An Explicit Formula for the Benjamin-Ono Hierarchy with Applications to Traveling Waves and Zero-Dispersion Limits

Abstract

In this paper, we first extend the explicit formula gerard2023explicit for the classical Benjamin-Ono equation to each flow of the Benjamin-Ono hierarchy on line. We then use this representation to derive two main applications. First, we obtain a complete classification of traveling wave solutions for all higher-order flows in the hierarchy. Second, we analyze the zero-dispersion limit for the corresponding small-dispersion flows. For every fixed time t∈ R, we prove that, at any time, the solution converges weakly in L2( R) as the dispersion parameter tends to 0, and we provide a geometric characterization of the limit in terms of an alternating sum, which yields the higher-order analogue of the formula obtained in miller2011zero, Gerard2025small for the Benjamin-Ono equation.