Weighted Global Regularity Estimates for Elliptic Problems with Robin Boundary Conditions in Lipschitz Domains

Abstract

Let n2 and be a bounded Lipschitz domain in Rn. In this article, the authors investigate global (weighted) estimates for the gradient of solutions to Robin boundary value problems of second order elliptic equations of divergence form with real-valued, bounded, measurable coefficients in . More precisely, let p∈(n/(n-1),∞). Using a real-variable argument, the authors obtain two necessary and sufficient conditions for W1,p estimates of solutions to Robin boundary value problems, respectively, in terms of a weak reverse H\"older inequality with exponent p or weighted W1,q estimates of solutions with q∈(n/(n-1),p] and some Muckenhoupt weights. As applications, the authors establish some global regularity estimates for solutions to Robin boundary value problems of second order elliptic equations of divergence form with small BMO coefficients, respectively, on bounded Lipschitz domains, C1 domains or (semi-)convex domains, in the scale of weighted Lebesgue spaces, via some quite subtle approach which is different from the existing ones and, even when n=3 in case of bounded C1 domains, also gives an alternative correct proof of some know result. By this and some technique from harmonic analysis, the authors further obtain the global regularity estimates, respectively, in Morrey spaces, (Musielak--)Orlicz spaces and variable Lebesgue spaces