Uniform local well-posedness and inviscid limit for the Benjamin-Ono-Burgers equation
Abstract
In this paper, we study the Cauchy problem for the Benjamin-Ono-Burgers equation ∂t u-ε ∂x2 u+H∂x2u+u ux=0, where H denotes the Hilbert transform. We obtain that it is uniformly locally well-posed for small data in the refined Sobolev space Hσ(R)(σ≥ 0), whose low-frequency part is scaling critical and high-frequency part is equal to Sobolev space Hσ(σ≥ 0). Furthermore, we also obtain its inviscid limit behavior in Hσ(R)(σ≥ 0).
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