Existence and uniqueness results for viscous, heat-conducting 3-D fluid with vacuum

Abstract

We consider the 3-D full Navier-Stokes equations whose the viscosity coefficients and the thermal conductivity coefficient depend on the density and the temperature. We prove the local existence and uniqueness of the strong solution in a domain ⊂R3. The initial density may vanish in an open set and could be a bounded or unbounded domain. We also prove a blow-up criterion for the solution. Finally, we show the blow-up of the smooth solution to the compressible Navier-Stokes equations in Rn (n≥1) when the initial density has compactly support and the initial total momentum is nonzero.

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