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Growth of Sobolev norms for abstract linear Schrödinger equations

Dario Bambusi, Benoît Grébert, Alberto Maspero, Didier Robert

2020Journal of the European Mathematical Society25 citationsDOIOpen Access PDF

Abstract

We prove an abstract theorem giving a \langle t\rangle^\epsilon bound (for all \epsilon > 0 ) on the growth of the Sobolev norms in linear Schrödinger equations of the form \mathrm i \dot \psi = H_0 \psi + V(t)\psi as t \to \infty . The abstract theorem is applied to several cases, including the cases where (i) H_0 is the Laplace operator on a Zoll manifold and V(t) a pseudodifferential operator of order smaller than 2; (ii) H_0 is the (resonant or nonresonant) Harmonic oscillator in mathbb \R^d and V(t) a pseudodifferential operator of order smaller than that of H_0 depending in a quasiperiodic way on time. The proof is obtained by first conjugating the system to some normal form in which the perturbation is a smoothing operator and then applying the results of [MR17].

Topics & Concepts

Sobolev spaceQuasiperiodic functionMathematicsOperator (biology)Order (exchange)Perturbation (astronomy)Mathematical physicsLaplace operatorPure mathematicsMathematical analysisPhysicsQuantum mechanicsChemistryGeneEconomicsBiochemistryRepressorFinanceTranscription factorSpectral Theory in Mathematical PhysicsQuantum chaos and dynamical systemsAdvanced Mathematical Physics Problems