论文信息 - Nonhomogeneous Boundary Value Problem for One-Dimensional Compressible Viscous Micropolar Fluid Model: Regularity of the Solution

Nonhomogeneous Boundary Value Problem for One-Dimensional Compressible Viscous Micropolar Fluid Model: Regularity of the Solution

An initial-boundary value problem for 1D flow of a compressible viscous heat-conducting micropolar fluid is considered; the fluid is thermodynamically perfect and polytropic. Assuming that the initial data are Hölder continuous on and transforming the original problem into homogeneous one, we prove that the state function is Hölder continuous on , for each . The proof is based on a global-in-time existence theorem obtained in the previous research paper and on a theory of parabolic equations.

Nermina Mujaković | N. Mujakovic

[1] Nermina Mujaković,et al. One-dimensional flow of a compressible viscous micropolar fluid: a local existence theorem , 1998 .

[2] Nermina Mujaković,et al. Non-homogeneous boundary value problem for one-dimensional compressible viscous micropolar fluid model: a global existence theorem , 2009 .

[3] J. Lions,et al. Non-homogeneous boundary value problems and applications , 1972 .

[4] Nermina Mujaković,et al. Non-homogeneous boundary value problem for one-dimensional compressible viscous micropolar fluid model: a local existence theorem , 2007 .

[5] N. Mujakovic. ONE-DIMENSIONAL FLOW OF A COMPRESSIBLE VISCOUS , 1998 .

[6] Glasnik Matematički. ONE-DIMENSIONAL FLOW OF A COMPRESSIBLE VISCOUS MICROPOLAR FLUID : A GLOBAL EXISTENCE THEOREM , 2007 .