Long time well-posedness for the 3D Prandtl boundary layer equations with a special structure
Abstract
This paper is concerned with existence, uniqueness and stability of the solution for the 3D Prandtl equation in a polynomial weighted Sobolev space. The main novelty of this paper is to directly prove the long time well-posedness to 3D Prandtl equation under monotonicity condition ∂z u >0 and a special structural assumption v=Ku (∂z(vu) 0) by the energy method. Moreover, the solution's lifespan can be extended to any large T, provided that the initial data with a perturbation lie in the monotonic shear profile of small size e-T. This result extends the local well-posedness results established by Liu-Wang-Yang Liu-Wang-Yang-1-2017 (Adv. Math. 308 (2017) 1074-1126) and Qin-Wang Qin-Wang-2024 (J. Math. Pure. Appl. 194 (2025) 103670) for the 3D Prandtl equations to long-time well-posedness.
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