Bibliographic Details
| Title: |
The well-posedness of three-dimensional Navier-Stokes and magnetohydrodynamic equations with partial fractional diffusion. |
| Authors: |
Ma, Qibo, Li, Li |
| Source: |
Discrete & Continuous Dynamical Systems - Series B; Sep2025, Vol. 30 Issue 9, p1-32, 32p |
| Subject Terms: |
NAVIER-Stokes equations, HEAT equation, DIFFERENTIAL equations, MAGNETIC fields, VELOCITY |
| Abstract: |
It is well-known that if one replaces standard velocity and magnetic diffusion by $ (-\Delta)^\alpha u $ and $ (-\Delta)^\beta b $ respectively, the magnetohydrodynamic equations are well-posed for $ \alpha\ge\frac{5}{4} $ and $ \alpha + \beta \ge \frac{5}{2} $. This paper considers the 3D Navier-Stokes and magnetohydrodynamic equations with partial fractional hyper-diffusion. It is proved that when each component of the velocity and magnetic field lacks diffusion along some direction, the existence and conditional uniqueness of the solution still hold. This paper extends the previous results in (Yang, Jiu and Wu J. Differential Equations 266(1): 630-652, 2019) to a more general case. [ABSTRACT FROM AUTHOR] |
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| Database: |
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