Regularity of vectorial minimizers for non-uniformly elliptic anisotropic integrals

Abstract

We establish the local boundedness of the local minimizers u:→Rm of non-uniformly elliptic integrals of the form ∫f(x,Dv)\,dx, where is a bounded open subset of Rn (n≥2) and the integrand satisfies anisotropic growth conditions of the type \[ Σi=1nλi(x)|i|pi f(x,)μ(x)\ 1+||q\ \] for some exponents q≥ pi>1 and with non-negative functions λi,μ fulfilling suitable summability assumptions. The main novelties here are the degenerate and anisotropic behaviour of the integrand and the fact that we also address the case of vectorial minimizers (m>1). Our proof is based on the celebrated Moser iteration technique and employs an embedding result for anisotropic Sobolev spaces.

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