On regularity criteria for the n -dimensional Navier—Stokes equations in terms of the pressure. Holt, Rinehart and Winston Inc. Regularity criteria for the generalized MHD equations.
Mathematics Subject Classification 1970-2010.msc.pdf
Nauk 583—44 Google Scholar. Cite article Classificatiln to cite? Regularity criterion for weak solutions to the Navier—Stokes equations in terms of the gradient of the pressure.
On the regularity criterion of weak solution for the 3D viscous magneto-hydrodynamics equations. Remarks on regularities for the 3D MHD equations. On partial subjecy results for the Navier—Stokes equations. On the regularity of weak solutions to the mathemstics equations.
ID, 6pp Google Scholar. This is a preview of subscription content, log in to check access. Regularity criteria for the generalized viscous MHD equations. Conditions implying regularity of the three dimensional Navier—Stokes equation. Logarithmically improved criteria for Euler and Navier—Stokes equationssubmitted Google Scholar. Graduate Studies in Mathematics, vol. In this paper, logarithmically improved regularity criteria for the Navier—Stokes and the MHD equations are established in terms of both pdg vorticity field and the pressure.
Translated and revised from the Spanish original by David Cruz-Uribe. Commutator estimates and the Euler and Navier—Stokes equations. Some mathematical questions related to the MHD equations.
Mathematics Subject Classification testkey | Mathematical Logic | Model Theory
Journal of Mathematical Fluid Mechanics. Unable to display preview.
Interior regularity of weak solutions of the time-dependent Navier—Stokes equation. The critical Sobolev inequalities in Besov spaces and regularity criterion to some semi-linear evolution equations.
Regularity criteria for the viscous Camassa—Holm equations. Logarithmically improved regularity criteria for the Navier—Stokes equations in multiplier spaces. The initial value problem for the Navier—Stokes equations. Regularity criteria for the solutions to the 3D MHD equations in the multiplier space.