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Axisymmetric surface diffusion: Dynamics and stability of self-similar pinchoff

Publication ,  Journal Article
Bernoff, AJ; Bertozzi, AL; Witelski, TP
Published in: Journal of Statistical Physics
January 1, 1998

The dynamics of surface diffusion describes the motion of a surface with its normal velocity given by the surface Laplacian of its mean curvature. This flow conserves the volume enclosed inside the surface while minimizing its surface area. We review the axisymmetric equilibria: the cylinder, sphere, and the Delaunay unduloid. The sphere is stable, while the cylinder is long-wave unstable. A subcritical bifurcation from the cylinder produces a continuous family of unduloid solutions. We present computations that suggest that the stable manifold of the unduloid forms a separatrix between states that relax to the cylinder in infinite time and those that tend toward finite-time pinchoff. We examine the structure of the pinchoff, showing it has self-similar structure, using asymptotic, numerical, and analytical methods. In addition to a previously known similarity solution, we find a countable set of similarity solutions, each with a different asymptotic cone angle. We develop a stability theory in similarity variables that selects the original similarity solution as the only linearly stable one and consequently the only observable solution. We also consider similarity solutions describing the dynamics after the topological transition.

Duke Scholars

Published In

Journal of Statistical Physics

DOI

ISSN

0022-4715

Publication Date

January 1, 1998

Volume

93

Issue

3-4

Start / End Page

725 / 776

Related Subject Headings

  • Fluids & Plasmas
  • 51 Physical sciences
  • 49 Mathematical sciences
  • 02 Physical Sciences
  • 01 Mathematical Sciences
 

Citation

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Bernoff, A. J., Bertozzi, A. L., & Witelski, T. P. (1998). Axisymmetric surface diffusion: Dynamics and stability of self-similar pinchoff. Journal of Statistical Physics, 93(3–4), 725–776. https://doi.org/10.1023/b:joss.0000033251.81126.af
Bernoff, A. J., A. L. Bertozzi, and T. P. Witelski. “Axisymmetric surface diffusion: Dynamics and stability of self-similar pinchoff.” Journal of Statistical Physics 93, no. 3–4 (January 1, 1998): 725–76. https://doi.org/10.1023/b:joss.0000033251.81126.af.
Bernoff AJ, Bertozzi AL, Witelski TP. Axisymmetric surface diffusion: Dynamics and stability of self-similar pinchoff. Journal of Statistical Physics. 1998 Jan 1;93(3–4):725–76.
Bernoff, A. J., et al. “Axisymmetric surface diffusion: Dynamics and stability of self-similar pinchoff.” Journal of Statistical Physics, vol. 93, no. 3–4, Jan. 1998, pp. 725–76. Scopus, doi:10.1023/b:joss.0000033251.81126.af.
Bernoff AJ, Bertozzi AL, Witelski TP. Axisymmetric surface diffusion: Dynamics and stability of self-similar pinchoff. Journal of Statistical Physics. 1998 Jan 1;93(3–4):725–776.
Journal cover image

Published In

Journal of Statistical Physics

DOI

ISSN

0022-4715

Publication Date

January 1, 1998

Volume

93

Issue

3-4

Start / End Page

725 / 776

Related Subject Headings

  • Fluids & Plasmas
  • 51 Physical sciences
  • 49 Mathematical sciences
  • 02 Physical Sciences
  • 01 Mathematical Sciences