@Article{JPDE-35-3, author = {Xiaolei, Dong and Yuming, Qin}, title = {Global Well-Posedness of Solutions to 2D Prandtl-Hartmann Equations in Analytic Framework}, journal = {Journal of Partial Differential Equations}, year = {2022}, volume = {35}, number = {3}, pages = {289--306}, abstract = {

In this paper, we consider the two-dimensional (2D) Prandtl-Hartmann equations on the half plane and prove the  global existence and uniqueness of solutions to 2D Prandtl-Hartmann equations by using the classical energy methods in analytic framework. We prove that the lifespan of the solutions to 2D Prandtl-Hartmann equations can be extended up to $T_\varepsilon$ (see Theorem 2.1) when the strength of the perturbation is of the order of $\varepsilon$. The difficulty of solving the Prandtl-Hartmann equations in the analytic framework is the loss of $x$-derivative in the term $v\partial_yu$. To overcome this difficulty, we introduce the Gaussian weighted PoincarĂ© inequality (see Lemma 2.3). Compared to the existence and uniqueness of solutions to the classical Prandtl equations where the monotonicity condition of the tangential velocity plays a key role, which is not needed for the 2D Prandtl-Hartmann equations in analytic framework. Besides, the existence and uniqueness of solutions to the 2D MHD boundary layer where the initial tangential magnetic field has a lower bound plays an important role, which is not needed for the 2D Prandtl-Hartmann equations in analytic framework, either.

}, issn = {2079-732X}, doi = {https://doi.org/10.4208/jpde.v35.n3.7}, url = {https://global-sci.com/article/88117/global-well-posedness-of-solutions-to-2d-prandtl-hartmann-equations-in-analytic-framework} }