The motion of whips and chains

Abstract

We study the motion of an inextensible string (a whip) fixed at one point in the absence of gravity, satisfying the equations ηtt = ∂s(σ ηs), σss- ηss2 = - ηst2, ηs2 1 with boundary conditions η(t,1)=0 and σ(t,0)=0. We prove local existence and uniqueness in the space defined by the weighted Sobolev energy Σ=0m ∫01 s ∂sηt2 \, ds + ∫01 s+1 ∂s+1η2 \, ds, when m 3. In addition we show persistence of smooth solutions as long as the energy for m=3 remains bounded. We do this via the method of lines, approximating with a discrete system of coupled pendula (a chain) for which the same estimates hold.