Periodic Waves for the Regularized Camassa-Holm Equation: Existence and Spectral Stability

Abstract: In this paper, we consider the existence and spectral stability of periodic traveling wave solutions for the regularized Camassa-Holm equation. For the existence of periodic waves, we employ tools from bifurcation theory to construct waves with the zero mean property and prove that waves with the same property may not exist for the well known Camassa-Holm equation. Regarding the spectral stability, we analyze the difference between the number of negative eigenvalues of a convenient linear operator, restricted to the space constituted by zero-mean periodic functions, and the number of negative eigenvalues of the matrix formed by the tangent space associated with the low-order conserved quantities of the evolution model. We also discuss the problem of orbital stability in the energy space.