Borderline gradient continuity of minima
Abstract
The gradient of any local minimiser of functionals of the type w ∫ f(x,w,Dw)\,dx+∫ wμ\,dx, where f has p-growth, p>1, and ⊂ Rn, is continuous provided the optimal Lorentz space condition μ ∈ L(n,1) is satisfied and x f(x, ·) is suitably Dini-continuous.
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