Global BMO-Sobolev Estimates for Second-Order Linear Elliptic Equations on Lipschitz Domains
Abstract
Let n 2 and ⊂ Rn be a bounded Lipschitz domain. In this article, we establish first-order global regularity estimates in the scale of BMO spaces on for weak solutions to the second-order elliptic equation div(A ∇ u) = div , f in . This is achieved under minimal regularity assumptions on and the coefficient matrix A, utilizing the pointwise multiplier characterization of the BMO space on . As an application, we also obtain global estimates of ∇ u in the Lebesgue space L1() when f belongs to the Hardy space on .
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