On the initial-boundary value problem for the 2D partially dissipative Oldroyd-B model: global well-posedness and large time stability
Abstract
This paper establishes the global well-posedness of solutions to the Oldroyd-B model with purely horizontal viscosity and arbitrarily large initial data in two-dimensional settings, including the full space R2, the partially periodic domain T×R and the fully periodic torus T2, where T represents the one-dimensional periodic torus. Our analysis relies on energy methods to derive key a priori estimates that capture the anisotropic regularization induced by horizontal viscosity. Furthermore, for the cases of spatial domains T×R and T2, we further investigate the long-time behavior of solutions with small initial data. The compactness along the horizontal direction plays a pivotal role in constructing uniform-in-time estimates, ultimately leading to exponential decay of solutions as t∞. This decay mechanism reveals how geometric constraints enhance the dissipation in viscoelastic flows.
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