摘要
The temperature-dependent incompressible nematic liquid crystal flows in a bounded domain Ω⊂RN (N=2,3) are studied in this paper. Following Danchin's method in [7], we use a localization argument to recover the maximal regularity of Stokes equation with variable viscosity, by which we first prove the local existence of a unique strong solution, then extend it to a global one provided that the initial data is a sufficiently small perturbation around the trivial equilibrium state. This paper also generalizes Hu–Wang's result in [21] to the non-isothermal case.
| 源语言 | 英语 |
|---|---|
| 页(从-至) | 5298-5329 |
| 页数 | 32 |
| 期刊 | Journal of Differential Equations |
| 卷 | 263 |
| 期 | 9 |
| DOI | |
| 出版状态 | 已出版 - 5 11月 2017 |