Well-posedness issues for the generalized Benjamin--Bona--Mahony equation

Abstract

In this paper, we consider the one-dimensional generalized Benjamin--Bona--Mahony (gBBM) equation \[(1-∂x2)ut+(u+up)x=0, p=2,3,4,…,\] posed either on the real line R or on the torus T. This equation may be viewed as a regularized model for the propagation of long-crested surface water waves. The main results of this work are threefold: First, we establish unconditional local well-posedness in the class C([0,T];Hs) without imposing any auxiliary spaces for \[s p-22p,\] which is sharp in the sense that the multilinear estimate in Hs is optimal. In addition, we prove unconditional uniqueness for all distributional solutions in L∞((0,T);Hs). Second, we show that below this regularity threshold, the flow map cannot be of class Cp. Precisely, if the flow map is well-defined and continuous near the origin from Hs to C([0,T];Hs) for every s<p-22p, then it cannot be of class Cp at the origin. The proof is based on a high-to-low frequency interaction, implemented differently on R and T. Third, in the odd-power case, we prove global well-posedness below H1 in the following cases: p=3 with s 14, and p=5 with s>12. To the best of our knowledge, these are the first global well-posedness results in the Sobolev framework for the generalized BBM equation below H1. The argument is based on the Bona--Tzvetkov approach BT, while being initially inspired by Bourgain's high--low method Bourgain1998, Bourgain1999. A key new ingredient is the use of a Hamiltonian conservation law below the H1 energy level. This allows us to control the higher-degree nonlinear contributions in the energy estimate, thereby preventing the Gr\"onwall iteration from blowing up.

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