Local second order regularity of solutions to elliptic Orlicz-Laplace equation
Abstract
We consider Orlicz--Laplace equation -div('(|∇ u|)|∇ u|∇ u)=f where is an Orlicz function and either f=0 or f∈ L∞. We prove local second order regularity results for the weak solutions u of the Orlicz--Laplace equation. More precisely, we show that if is another Orlicz function that is close to in a suitable sense, then '(|∇ u|)|∇ u|∇ u∈ W1,2loc. This work contributes to the building up of quantitative second order Sobolev regularity for solutions of nonlinear equations.
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