Publication date
January 2015
DOI Publisher
Springer Science and Business Media LLCAbstract
Bounded minimisers of the functional functional (Formula presented.) dx, where 0 ≦ a(·) ∈C0, α and 1 1, β-regular provided the sharp bound q ≦ p + α holds
Bounded minimisers of the functional functional (Formula presented.) dx, where 0 ≦ a(·) ∈C0, α and 1 1, β-regular provided the sharp bound q ≦ p + α holds
We consider the relaxed functional RF(u)=inflim infkF(uk):uk→uwhere F is the polyconvex integral F(u...
We state a maximum principle for the gradient of the minima of integral functionals I(u) = integral...
We consider a minimization problem that combines the Dirichlet energy with the nonlocal perimeter of...
We prove sharp regularity theorems for minimisers of a class of variational integrals whose integran...
The functionals of double phase type H(u):= Z ∫ (|Du|p + a(x) |Du|q) dx, (q > p > 1, a(x) ≥ 0)...
Abstract. We study minimizers of the energy functional∫ D [|∇u|2 + λ(u+)p] dx for p ∈ (0, 1) without...
We prove C1,ν -regularity for local minimizers of the multi-phase energy: w →ˆ|Dw| p + a(x)|Dw| q + ...
Abstract In this paper we explore the potential of the double phase functional in an image processi...
AbstractWe prove regularity theorems for minimizers of integral functionals of the Calculus of Varia...
We focus on some regularity properties of -minima of variational integrals with -growth and provide ...
We prove regularity theorems for minimizers of integral functionals of the Calculus of Variations ...
The author proves partial regularity for vector-valued minimizers u of the variational integral #int...
We consider regularity at the boundary for minimizers of variational integrals whose integrands have...
Abstract. We study the partial regularity of minimizers for certain singular functionals in the calc...
AbstractWe consider almost respectively strong almost minimizers to quasi-convex variational integra...
We consider the relaxed functional RF(u)=inflim infkF(uk):uk→uwhere F is the polyconvex integral F(u...
We state a maximum principle for the gradient of the minima of integral functionals I(u) = integral...
We consider a minimization problem that combines the Dirichlet energy with the nonlocal perimeter of...
We prove sharp regularity theorems for minimisers of a class of variational integrals whose integran...
The functionals of double phase type H(u):= Z ∫ (|Du|p + a(x) |Du|q) dx, (q > p > 1, a(x) ≥ 0)...
Abstract. We study minimizers of the energy functional∫ D [|∇u|2 + λ(u+)p] dx for p ∈ (0, 1) without...
We prove C1,ν -regularity for local minimizers of the multi-phase energy: w →ˆ|Dw| p + a(x)|Dw| q + ...
Abstract In this paper we explore the potential of the double phase functional in an image processi...
AbstractWe prove regularity theorems for minimizers of integral functionals of the Calculus of Varia...
We focus on some regularity properties of -minima of variational integrals with -growth and provide ...
We prove regularity theorems for minimizers of integral functionals of the Calculus of Variations ...
The author proves partial regularity for vector-valued minimizers u of the variational integral #int...
We consider regularity at the boundary for minimizers of variational integrals whose integrands have...
Abstract. We study the partial regularity of minimizers for certain singular functionals in the calc...
AbstractWe consider almost respectively strong almost minimizers to quasi-convex variational integra...
We consider the relaxed functional RF(u)=inflim infkF(uk):uk→uwhere F is the polyconvex integral F(u...
We state a maximum principle for the gradient of the minima of integral functionals I(u) = integral...
We consider a minimization problem that combines the Dirichlet energy with the nonlocal perimeter of...
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