Lieb-Robinson Bounds for the Toda Lattice

B. Nachtergaele; B. Nachtergaele; B. Nachtergaele; B. Nachtergaele; B. Nachtergaele; B. Nachtergaele; B. Nachtergaele; C. Marchioro; D. Poulin; E.H. Lieb; F. Bonetto; F. Gesztesy; F. Gesztesy; G. Teschl; G. Teschl; G. Teschl; Gerald Teschl; H. Flaschka; H. Flaschka; H. Krüger; H. Krüger; H. Raz; I. Prémont-Schwarz; J. Michor; L. Amour; L. Faddeev; M. Cramer; M. Hastings; M. Hastings; M. Toda; N. Schuch; N.J. Zabusky; P. Buttà; R. Abraham; Robert Sims; S. Bachmann; S. Bravyi; S. Bravyi; S.V. Manakov; Umar Islambekov; V. Borovyk

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Lieb-Robinson Bounds for the Toda Lattice

Authors: B. Nachtergaele
B. Nachtergaele
B. Nachtergaele
B. Nachtergaele
B. Nachtergaele
B. Nachtergaele
B. Nachtergaele
C. Marchioro
D. Poulin
E.H. Lieb
F. Bonetto
F. Gesztesy
F. Gesztesy
G. Teschl
G. Teschl
G. Teschl
Gerald Teschl
H. Flaschka
H. Flaschka
H. Krüger
H. Krüger
H. Raz
I. Prémont-Schwarz
J. Michor
L. Amour
L. Faddeev
M. Cramer
M. Hastings
M. Hastings
M. Toda
N. Schuch
N.J. Zabusky
P. Buttà
R. Abraham
Robert Sims
S. Bachmann
S. Bravyi
S. Bravyi
S.V. Manakov
Umar Islambekov
V. Borovyk
Publication date: 9 June 2012
Publisher: 'Springer Science and Business Media LLC'
Doi

Abstract

We establish locality estimates, known as Lieb-Robinson bounds, for the Toda lattice. In contrast to harmonic models, the Lieb-Robinson velocity for these systems do depend on the initial condition. Our results also apply to the entire Toda as well as the Kac-van Moerbeke hierarchy. Under suitable assumptions, our methods also yield a finite velocity for certain perturbations of these systems

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info:doi/10.1007%2Fs10955-012-...

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