Modulational instability of small amplitude periodic traveling waves in the b-family of Novikov equation

Abstract

We study the modulational instability of smooth, small-amplitude periodic traveling wave solutions to the b-family of Novikov equation with cubic nonlinearity with an arbitrary coefficient b>0. Our approach is based on applying spectral perturbation theory to the corresponding linearization process. We derive a modulation instability index dependent on the nonlinear parameter b and the fundamental wave number, and prove that when this index is negative, sufficiently small periodic traveling waves in the Novikov equation b-family exhibit spectral instability to long-wavelength perturbations. This confirms the well-known Benjamin-Feir instability in the b-family of Novikov equation.