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Theory of potential scattering, taking into account spatial anisotropy. / Deich, V. G.; Korotyaev, E. L.; Yafaev, D. R.

в: Journal of Soviet Mathematics, Том 34, № 6, 09.1986, стр. 2040-2050.

Результаты исследований: Научные публикации в периодических изданияхстатьяРецензирование

Harvard

Deich, VG, Korotyaev, EL & Yafaev, DR 1986, 'Theory of potential scattering, taking into account spatial anisotropy', Journal of Soviet Mathematics, Том. 34, № 6, стр. 2040-2050. https://doi.org/10.1007/BF01741578

APA

Deich, V. G., Korotyaev, E. L., & Yafaev, D. R. (1986). Theory of potential scattering, taking into account spatial anisotropy. Journal of Soviet Mathematics, 34(6), 2040-2050. https://doi.org/10.1007/BF01741578

Vancouver

Deich VG, Korotyaev EL, Yafaev DR. Theory of potential scattering, taking into account spatial anisotropy. Journal of Soviet Mathematics. 1986 Сент.;34(6):2040-2050. https://doi.org/10.1007/BF01741578

Author

Deich, V. G. ; Korotyaev, E. L. ; Yafaev, D. R. / Theory of potential scattering, taking into account spatial anisotropy. в: Journal of Soviet Mathematics. 1986 ; Том 34, № 6. стр. 2040-2050.

BibTeX

@article{03d5bcade5664d409afc996600464de1,
title = "Theory of potential scattering, taking into account spatial anisotropy",
abstract = "We get new tests for the existence and completeness of wave operators under perturbation of a pseudodifferential operator with constant symbol P(ξ) by a bounded potential v(x). The term anisotropic is understood in the sense that the growth of P(ξ) as ξ→∞ and the decrease of v(x) as x→∞ can depend essentially on the direction of the vectors ξ and x respectively. This permits us to include in the sphere of applications of the abstract scattering theory of a nonelliptic unperturbed operator the D'Alembert operator, an ultrahyperbolic operator, nonstationary Schr{\"o}dinger operator, etc. In view of the anisotropic character of the assumptions on the potential, the results obtained are new even in the elliptic case. As an example we consider a Schr{\"o}dinger operator with potential close to the energy of a pair of interacting systems of many particles.",
author = "Deich, {V. G.} and Korotyaev, {E. L.} and Yafaev, {D. R.}",
year = "1986",
month = sep,
doi = "10.1007/BF01741578",
language = "English",
volume = "34",
pages = "2040--2050",
journal = "Journal of Mathematical Sciences",
issn = "1072-3374",
publisher = "Springer Nature",
number = "6",

}

RIS

TY - JOUR

T1 - Theory of potential scattering, taking into account spatial anisotropy

AU - Deich, V. G.

AU - Korotyaev, E. L.

AU - Yafaev, D. R.

PY - 1986/9

Y1 - 1986/9

N2 - We get new tests for the existence and completeness of wave operators under perturbation of a pseudodifferential operator with constant symbol P(ξ) by a bounded potential v(x). The term anisotropic is understood in the sense that the growth of P(ξ) as ξ→∞ and the decrease of v(x) as x→∞ can depend essentially on the direction of the vectors ξ and x respectively. This permits us to include in the sphere of applications of the abstract scattering theory of a nonelliptic unperturbed operator the D'Alembert operator, an ultrahyperbolic operator, nonstationary Schrödinger operator, etc. In view of the anisotropic character of the assumptions on the potential, the results obtained are new even in the elliptic case. As an example we consider a Schrödinger operator with potential close to the energy of a pair of interacting systems of many particles.

AB - We get new tests for the existence and completeness of wave operators under perturbation of a pseudodifferential operator with constant symbol P(ξ) by a bounded potential v(x). The term anisotropic is understood in the sense that the growth of P(ξ) as ξ→∞ and the decrease of v(x) as x→∞ can depend essentially on the direction of the vectors ξ and x respectively. This permits us to include in the sphere of applications of the abstract scattering theory of a nonelliptic unperturbed operator the D'Alembert operator, an ultrahyperbolic operator, nonstationary Schrödinger operator, etc. In view of the anisotropic character of the assumptions on the potential, the results obtained are new even in the elliptic case. As an example we consider a Schrödinger operator with potential close to the energy of a pair of interacting systems of many particles.

UR - http://www.scopus.com/inward/record.url?scp=34250125801&partnerID=8YFLogxK

U2 - 10.1007/BF01741578

DO - 10.1007/BF01741578

M3 - Article

AN - SCOPUS:34250125801

VL - 34

SP - 2040

EP - 2050

JO - Journal of Mathematical Sciences

JF - Journal of Mathematical Sciences

SN - 1072-3374

IS - 6

ER -

ID: 86259006