Some remarks on Riesz transform on exterior Lipschitz domains
Abstract
Let n2 and L=-div(A∇·) be an elliptic operator on Rn. Given an exterior Lipschitz domain , let LD be the elliptic operator L on subject to the Dirichlet boundary condition. Previously it was known that the Riesz operator ∇ LD-1/2 is not bounded for p>2 and p n, even if L=- being the Laplace operator and being a domain outside a ball. Suppose that A are CMO coefficients or VMO coefficients satisfying certain perturbation property, and ∂ is C1, we prove that for p>2 and p∈ [n,∞), it holds ∈fφ∈Kp(LD1/2)\|∇ (f-φ)\|Lp() ∈fφ∈Kp(LD1/2)\|L1/2D (f-φ)\|Lp() for f∈ W1,p0(). Here Kp(LD1/2) is the kernel of LD1/2 in W1,p0(), which coincides with Ap0():=\f∈ W1,p0():\,LDf=0\ and is a one dimensional subspace. As an application, we provide a substitution of Lp-boundedness of t∇ e-tLD which is uniform in t for p n and p>2.
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