We formulate an adiabatic theorem adapted to models that present an
instantaneous eigenvalue experiencing an infinite number of crossings with the
rest of the spectrum. We give an upper bound on the leading correction terms
with respect to the adiabatic limit. The result requires only differentiability
of the considered spectral projector, and some geometric hypothesis on the
local behaviour of the eigenvalues at the crossings

A. Joye

F. Monti

H. R. Jauslin

Joye A.

Kato T.

S. Guérin

English

arXiv

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Adiabatic evolution for systems with infinitely many eigenvalue crossings

International audienceWe formulate an adiabatic theorem adapted to models that present an instantaneous eigenvalue experiencing an infinite number of crossings with the rest of the spectrum. We give an upper bound on the leading correction terms with respect to the adiabatic limit. The result requires only differentiability of the considered projector, and some geometric hypothesis on the local behavior of the eigenvalues at the crossings

Adiabatic Evolution for Systems with Infinitely many Eigenvalue Crossings

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