Euler’s Original Derivation of Elastica Equation

Authors

Shigeki Matsutani, Kanazawa UniversityFollow

ORCiD

https://orcid.org/0000-0002-2981-0096

Abstract

Euler derived the differential equations of elastica by the variational method in 1744, but his original derivation has never been properly interpreted or explained in terms of modern mathematics. We elaborate Euler's original derivation of elastica and show that Euler used Noether's theorem concerning the translational symmetry of elastica, although Noether published her theorem in 1918. It is also shown that his equation is essentially the static modified KdV equation which is obtained by the isometric and isoenergy conditions, known as the Goldstein-Petrich scheme.

Last Page

227

Creative Commons License

This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License

Recommended Citation

Matsutani, Shigeki (2025) "Euler’s Original Derivation of Elastica Equation," Euleriana: 5(1), pp.202-227.
DOI: https://doi.org/10.56031/2693-9908.1096
Available at: https://scholarlycommons.pacific.edu/euleriana/vol5/iss1/7