Curvature diffusion of planar curves with generalised Neumann boundary conditions inside cones

Gazwani, Mashniah; McCoy, James

Title: Curvature diffusion of planar curves with generalised Neumann boundary conditions inside cones
Creator: Gazwani, Mashniah; McCoy, James
Relation: Communications on Pure and Applied Analysis Vol. 23, Issue 1, p. 131-143
Publisher Link: http://dx.doi.org/10.3934/cpaa.2024003
Publisher: American Institute of Mathematical Sciences (AIMS)
Resource Type: journal article
Date: 2024
Description: We study families of smooth immersed regular planar curves α:[−1,1]x[0,T)→R2 satisfying the fourth order nonlinear curve diffusion flow with generalised Neumann boundary conditions inside cones. We show that if the initial curve has sufficiently small oscillation of curvature then this remains so under the flow. Such families of evolving curves either exist for a finite time, when an end of the curve has reached the tip of the cone or the curvature has become unbounded in L2, or they exist for all time and converge exponentially in the C∞- topology to a circular arc that, together with the cone boundary encloses the same area as that of the initial curve and cone boundary. The same kind of result is possible for the higher order polyharmonic curve diffusion flows with appropriate boundary conditions; in particular in the sixth order case the smallness condition on the oscillation of curvature is exactly the same as for curve diffusion.
Subject: curve diffusion flow; fourth order geometric evolution equation; Neumann boundary condition; cones
Identifier: http://hdl.handle.net/1959.13/1500887
Identifier: uon:55032
Identifier: ISSN:1534-0392
Language: eng
Reviewed

Hits: 1742
Visitors: 1740
Downloads: 0

		Thumbnail	File	Description	Size	Format