English

Strings attached: New light on an old problem

Analysis of PDEs 2013-03-25 v3 Differential Geometry

Abstract

The wave equation utt=c2uxxu_{tt} = c^2 u_{xx} is generally regarded as a linear approximation to the equation describing the amplitude of a transversely vibrating elastic string in the plane. But, as is shown in \cite{BC96}, the assumption of transverse vibration in fact implies that the wave equation describes the vibration precisely, with no need for approximation. We give a simplified proof of this result, and we generalize to the case of an elastic string vibrating (transversely or not) in a Riemannian surface MM. In the more general setting, the assumption of transverse vibration is replaced by the assumption of "perfect elasticity," and we show that the wave map equation \but\but=c2\bux\bux\nabla_{\bu_t} \bu_t = c^2 \nabla_{\bu_x} \bu_x gives a precise description of the vibration of a perfectly elastic string in MM, with no need for approximation. Finally, we give examples describing the motion of various vibrating strings in R2\R^2, S2S^2, and H2\mathbb{H}^2.

Cite

@article{arxiv.1302.6672,
  title  = {Strings attached: New light on an old problem},
  author = {Jeanne N. Clelland and Peter J. Vassiliou},
  journal= {arXiv preprint arXiv:1302.6672},
  year   = {2013}
}

Comments

Minor revision: minor change in terminology, added Remark 3.3, additional references

R2 v1 2026-06-21T23:33:19.664Z