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Research Report MRR99-016
On second-order periodic elliptic operators in divergence form
A.F.M. ter Elst, Derek W. Robinson and Adam Sikora
Abstract:
We consider second-order, strongly elliptic, operators with complex
coefficients in divergence form on Rd. We assume that the
coefficients are all periodic with a common period. If the
coefficients are continuous we derive Gaussian bounds with the
correct small and large time asymptotic behaviour on the heat
kernel and all its Hölder derivatives. Secondly if the
coefficients are Hölder continuous we prove that the
first-order derivatives of the kernel satisfy good Gaussian bounds
and the first-order Riesz transforms are bounded on the
Lp-spaces with p\in<1,\infty>. Then we establish
that the second-order derivatives exist and satisfy good bounds if,
and only if, the coefficients are divergence-free or if, and only
if, the second-order Riesz transforms are bounded. Finally if the
third-order derivatives exist with good bounds then the
coefficients must be constant.
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