On permanent and breaking waves in hyperelastic rods and rings

Abstract

We prove that the only global strong solution of the periodic rod equation vanishing in at least one point (t0,x0) is the identically zero solution. Such conclusion holds provided the physical parameter γ of the model (related to the finger deformation tensor) is outside some neighborhood of the origin and applies in particular for the Camassa--Holm equation, corresponding to γ=1. We also establish the analogue of this unique continuation result in the case of non-periodic solutions defined on the whole real line with vanishing boundary conditions at infinity. Our analysis relies on the application of new local-in-space blowup criteria and involves the computation of several best constants in convolution estimates and weighted Poincar\'e inequalities.