Two Masses in Relative Hooke’s Potential and Elliptic Integrals

Piotr Krasoń; Jan Milewski

doi:10.1007/s44198-022-00036-x

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Title

Two Masses in Relative Hooke’s Potential and Elliptic Integrals

Authors

Piotr Krasoń
Jan Milewski (WARiE) ^{[ 1 ][ 7.4 ][ P ]}

^{[ 1 ]} Instytut Matematyki, Wydział Automatyki, Robotyki i Elektrotechniki, Politechnika Poznańska | ^{[ P ]} employee

Scientific discipline (Law 2.0)

[7.4] Mathematics

Year of publication

2022

Published in

Journal of Nonlinear Mathematical Physics

Journal year: 2022 | Journal volume: vol. 29 | Journal number: iss. 3

Article type

scientific article

Publication language

english

Keywords

EN

Hooke’s law
relative potential
relative motion of two masses
elliptic integrals

Abstract

EN We consider the relative motion of the system of two masses connected by a spring. We analyze it in a range of the Hooke’s law and show that the equations of the relative motion of the system are nonlinear once the equilibrium length of the spring is nonzero. Although the way of deriving the equations of motion is standard in classical mechanics solving them is a complicated and interesting problem of mathematical physics. The analysis leads naturally to elliptic integrals. We obtain complete formulas in an interesting, from both mathematical and physical point of view, way. Our analysis might be useful in some problems of molecular dynamics of diatomic molecules.

Pages (from - to)

504 - 522

DOI

10.1007/s44198-022-00036-x

URL

https://link.springer.com/article/10.1007/s44198-022-00036-x

License type

CC BY (attribution alone)

Open Access Mode

open journal

Open Access Text Version

final published version