Higher regularity for minimizers of very degenerate convex integrals
Abstract
In this paper, we consider minimizers of integral functionals of the type equation* F(u):= ∫ 1p ( |Du(x)|γ(x)-1)+p \ dx, equation* for p >1, where u : ⊂ Rn RN, with N 1, is a possibly vector-valued function. Here, | · |γ is the associated norm of a bounded, symmetric and coercive bilinear form on RnN. We prove that K(x,Du) is continuous in , for any continuous function K: × RnN → R vanishing on \ (x, ) ∈ × RnN : ||γ(x) 1 \.
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