Interior continuity, continuity up to the boundary and Harnack's inequality for double-phase elliptic equations with non-logarithmic conditions

Abstract

We prove continuity and Harnack's inequality for bounded solutions to elliptic equations of the type aligned div(|∇ u|p-2\,∇ u+a(x)|∇ u|q-2\,∇ u)=0,& a(x)≥slant0, \\ |a(x)-a(y)|≤slant A|x-y|αμ(|x-y|),& x≠ y, \\ div(|∇ u|p-2\,∇ u [1+(1+b(x)\, |∇ u|) ] )=0,& b(x)≥slant0, \\ |b(x)-b(y)|≤slant B|x-y|\,μ(|x-y|),& x≠ y, aligned aligned div(|∇ u|p-2\,∇ u+ c(x)|∇ u|q-2\,∇ u [1+(1+|∇ u|) ]β )=0,& c(x)≥slant0, \, β≥slant0,=0=0 \\ |c(x)-c(y)|≤slant C|x-y|q-p\,μ(|x-y|),& x≠ y, aligned under the precise choice of μ.