The global estimate for regular axially-symmetric solutions to the Navier Stokes equations coupled with the heat conduction

Abstract

The axially-symmetric solutions to the Navier-Stokes equations coupled with the heat conduction are considered. in a bounded cylinder ⊂ R3. We assume that vr, v, ω vanish on the lateral part S1 of the boundary ∂ and vz, ω, ∂z v vanish on the top and bottom of the cylinder, where we used standard cylindrical coordinates and ω=rot v is the vorticity of the fluid. Moreover, vanishing of the heat flux through the boundary is imposed. Assuming existence of a sufficiently regular solution we derive a global a priori estimate in terms of data. The estimate is such that a global regular solutions can be proved. We prove the estimate because some reduction of nonlinearity are found.Moreover, deriving the global estimate for a local solution implies a possibility of its extension in time as long as the estimate holds.