Force and moment balance equations for geometric variational problems on   curves

E.L. Starostin; G.H.M. van der Heijden

arXiv:0905.1880·physics.class-ph·June 16, 2009

Force and moment balance equations for geometric variational problems on curves

E.L. Starostin, G.H.M. van der Heijden

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TL;DR

This paper derives force and moment balance equations for geometric variational problems on curves, providing a new framework that aids in studying bio- and nanofilaments.

Contribution

It introduces a novel form of Euler-Lagrange equations expressed as equilibrium equations for force and moment in Euclidean-invariant problems.

Findings

01

Classical examples illustrated the approach.

02

New equations facilitate bio- and nanofilament analysis.

03

Framework promotes further geometric variational studies.

Abstract

We consider geometric variational problems for a functional defined on a curve in three-dimensional space. The functional is assumed to be written in a form invariant under the group of Euclidean motions. We present the Euler-Lagrange equations as equilibrium equations for the internal force and moment. Classical as well as new examples are discussed to illustrate our approach. This new form of the equations particularly serves to promote the study of bio- and nanofilaments.

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