On the Global Existence of Bohmian Mechanics

B. Simon; C. Radin; D. Bohm; D. Bohm; D. Dürr; D. Dürr; D. Dürr; D.G. Saari; E. Nelson; E. Nelson; E.A. Carlen; E.C. Kemble; F.N. Diacu; G. Peruzzi; J. Mather; J. Moser; J. Rauch; J. Weidmann; J.L. Gerver; J.S. Bell; K. Berndl; K. Jörgens; K.M. Case; L.D. Landau; M. Reed; M. Reed; N. Zanghì; P. Seba; P.R. Holland; S. Albeverio; S. Bochner; S. Goldstein; T. Kato; T. Kato; V.I. Arnold; V.I. Arnold; W. Hunziker; W. Rudin; W.G. Faris; Z. Xia

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On the Global Existence of Bohmian Mechanics

Authors: B. Simon
C. Radin
D. Bohm
D. Bohm
D. Dürr
D. Dürr
D. Dürr
D.G. Saari
E. Nelson
E. Nelson
E.A. Carlen
E.C. Kemble
F.N. Diacu
G. Peruzzi
J. Mather
J. Moser
J. Rauch
J. Weidmann
J.L. Gerver
J.S. Bell
K. Berndl
K. Jörgens
K.M. Case
L.D. Landau
M. Reed
M. Reed
N. Zanghì
P. Seba
P.R. Holland
S. Albeverio
S. Bochner
S. Goldstein
T. Kato
T. Kato
V.I. Arnold
V.I. Arnold
W. Hunziker
W. Rudin
W.G. Faris
Z. Xia
Publication date: 1 January 1995
Publisher: 'Springer Science and Business Media LLC'
Doi

Abstract

We show that the particle motion in Bohmian mechanics, given by the solution of an ordinary differential equation, exists globally: For a large class of potentials the singularities of the velocity field and infinity will not be reached in finite time for typical initial values. A substantial part of the analysis is based on the probabilistic significance of the quantum flux. We elucidate the connection between the conditions necessary for global existence and the self-adjointness of the Schr\"odinger Hamiltonian.Comment: 35 pages, LaTe

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