Global Smooth Solutions to a System of Dissipative Nonlinear Evolution Equations

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Abstract

The existence and uniqueness are proved for global classical solutions of the following initial-boundary problem for the system of parabolic equations which is proposed by Hsieh as a substitute for the Rayleigh-Benard equation and can lead to Lorenz equations: {ψ_t = -(σ - α)ψ - σθ_x, + αψ_{xx} θ_t = -(1- β)θ + vψ_x + (ψθ)_x + βθ_{xx} ψ(0,t) = ψ(1,t) = 0, θ_x(0,t) = θ_x(1,t) = 0 ψ(x,0) = ψ_0(x), θ(x,0) = θ_0(x)

Keywords:

System of parabolic equations;nonlinear;initial-boundary problem;global classical solution
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Global Smooth Solutions to a System of Dissipative Nonlinear Evolution Equations. (1997). Journal of Partial Differential Equations, 10(2), 158-168. https://www.global-sci.com/index.php/jpde/article/view/3852