摘要
The initial boundary value problem of the one-dimensional magneto-hydrodynamics system, when the viscosity, thermal conductivity, and magnetic diffusion coefficients are general smooth functions of temperature, is considered in this article. A unique global classical solution is shown to exist uniquely and converge to the constant state as the time tends to infinity under certain assumptions on the initial data and the adiabatic exponent γ. The initial data can be large if γ is sufficiently close to 1.
The initial boundary value problem of the one-dimensional magneto-hydrodynamics system, when the viscosity, thermal conductivity, and magnetic diffusion coefficients are general smooth functions of temperature, is considered in this article. A unique global classical solution is shown to exist uniquely and converge to the constant state as the time tends to infinity under certain assumptions on the initial data and the adiabatic exponent γ. The initial data can be large if γ is sufficiently close to 1.
作者
苏仕斌
赵小奎
Shibin SU;Xiaokui ZHAO;School of Mathematical Sciences;Xiamen University;
基金
Supported by NNSFC(11271306)
the Natural Science Foundation of Fujian Province of China(2015J01023)
the Fundamental Research Funds for the Central Universities of Xiamen University(20720160012)
