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EQUATION FOR A PRODUCT OF SOLUTIONS OF TWO DIFFERENT SCHRÖDINGER EQUATIONS. / Slavyanov, S.Yu.

In: Theoretical and Mathematical Physics, No. 3, 2003, p. 1251-1257.

Research output: Contribution to journalArticle

Harvard

Slavyanov, SY 2003, 'EQUATION FOR A PRODUCT OF SOLUTIONS OF TWO DIFFERENT SCHRÖDINGER EQUATIONS', Theoretical and Mathematical Physics, no. 3, pp. 1251-1257. <http://elibrary.ru/item.asp?id=11952995>

APA

Slavyanov, S. Y. (2003). EQUATION FOR A PRODUCT OF SOLUTIONS OF TWO DIFFERENT SCHRÖDINGER EQUATIONS. Theoretical and Mathematical Physics, (3), 1251-1257. http://elibrary.ru/item.asp?id=11952995

Vancouver

Slavyanov SY. EQUATION FOR A PRODUCT OF SOLUTIONS OF TWO DIFFERENT SCHRÖDINGER EQUATIONS. Theoretical and Mathematical Physics. 2003;(3):1251-1257.

Author

Slavyanov, S.Yu. / EQUATION FOR A PRODUCT OF SOLUTIONS OF TWO DIFFERENT SCHRÖDINGER EQUATIONS. In: Theoretical and Mathematical Physics. 2003 ; No. 3. pp. 1251-1257.

BibTeX

@article{d98bea7a28a0493ca44f3f56d628c2cf,
title = "EQUATION FOR A PRODUCT OF SOLUTIONS OF TWO DIFFERENT SCHR{\"O}DINGER EQUATIONS",
abstract = "Under the assumption that potentials in two Schr{\"o}dinger equations differ by a polynomial of degree k, we derive a (k+4)th-order equation for a function that is a product of solutions of these equations. Several examples of applications in physics are considered.",
author = "S.Yu. Slavyanov",
year = "2003",
language = "English",
pages = "1251--1257",
journal = "Theoretical and Mathematical Physics (Russian Federation)",
issn = "0040-5779",
publisher = "Springer Nature",
number = "3",

}

RIS

TY - JOUR

T1 - EQUATION FOR A PRODUCT OF SOLUTIONS OF TWO DIFFERENT SCHRÖDINGER EQUATIONS

AU - Slavyanov, S.Yu.

PY - 2003

Y1 - 2003

N2 - Under the assumption that potentials in two Schrödinger equations differ by a polynomial of degree k, we derive a (k+4)th-order equation for a function that is a product of solutions of these equations. Several examples of applications in physics are considered.

AB - Under the assumption that potentials in two Schrödinger equations differ by a polynomial of degree k, we derive a (k+4)th-order equation for a function that is a product of solutions of these equations. Several examples of applications in physics are considered.

M3 - Article

SP - 1251

EP - 1257

JO - Theoretical and Mathematical Physics (Russian Federation)

JF - Theoretical and Mathematical Physics (Russian Federation)

SN - 0040-5779

IS - 3

ER -

ID: 5144672