A regularity criterion of weak solutions to the 3D Boussinesq equations

Ahmad Mohammed Alghamdi; Sadek Gala; Maria Alessandra Ragusa; Ahmad Mohammed Alghamdi; Sadek Gala; Maria Alessandra Ragusa

doi:10.3934/Math.2017.2.451

AIMS Mathematics

2017, Volume 2, Issue 3: 451-457. doi: 10.3934/Math.2017.2.451

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Research article

A regularity criterion of weak solutions to the 3D Boussinesq equations

1.
Department of Mathematical Science, Faculty of Applied Science, Umm Alqura University, P. O. Box 14035, Makkah 21955, Saudi Arabia
2.
Department of Mathematics, University of Mostaganem, Algeria
3.
Dipartimento di Mathematica e Informatica, Università di Catania, Viale Andrea Doria, 6,95125 Catania, Italy
4.
RUDN University, 6 Miklukho -Maklay St, Moscow, 117198, Russia

Received: 02 June 2017 Accepted: 08 August 2017 Published: 25 August 2017

In this note, a regularity criterion of weak solutions to the 3D-Boussinesq equations with respect to Serrin type condition under the framework of Besov space $\dot B_{\infty, \infty.}^r$. It is shown that the weak solution $(u, \theta)$ is regular on $% (0, T] $ if $u$ satisfies $ \int\limits_0^T {\left\| {u( \cdot ,t)} \right\|_{\dot B_{\infty ,\infty .}^r}^{\frac{2}{{1 + r}}}} dt \lt \infty , $ for $ 0 \lt r \lt 1 $. This result improves some previous works.
- Regularity criterion,
- Boussinesq equations,
- a priori estimates
Citation: Ahmad Mohammed Alghamdi, Sadek Gala, Maria Alessandra Ragusa. A regularity criterion of weak solutions to the 3D Boussinesq equations[J]. AIMS Mathematics, 2017, 2(3): 451-457. doi: 10.3934/Math.2017.2.451

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Abstract

In this note, a regularity criterion of weak solutions to the 3D-Boussinesq equations with respect to Serrin type condition under the framework of Besov space $\dot B_{\infty, \infty.}^r$. It is shown that the weak solution $(u, \theta)$ is regular on $% (0, T] $ if $u$ satisfies $ \int\limits_0^T {\left\| {u( \cdot ,t)} \right\|_{\dot B_{\infty ,\infty .}^r}^{\frac{2}{{1 + r}}}} dt \lt \infty , $ for $ 0 \lt r \lt 1 $. This result improves some previous works.

