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Propagation estimates in the one-commutator theory

Sylvain Golenia
(Universite de Bordeaux)
Analysis Seminar
Thursday, 17 May, 2018, at 16:15-17:00, in Aud. D3 (1531-215)
In the abstract framework of Mourre theory, the propagation of states is understood in terms of a conjugate operator $A$. A powerful estimate has long been known for Hamiltonians $H$ having a good regularity with respect to $A$ thanks to the limiting absorption principle (LAP). We study the case where $H$ has less regularity with respect to $A$, specifically in a situation where the LAP and the absence of singularly continuous spectrum have not yet been established. We show that in this case the spectral measure of $H$ is a Rajchman measure and we derive some propagation estimates.
Contact person: Jacob Schach Møller
89566 / i31