Schr\"odinger semigroups and the H\"ormander hypoellipticity condition
Abstract
We introduce a class of (possibly) degenerate dispersive equations with a drift. We prove that, under the H\"ormander hypoellipticity condition, the relevant Cauchy problem can be uniquely solved in the Schwartz class, and the solution operator can be uniquely extended to a strongly continuous semigroup \ T(t)\t 0 in L2(). Finally, we prove that for t>0 the operator T(t) satisfies a sharp form of dispersive estimate in Lp, for any 1 p 2, and an uncertainty principle.
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