A global second order Sobolev regularity for p-Laplacian type equations with variable coefficients in bounded domains

Abstract

Let ⊂ Rn be a bounded convex domain with n2. Suppose that A is uniformly elliptic and belongs to W1,n when n 3 or W1,q for some q>2 when n=2. For 1<p<∞, we build up a global second order regularity estimate \|D[|Du|p-2 Du]\|L2()+\|D[ |ADu|p-2 A Du]\|L2() C \|f\|L2() for inhomogeneous p-Laplace type equation equation -div( A Du,Du p-22 A Du)=f in \ with Dirichlet/Neumann 0-boundary. equation Similar result was also built up for certain bounded Lipschitz domain whose boundary is weakly second order differentiable and satisfies some smallness assumptions.

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