TY - JOUR
T1 - Local spectral deformation
AU - Engelmann, Matthias
AU - Møller, Jacob Schach
AU - Rasmussen, Morten Grud
PY - 2018
Y1 - 2018
N2 - We develop an analytic perturbation theory for eigenvalues with finite multiplicities, embedded into the essential spectrum of a self-adjoint operator H. We assume the existence of another self-adjoint operator A for which the family H
θ =
eiθAHe
-iθA extends analytically from the real line to a strip in the complex plane. Assuming a Mourre estimate holds for i[H, A] in the vicinity of the eigenvalue, we prove that the essential spectrum is locally deformed away from the eigenvalue, leaving it isolated and thus permitting an application of Kato's analytic perturbation theory.
AB - We develop an analytic perturbation theory for eigenvalues with finite multiplicities, embedded into the essential spectrum of a self-adjoint operator H. We assume the existence of another self-adjoint operator A for which the family H
θ =
eiθAHe
-iθA extends analytically from the real line to a strip in the complex plane. Assuming a Mourre estimate holds for i[H, A] in the vicinity of the eigenvalue, we prove that the essential spectrum is locally deformed away from the eigenvalue, leaving it isolated and thus permitting an application of Kato's analytic perturbation theory.
KW - Analytic perturbation theory
KW - Mourre theory
KW - Spectral deformation
UR - http://www.scopus.com/inward/record.url?scp=85047479545&partnerID=8YFLogxK
M3 - Journal article
SN - 0373-0956
VL - 68
SP - 767
EP - 804
JO - Annales de l'Institut Fourier
JF - Annales de l'Institut Fourier
IS - 2
ER -