Exact solutions of the harmonic oscillator plus non-polynomial interaction: Exact solutions for HO plus non polynom

Qian Dong; H. Iván García Hernández; Guo Hua Sun; Mohamad Toutounji; Shi Hai Dong

doi:10.1098/rspa.2020.0050

Exact solutions of the harmonic oscillator plus non-polynomial interaction: Exact solutions for HO plus non polynom

Qian Dong, H. Iván García Hernández, Guo Hua Sun, Mohamad Toutounji, Shi Hai Dong

Research output: Contribution to journal › Article › peer-review

10 Scopus citations

Abstract

The exact solutions to a one-dimensional harmonic oscillator plus a non-polynomial interaction a x 2 + b x 2 /(1 + c x 2) (a > 0, c > 0) are given by the confluent Heun functions H c (a, ß, ?, d, ?;z). The minimum value of the potential well is calculated as Vmin(x)=-(a+|b|-2a |b|)/c at x=±[(|b|/a-1)/c]1/2 (|b| > a) for the double-well case (b < 0). We illustrate the wave functions through varying the potential parameters a, b, c and show that they are pulled back to the origin when the potential parameter b increases for given values of a and c. However, we find that the wave peaks are concave to the origin as the parameter |b| is increased.

Original language	English
Article number	20200050
Journal	Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences
Volume	476
Issue number	2241
DOIs	https://doi.org/10.1098/rspa.2020.0050
State	Published - 1 Sep 2020

Keywords

confluent Heun function
exact solutions
non-polynomial oscillator

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10.1098/rspa.2020.0050

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title = "Exact solutions of the harmonic oscillator plus non-polynomial interaction: Exact solutions for HO plus non polynom",

abstract = "The exact solutions to a one-dimensional harmonic oscillator plus a non-polynomial interaction a x 2 + b x 2 /(1 + c x 2) (a > 0, c > 0) are given by the confluent Heun functions H c (a, {\ss}, ?, d, ?;z). The minimum value of the potential well is calculated as Vmin(x)=-(a+|b|-2a |b|)/c at x=±[(|b|/a-1)/c]1/2 (|b| > a) for the double-well case (b < 0). We illustrate the wave functions through varying the potential parameters a, b, c and show that they are pulled back to the origin when the potential parameter b increases for given values of a and c. However, we find that the wave peaks are concave to the origin as the parameter |b| is increased.",

keywords = "confluent Heun function, exact solutions, non-polynomial oscillator",

author = "Qian Dong and {Iv{\'a}n Garc{\'i}a Hern{\'a}ndez}, H. and Sun, {Guo Hua} and Mohamad Toutounji and Dong, {Shi Hai}",

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year = "2020",

month = sep,

day = "1",

doi = "10.1098/rspa.2020.0050",

language = "Ingl{\'e}s",

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journal = "Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences",

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Exact solutions of the harmonic oscillator plus non-polynomial interaction: Exact solutions for HO plus non polynom. / Dong, Qian; Iván García Hernández, H.; Sun, Guo Hua et al.
In: Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences, Vol. 476, No. 2241, 20200050, 01.09.2020.

Research output: Contribution to journal › Article › peer-review

TY - JOUR

T1 - Exact solutions of the harmonic oscillator plus non-polynomial interaction

T2 - Exact solutions for HO plus non polynom

AU - Dong, Qian

AU - Iván García Hernández, H.

AU - Sun, Guo Hua

AU - Toutounji, Mohamad

AU - Dong, Shi Hai

PY - 2020/9/1

Y1 - 2020/9/1

N2 - The exact solutions to a one-dimensional harmonic oscillator plus a non-polynomial interaction a x 2 + b x 2 /(1 + c x 2) (a > 0, c > 0) are given by the confluent Heun functions H c (a, ß, ?, d, ?;z). The minimum value of the potential well is calculated as Vmin(x)=-(a+|b|-2a |b|)/c at x=±[(|b|/a-1)/c]1/2 (|b| > a) for the double-well case (b < 0). We illustrate the wave functions through varying the potential parameters a, b, c and show that they are pulled back to the origin when the potential parameter b increases for given values of a and c. However, we find that the wave peaks are concave to the origin as the parameter |b| is increased.

AB - The exact solutions to a one-dimensional harmonic oscillator plus a non-polynomial interaction a x 2 + b x 2 /(1 + c x 2) (a > 0, c > 0) are given by the confluent Heun functions H c (a, ß, ?, d, ?;z). The minimum value of the potential well is calculated as Vmin(x)=-(a+|b|-2a |b|)/c at x=±[(|b|/a-1)/c]1/2 (|b| > a) for the double-well case (b < 0). We illustrate the wave functions through varying the potential parameters a, b, c and show that they are pulled back to the origin when the potential parameter b increases for given values of a and c. However, we find that the wave peaks are concave to the origin as the parameter |b| is increased.

KW - confluent Heun function

KW - exact solutions

KW - non-polynomial oscillator

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U2 - 10.1098/rspa.2020.0050

DO - 10.1098/rspa.2020.0050

M3 - Artículo

AN - SCOPUS:85093077893

SN - 1364-5021

VL - 476

JO - Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences

JF - Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences

IS - 2241

M1 - 20200050

ER -

Exact solutions of the harmonic oscillator plus non-polynomial interaction: Exact solutions for HO plus non polynom

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