Stability of two-dimensional heat-conducting incompressible motions in a cylinder

Abstract We consider the motion of an incompressible heat-conducting fluid described by the Rayleigh–Benard equations in a cylinder, where the external force depends on temperature. We assume the slip boundary conditions for the velocity and the Dirichlet condition for the temperature. First, we prove the existence of a strong global two-dimensional solution with nonvanishing in time external force. Next, we show the existence of a global three-dimensional solution to the problem assuming that its data are close to the data of the two-dimensional problem in appropriate norms. In this way we prove stability of strong two-dimensional solutions in the set of three-dimensional solutions.

[1]  Y. Kagei,et al.  Natural Convection with Dissipative Heating , 2000 .

[2]  Nonstationary Stokes System in Cylindrical Domains Under Boundary Slip Conditions , 2017 .

[3]  O. V. Besov,et al.  Integral representations of functions and imbedding theorems , 1978 .

[4]  J. Socala,et al.  Long time existence of regular solutions to 3d Navier–Stokes equations coupled with heat convection , 2011, 1103.4027.

[5]  Young's inequality for convolution and its applications in convex- and set-valued analysis , 2015 .

[6]  An L 2-maximal regularity result for the evolutionary Stokes–Fourier system , 2011 .

[7]  J. Naumann On the existence of weak solutions to the equations of non-stationary motion of heat-conducting incompressible viscous fluids , 2006 .

[8]  On the Navier-Stokes Equations with Energy-Dependent Nonlocal Viscosities , 2005 .

[9]  Hiroko Morimoto,et al.  On non-stationary boussinesq equations , 1991 .

[10]  T. Shilkin Classical Solvability of the Coupled System Modelling a Heat-Convergent Poiseuille-Type Flow , 2005 .

[11]  J. Málek,et al.  A Navier–Stokes–Fourier system for incompressible fluids with temperature dependent material coefficients , 2009 .

[12]  Gonzalo Galiano,et al.  Existence and uniqueness of solutions of the Boussinesq system with nonlinear thermal diffusion , 1998 .

[13]  O. Goncharova Unique Solvability of a Two-Dimensional Nonstationary Problem for the Convection Equations with Temperature-Dependent Viscosity , 2002 .

[14]  Y. Kagei On weak solutions of nonstationary Boussinesq equations , 1993, Differential and Integral Equations.

[15]  S. Agmon,et al.  Estimates near the boundary for solutions of elliptic partial differential equations satisfying general boundary conditions. I , 1959 .

[16]  Eduard Feireisl,et al.  On the Navier-Stokes equations with temperature-dependent transport coefficients , 2006 .

[17]  Stability of two-dimensional Navier-Stokes motions in the periodic case , 2014, 1406.0693.