Orbital Stability of Periodic Traveling Waves in the $b$-Camassa-Holm Equation (2309.17289v2)

Abstract: In this paper, we identify criteria that guarantees the nonlinear orbital stability of a given periodic traveling wave solution within the b-family Camassa-Holm equation. These periodic waves exist as 3-parameter families (up to spatial translations) of smooth traveling wave solutions, and their stability criteria are expressed in terms of Jacobians of the conserved quantities with respect to these parameters. The stability criteria utilizes a general Hamiltonian structure which exists for every $b>1$, and hence applies outside of the completely integrable cases ($b=2$ and $b=3$).