Nonlinear dynamics of filaments. IV Spontaneous looping of twisted elastic rods

Abstract

Everyday experience shows that twisted elastic fllaments spontaneously form loops. We model the dynamics of this looping process as a sequence of bifurcations of the solutions to the Kirchhofi equation describing the evolution of thin elastic fllament. The control parameter is taken to be the initial twist density in a straight rod. The flrst bifurcation occurs when the twisted straight rod deforms into a helix. This helix is an exact solution of the Kirchhofi equations whose stability can be studied. The secondary bifurcation is reached when the helix itself becomes unstable and the localization of the post-bifurcation modes is demonstrated for these solutions. Finally, the tertiary bifurcation takes place when a loop forms at the middle of the rod and the looping becomes ineluctable. Emphasis is put on the dynamical character of the phenomena by studying the dispersion relation and deriving amplitude equations for the difierent conflgurations.