Higher Order Elliptic Equations on Nonsmooth Domains
Abstract
In 1995, D. Jerison and C. Kenig in JK-1995 considered the the inhomogeneous Dirichlet problem u= f on , u=0 on ∂ in Lipschitz domains. One of their main results shows that the W1,p estimate holds for the sharp range 32-<p<3+ for d≥ 3 and 43-<p<4+ if d=2. Although the argument employed in JK-1995 yields optimal results, they rely on an essential fashion on the maximum principle and, as such, do not readily adapt to higher-order case. By using a new method, the aim of this paper is to establish an extension of their theorem for higher order inhomogeneous elliptic equations on bounded Lipschitz and convex domains, uniform W,p estimates are obtained for p in certain ranges. Especially, compare to the result in MM-2013 for biharmonic equation, a larger, sharp, range of p's was obtained in this paper.
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