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Research Report MRR99-037
Imaginary powers of Laplace operators
Adam Sikora, James Wright
Abstract:
We show that if $L$ is a second-order uniformly elliptic operator
in divergence form on {\bf R}$^d$,
then $C_1(1+|\alpha|)^{d/2}
\le \|L^{i\alpha}\|_{L^1 \to L^{1,\infty}} \le C_2
(1+|\alpha|)^{d/2}$. We also prove that the upper bounds remain
true for any operator with the finite speed propagation property.
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