Stationary Solutions of the Curvature Preserving Flow on Space Curves

Abstract

We study a geometric flow on curves, immersed in R3, that have strictly positive torsion. The evolution equation is given by Xt=1τ B where τ is the torsion and B is the unit binormal vector. In the case of constant curvature, we find all of the stationary solutions and linearize the PDE for torsion around stationary solutions admitting an explicit formula. Afterwards, we prove the L2(R) linear stability of the stationary solutions corresponding to helices with constant curvature and constant torsion.