditions for weak* lower semicontinuity. Finally, we discuss the divergence and curl-free cases and, as an application, we characterise the strength set in the context of electrical resistivity.| File | Dimensione | Formato | |
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