Adiabatic theorems for general linear operators with time-independent domains

Abstract

We establish adiabatic theorems with and without spectral gap condition for general -- typically dissipative -- linear operators A(t): D(A(t)) ⊂ X X with time-independent domains D(A(t)) = D in some Banach space X. Compared to the previously known adiabatic theorems -- especially those without spectral gap condition -- we do not require the considered spectral values λ(t) of A(t) to be (weakly) semisimple. We also impose only fairly weak regularity conditions. Applications are given to slowly time-varying open quantum systems and to adiabatic switching processes.