Abstract
AbstractWe show that generalized Gaussian estimates for selfadjoint semigroups (e-tA)t ∈ R+ on L2 imply Lp boundedness of Riesz means and other regularizations of the Schrödinger group (eitA)t ∈ R. This generalizes results restricted to semigroups with a heat kernel, which are due to Sjöstrand, Alexopoulos and more recently Carron, Coulhon and Ouhabaz. This generalization is crucial for elliptic operators A that are of higher order or have singular lower order terms since, in general, their semigroups fail to have a heat kernel.
Publisher
Cambridge University Press (CUP)
Reference26 articles.
1. Gaussian estimates and holomorphy of semigroups
2. [1] Alexopoulos G. , ‘Lp bounds for spectral multipliers from Gaussian estimates on the heat kernel’, preprint.
3. Generalized Gaussian estimates and the Legendre transform;Blunck;J. Operator Theory,2005
4. Weak type (p,p) estimates for Riesz transforms
5. Limits onLpRegularity of Self-Adjoint Elliptic Operators
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