The periodic μ-b-equation and Euler equations on the circle

Abstract

In this paper, we study the μ-variant of the periodic b-equation and show that this equation can be realized as a metric Euler equation on the Lie group ∞() if and only if b=2 (for which it becomes the μ-Camassa-Holm equation). In this case, the inertia operator generating the metric on ∞() is given by L=μ-∂x2. In contrast, the μ-Degasperis-Procesi equation (obtained for b=3) is not a metric Euler equation on ∞() for any regular inertia operator A∈ Lissym(C∞()). The paper generalizes some recent results of [J. Escher and B. Kolev, DOI 10.1007/s00209-010-0778-2], [J. Escher and J. Seiler, J. Math. Phys. 51 (2010), 053101.1-053101.6] and [B. Kolev, Wave Motion 46 (2009), 412-419].