Waves of maximal height for a class of nonlocal equations with inhomogeneous symbols

Abstract

In this paper, we consider a class of nonlocal equations where the convolution kernel is given by a Bessel potential symbol of order α for α > 1. Based on the properties of the convolution operator, we apply a global bifurcation technique to show the existence of a highest, even, 2π-periodic traveling-wave solution. The regularity of this wave is proved to be exactly Lipschitz.