Mean oscillation conditions for nonlinear equation and regularity results

Abstract

We consider general nonlinear elliptic equations of the form \[ div\, A(x,Du) = 0 in , \] where A: × Rn Rn satisfies a quasi-isotropic (p,q)-growth condition, which is equivalent to the point-wise uniform ellipticity of A. We establish sharp and comprehensive mean oscillation conditions on A(x,) with respect to the x variable to obtain C1- and W1,s-regularity results. The results provide new conditions even in the standard p-growth case with coefficient div(a(x)|Du|p-2Du)=0. Also included are variable exponent growth with and without perturbation as well as borderline double-phase growth and double-phase growth with a coefficient.

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