Add to ORKGWe prove that the Gamma-limit in L^1_μ of a sequence of supremal functionals of the form F_k(u) = μ-ess sup f_k(x, u) is itself a supremal functional. We show by a counterexample that, in general, the function which represents the Gamma- lim F(·,B) of a sequence of functionals F_k(u,B) = μ-ess sup_B f_k(x, u) can depend on the set B and we give a necessary and sufficient condition to represent F in the supremal form F(u,B) = μ-ess sup_B f(x, u). As a corollary, if f represents a supremal functional, then the level convex envelope of f represents its weak* lower semicontinuous envelope
We consider a supremal functional of the form F(u) = ess sup x∈Ω f(x,Du(x)) where Ω ⊆ RN is a re...
We study variational problems involving nonlocal supremal functionals L∞(Ω;Rm)∋u↦esssup(x,y)∈Ω×ΩW(u(...
A novel general framework for the study of Γ -convergence of functionals defined over pairs of measu...
We prove that the Gamma-limit in L^1_μ of a sequence of supremal functionals of the form F_k(u) = μ-...
We prove that the Gamma-limit in L^1_μ of a sequence of supremal functionals of the form F_k(u) = μ-...
A 3D-2D dimensional reduction analysis for supremal functionals is performed in the realm of $Gamma...
A 3D-2D dimensional reduction analysis for supremal functionals is performed in the realm of Gamma*...
A 3D-2D dimensional reduction analysis for supremal functionals is performed in the realm of Gamma*-...
We study, via Gamma convergence, the homogenization in L-infinity of supremal functionals of the for...
We study, via Gamma convergence, the homogenization in L-infinity of supremal functionals of the for...
We study, via Gamma convergence, the homogenization in L-infinity of supremal functionals of the for...
In this paper we show that if the supremal functional F(V,B) = ess sup x∈B f(x, DV (x)) is sequentia...
In this paper we show that if the supremal functional F(V,B) = ess sup x∈B f(x, DV (x)) is sequen...
We consider a supremal functional of the form F(u) = ess sup x∈Ω f(x,Du(x)) where Ω ⊆ RN is a re...
We consider integral functionals $F_epsilon^{(j)}$, doubly indexed by $epsilon$ > 0 and $j in mathbb...
We consider a supremal functional of the form F(u) = ess sup x∈Ω f(x,Du(x)) where Ω ⊆ RN is a re...
We study variational problems involving nonlocal supremal functionals L∞(Ω;Rm)∋u↦esssup(x,y)∈Ω×ΩW(u(...
A novel general framework for the study of Γ -convergence of functionals defined over pairs of measu...
We prove that the Gamma-limit in L^1_μ of a sequence of supremal functionals of the form F_k(u) = μ-...
We prove that the Gamma-limit in L^1_μ of a sequence of supremal functionals of the form F_k(u) = μ-...
A 3D-2D dimensional reduction analysis for supremal functionals is performed in the realm of $Gamma...
A 3D-2D dimensional reduction analysis for supremal functionals is performed in the realm of Gamma*...
A 3D-2D dimensional reduction analysis for supremal functionals is performed in the realm of Gamma*-...
We study, via Gamma convergence, the homogenization in L-infinity of supremal functionals of the for...
We study, via Gamma convergence, the homogenization in L-infinity of supremal functionals of the for...
We study, via Gamma convergence, the homogenization in L-infinity of supremal functionals of the for...
In this paper we show that if the supremal functional F(V,B) = ess sup x∈B f(x, DV (x)) is sequentia...
In this paper we show that if the supremal functional F(V,B) = ess sup x∈B f(x, DV (x)) is sequen...
We consider a supremal functional of the form F(u) = ess sup x∈Ω f(x,Du(x)) where Ω ⊆ RN is a re...
We consider integral functionals $F_epsilon^{(j)}$, doubly indexed by $epsilon$ > 0 and $j in mathbb...
We consider a supremal functional of the form F(u) = ess sup x∈Ω f(x,Du(x)) where Ω ⊆ RN is a re...
We study variational problems involving nonlocal supremal functionals L∞(Ω;Rm)∋u↦esssup(x,y)∈Ω×ΩW(u(...
A novel general framework for the study of Γ -convergence of functionals defined over pairs of measu...