2021
DOI: 10.1007/s10701-021-00525-x
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Bohmian Trajectories as Borders of Regions of Constant Probability

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Cited by 9 publications
(6 citation statements)
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“…These findings are in agreement with mathematically-motivated approaches by Oriols et al [8], Brandt et al [9] and Coffey et al [10]. For further details see [7].…”
Section: Consistent Derivation Of the Bohmian Trajectory And Physical...supporting
confidence: 90%
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“…These findings are in agreement with mathematically-motivated approaches by Oriols et al [8], Brandt et al [9] and Coffey et al [10]. For further details see [7].…”
Section: Consistent Derivation Of the Bohmian Trajectory And Physical...supporting
confidence: 90%
“…i.e., the dependent variable σ(V ) replaces the independent variable S. For further details, see [7]. How can this procedure be transferred to our Bohmian problem?…”
Section: Consistent Derivation Of the Bohmian Trajectory And Physical...mentioning
confidence: 99%
See 1 more Smart Citation
“…Madelung's formulation of wave mechanics was also later independently used by David Bohm in their deterministically inspired version of quantum mechanics [23,24] where he claimed the existence of real paths of (quantum) particles that can be obtained by integration of Equation ( 7). As we have shown recently [25], this deterministic viewpoint is incorrect and has to be replaced by a probabilistic one that differs from the usual probabilistic viewpoint taken in quantum mechanics. Nevertheless, Bohmian mechanics can still be helpful in the treatment of quantum systems, e.g., tunneling problems, particularly when performing numerical simulations [26,27].…”
Section: Conventional Quantum Hydrodynamicsmentioning
confidence: 98%
“…Shortly afterwards, in 1952, Bohm [ 14 , 15 ] independently took up Madelung’s idea, but tried to give it a deterministic interpretation, assuming that the integration of Madelung’s velocity would provide trajectories that are real paths followed by physical particles. (For a comprehensive review of the criticism of Bohm’s interpretation see [ 16 , 17 , 18 , 19 ] and the references cited therein; a consistent explanation of the Bohmian trajectories in probabilistic terms was given recently in [ 20 ].) Despite the ontological problems, the application of the Bohmian approach developed very useful numerical methods for the treatment of molecular reactions, tunnelling, and diffraction phenomena (see [ 21 ] for a review).…”
Section: Introductionmentioning
confidence: 99%