https://orcid.org/0000-0002-3711-3506
References
- Mulone G, Rionero S. Necessary and sufficient conditions for nonlinear stability in the magnetic Bénard problem. Arch Ration Mech Anal. 2003;166:197–218. doi: 10.1007/s00205-002-0230-9
- Nakamura MA. On the magnetic Bénard problem. J Fac Sci Univ Tokyo Sect IA Math. 1991;38:359–393.
- Zhou Y, Fan J, Nakamura G. Global cauchy problem for a 2D magnetic Bénard problem with zero thermal conductivity. Appl Math Lett. 2013;26:627–630. doi: 10.1016/j.aml.2012.12.019
- Cheng J, Du L. On two-dimensional magnetic Bénard problem with mixed partial viscosity. J Math Fluid Mech. 2015;17:769–797. doi: 10.1007/s00021-015-0224-7
- Ma L, Zhang L. Global existence of weak solution and regularity criteria for the 2D Bénard system with partial dissipation. Bound Value Probl. 2018. doi:10.1186/s13661-018-0988-9
- Lin H, Du L. Regualrity criteria for incompressible magnetohydrodynamics equations in three dimensions. Nonlinearity. 2013;26:219–239. doi: 10.1088/0951-7715/26/1/219
- Du L, Zhou D. Global well-posedness of two-dimensional magnetohydrodynamic flows with partial dissipation and magnetic diffusion. SIAM J Math Anal. 2015;47:1562–1589. doi: 10.1137/140959821
- Ma L. Global existence of smooth solutions for three-dimensional magnetic Bénard system with mixed partial dissipation, magnetic diffusion and thermal diffusivity. J Math Anal Appl. 2018;461:1639–1652. doi: 10.1016/j.jmaa.2017.12.036
- Zhang Z, Tang T. Global regularity for a special family of axisymmetric solutions to the three-dimensional magnetic Bénard problem. Appl Anal. 2017. doi:10.1080/00036811.2017.1376661
- Majda A, Bertozzi A. Vorticity and incompressible flow. Cambridge: Cambridge University Press; 2001.
- Ma L. Global regularity results for the 212D magnetic Bénard system with mixed partial viscosity. Appl Anal. 2018. doi:10.1080/00036811.2017.1416103
- Ma L. Global existence of three-dimensional incompressible magneto-micropolar system with mixed partial dissipation, magnetic diffusion and angular viscosity. Comput Math Appl. 2018;75:170–186. doi: 10.1016/j.camwa.2017.09.009
- Ma L. On two-dimensional incompressible magneto-micropolar system with mixed partial viscosity. Nonlinear Anal. 2018;40:95–129. doi: 10.1016/j.nonrwa.2017.08.014
- Wang Y, Wang Y. Blow-up criterion for two-dimensional magneto-micropolar fluid equations with partial viscosity. Math Meth Appl Sci. 2011;34:2125–2135. doi: 10.1002/mma.1510
- Wang Y, Hu L, Wang Y. A Beale–Kato–Majda criterion for magneto-micropolar fluid equations with partial viscosity. Bound Value Probl. 2011;2011:1–14. Article ID 128614.
- Wang Y, Li Y, Wang Y. Blow-up criterion of smooth solutions for magneto-micropolar fluid equations with partial viscosity. Bound Value Probl. 2011;11:1–11.
- Beale JT, Kato T, Majda A. Remarks on breakdown of smooth solutions for the 3D Euler equations. Commun Math Phys. 1984;94:61–66. doi: 10.1007/BF01212349
- Kozono T, Ogawa H, Taniuchi Y. The critical Sobolev inequalities in Besov spaces and regularity criterion to some semi-linear evolution equations. Math Z. 2002;242:251–278. doi: 10.1007/s002090100332
- Chemin J-Y. Perfect incompressible fluids. New York: The Clarendon Press Oxford University Press; 1998. (Oxford Lecture Series in Mathematics and its Applications; 14). Translated from the 1995 French original by Isabelle Gallagher and Dragos Iftimie.
- Bony JM. Calcul symbolique et propagation des singularités pour les équations aux d'erivées partielles non linéaires. Ann Sci l'Ec Norm Supér. 1981;14:209–246. doi: 10.24033/asens.1404
- Chemin JY, Masmoudi N. About lifespan of regular solutions of equations related to viscoelastic fluids. SIAM J Math Anal. 2001;33:84–112. doi: 10.1137/S0036141099359317
- Fujita H, Kato T. On the Navier–Stokes initial value problem I. Arch Ration Mech Anal. 1964;16:269–315. doi: 10.1007/BF00276188
- Lei Z, Masmoudi N, Zhou Y. Remarks on the blowup criteria for Oldroyd models. J Differ Equ. 2010;248:328–341. doi: 10.1016/j.jde.2009.07.011
- Lemarié-Rieusset PG. Recent developments in the Navier–Stokes problem. Boca Raton, FL: Chapman & Hall/CRC; 2002. (Chapman & Hall/CRC Research Notes in Mathematics; 431).