References

[1]	J. R. Cannon and E. Dibenedetto, The initial problem for the Boussinesq equation with data in L^p, Lecture Notes in Mathematics, Springer, Berlin, 771 (1980), 129-144.
[2]	L. Caffarelli, R. Kohn, and L. Nirenberg, Partial regularity of suitable weak solutions of the navierstokesequations Comm. Pure Appl. Math., 35 (1982), 771-831.
[3]	D. Chae and H.-S. Nam, Local existence and blow-up criterion for the Boussinesq equations, Proc.Roy. Soc. Edinburgh, Sect. A, 127 (1997), 935-946.
[4]	B. Q. Dong, J. Song, and W. Zhang, Blow-up criterion via pressure of three-dimensional Boussinesqequations with partial viscosity (in Chinese), Sci. Sin. Math., 40 (2010), 1225-1236.
[5]	J. Fan and Y. Zhou, A note on regularity criterion for the 3D Boussinesq system with partial viscosity, Appl. Math. Lett., 22 (2009), 802-805.
[6]	J. Fan and T. Ozawa, Regularity criteria for the 3D density-dependent Boussinesq equations, Nonlinearity, 22 (2009), 553-568.
[7]	S. Gala, On the regularity criterion of strong solutions to the 3D Boussinesq equations, ApplicableAnalysis, 90 (2011), 1829-1835.
[8]	S. Gala and M.A. Ragusa, Logarithmically improved regularity criterion for the Boussinesq equationsin Besov spaces with negative indices, Applicable Analysis, 95 (2016), 1271-1279.
[9]	S. Gala, Z. Guo, and M. A. Ragusa, A remark on the regularity criterion of Boussinesq equationswith zero heat conductivity, Appl. Math. Lett., 27 (2014), 70-73.
[10]	Z. Guo and S. Gala, Regularity criterion of the Newton-Boussinesq equations in $\mathbb{R}^3$, Commun. PureAppl. Anal., 11 (2012), 443-451.
[11]	J. Geng and J. Fan, A note on regularity criterion for the 3D Boussinesq system with zero thermalconductivity, Appl. Math. Lett., 25 (2012), 63-66.
[12]	E. Hopf, Über die Anfangswertaufgabe für die hydrodynamichen Grundgleichungen, Math. Nach. , 4 (1950/1951), 213-231.
[13]	Y. Jia, X. Zhang, and B. Dong, Remarks on the blow-up criterion for smooth solutions of theBoussinesq equations with zero diffusion, C.P.A.A., 12 (2013), 923-937.
[14]	T. Kato and G. Ponce, Commutator estimates and the Euler and Navier-Stokes equations, Commun.Pure Appl. Math., 41 (1988), 891-907.
[15]	C. Kenig, G. Ponce, and L. Vega, Well-posedness of the initial value problem for the Korteweg-de-Vries equation, J. Amer. Math. Soc., 4 (1991), 323-347.
[16]	J. Leray, Sur le mouvement d'un liquide visqueux emplissant l'espace, Acta. Math., 63 (1934), 183-248.
[17]	A. Majda, Introduction to PDEs and Waves for the Atmosphere and Ocean, Courant Lecture Notesin Mathematics, AMS/CIMS, 9 (2003).
[18]	M. Mechdene, S. Gala, Z. Guo, and M.A. Ragusa, Logarithmical regularity criterion of the threedimensionalBoussinesq equations in terms of the pressure, Z. Angew. Math. Phys., 67 (2016), 67-120.
[19]	G. Prodi, Un teorema di unicità per le equazioni di Navier-Stokes, Ann. Mat. Pura Appl., 48 (1959), 173-182.
[20]	J. Serrin, The initial value problem for the Navier-Stokes equations, In Nonlinear Problems (Proc. Sympos. , Madison, Wis. ), Univ. of Wisconsin Press, Madison, Wis. , 1963, 69-98.
[21]	M. Struwe, On partial regularity results for the Navier-Stokes equations, Comm. Pure Appl. Math., 41 (1988), 437-458.
[22]	N. Ishimura and H. Morimoto, Remarks on the blow-up criterion for the 3D Boussinesq equations, Math. Meth. Appl. Sci., 9 (1999), 1323-1332.
[23]	H. Triebel, Theory of Function Spaces, Birkhäuser Verlag, Basel, 1983.
[24]	H. Qiu, Y. Du, and Z. Yao, Blow-up criteria for 3D Boussinesq equations in the multiplier space, Comm. Nonlinear Sci. Num. Simulation, 16 (2011), 1820-1824.
[25]	H. Qiu, Y. Du, and Z. Yao, A blow-up criterion for 3D Boussinesq equations in Besov spaces, Nonlinear Analysis TMA, 73 (2010), 806-815.
[26]	Z. Xiang, The regularity criterion of the weak solution to the 3D viscous Boussinesq equations inBesov spaces, Math. Methods Appl. Sci., 34 (2011), 360-372.
[27]	F. Xu, Q. Zhang, and X. Zheng, Regularity Criteria of the 3D Boussinesq Equations in the Morrey-Campanato Space, Acta Appl. Math., 121 (2012), 231-240.
[28]	Z. Ye, A Logarithmically improved regularity criterion of smooth solutions for the 3D Boussinesqequations, Osaka J. Math., 53 (2016), 417-423.

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