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The Three-Body Coordinate Asymptotics with Explicitly Orthogonalized Channels. / Belov, P. A.; Yakovlev, S. L.

в: Few-Body Systems, Том 58, № 24, 2017.

Результаты исследований: Научные публикации в периодических изданияхстатьяРецензирование

Harvard

Belov, PA & Yakovlev, SL 2017, 'The Three-Body Coordinate Asymptotics with Explicitly Orthogonalized Channels', Few-Body Systems, Том. 58, № 24. https://doi.org/10.1007/s00601-016-1192-z

APA

Belov, P. A., & Yakovlev, S. L. (2017). The Three-Body Coordinate Asymptotics with Explicitly Orthogonalized Channels. Few-Body Systems, 58(24). https://doi.org/10.1007/s00601-016-1192-z

Vancouver

Belov PA, Yakovlev SL. The Three-Body Coordinate Asymptotics with Explicitly Orthogonalized Channels. Few-Body Systems. 2017;58(24). https://doi.org/10.1007/s00601-016-1192-z

Author

Belov, P. A. ; Yakovlev, S. L. / The Three-Body Coordinate Asymptotics with Explicitly Orthogonalized Channels. в: Few-Body Systems. 2017 ; Том 58, № 24.

BibTeX

@article{08340926546e499aa82c551f94d0dc85,
title = "The Three-Body Coordinate Asymptotics with Explicitly Orthogonalized Channels",
abstract = "We construct the asymptotic boundary conditions for Faddeev components of the wave function with the explicitly orthogonalized binary and breakup channels for the three-body scattering problem in configuration space. This makes it possible to obtain an accurate solution of the scattering problem above the breakup threshold, calculating scattering amplitudes by matching the solution of the Faddeev equations with the asymptote of the Faddeev wave function component in the asymptotic domain.",
author = "Belov, {P. A.} and Yakovlev, {S. L.}",
year = "2017",
doi = "10.1007/s00601-016-1192-z",
language = "English",
volume = "58",
journal = "Few-Body Systems",
issn = "0177-7963",
publisher = "Springer Nature",
number = "24",

}

RIS

TY - JOUR

T1 - The Three-Body Coordinate Asymptotics with Explicitly Orthogonalized Channels

AU - Belov, P. A.

AU - Yakovlev, S. L.

PY - 2017

Y1 - 2017

N2 - We construct the asymptotic boundary conditions for Faddeev components of the wave function with the explicitly orthogonalized binary and breakup channels for the three-body scattering problem in configuration space. This makes it possible to obtain an accurate solution of the scattering problem above the breakup threshold, calculating scattering amplitudes by matching the solution of the Faddeev equations with the asymptote of the Faddeev wave function component in the asymptotic domain.

AB - We construct the asymptotic boundary conditions for Faddeev components of the wave function with the explicitly orthogonalized binary and breakup channels for the three-body scattering problem in configuration space. This makes it possible to obtain an accurate solution of the scattering problem above the breakup threshold, calculating scattering amplitudes by matching the solution of the Faddeev equations with the asymptote of the Faddeev wave function component in the asymptotic domain.

U2 - 10.1007/s00601-016-1192-z

DO - 10.1007/s00601-016-1192-z

M3 - Article

VL - 58

JO - Few-Body Systems

JF - Few-Body Systems

SN - 0177-7963

IS - 24

ER -

ID: 7735161