Analysis of the sine-Gordon equation with a nonlinear δ-potential

Abstract

This paper is devoted to the analysis of the following nonlinear wave equation \[ utt - uxx + (1 + qδ0(x)) u = 0, \] where δ0 = δ0(x) is the Dirac delta function centered at the origin and q ∈ R is a constant. Equations of this form arise in the study of propagating solitons in the presence of a localized inhomogeneity. It is proved that the Cauchy problem for this equation is globally well-posed in the energy space H1 × L2. A complete characterization of stationary waves in the energy space, based on the parameter q, is also provided. Finally, a criterion to determine the stability or instability of the stationary waves, which depends upon the sign of the parameter q, is established.