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Research Report MRR99-005
Asymptotics of sums of subcoercive operators
Nick Dungey, A.F.M. ter Elst and Derek W. Robinson
Abstract:
We examine the asymptotic, or large-time, behaviour of the
semigroup kernel associated with a finite sum of homogeneous
subcoercive operators acting on a connected Lie group of polynomial
growth. If the group is nilpotent we prove that the kernel is
bounded by a convolution of two Gaussians whose orders correspond
to the highest and lowest orders of the homogeneous subcoercive
components of the generator. Moreover we establish precise
asymptotic estimates on the difference of the kernel and the kernel
corresponding to the lowest order homogeneous component. We also
prove boundedness of a range of Riesz transforms with the range
again determined by the highest and lowest orders. Finally we
analyze similar properties on general groups of polynomial growth
and establish positive results for local direct products of compact
and nilpotent groups.
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