A New Exact Solution of Burgers’ Equation with Linearized Solution

A New Exact Solution of Burgers’ Equation with Linearized Solution

This paper considers a general Burgers’ equation with the nonlinear term coefficient being an arbitrary constant. Two identical solutions of the general Burgers’ equation are separately derived by a direct integration method and the simplest equation method with the Bernoulli equation being the simp...

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Veröffentlicht in:Mathematical problems in engineering 2015-01, Vol.2015 (2015), p.1-7
Hauptverfasser: Kuo, Chun-Ku, Lee, Sen-Yung
Format: Artikel
Sprache:eng
Schlagworte:
Burgers equation
Coefficients
Constants
Discontinuity
Engineering
Exact solutions
Linearity
Mathematical analysis
Mechanical engineering
Methods
Nonlinearity
Optimization
Ordinary differential equations
Partial differential equations
Perturbation methods
Reynolds number
Transforms
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Zusammenfassung:This paper considers a general Burgers’ equation with the nonlinear term coefficient being an arbitrary constant. Two identical solutions of the general Burgers’ equation are separately derived by a direct integration method and the simplest equation method with the Bernoulli equation being the simplest equation. The proposed exact solutions overcome the long existing problem of discontinuity and can be successfully reduced to linearity, while the nonlinear term coefficient approaches zero. In addition, a general Cole-Hopf transform is introduced. Finally, the proposed derived solution is compared with the perturbation solution and other existing exact solutions. A new phenomenon, which we named “kink sliding,” is observed.
ISSN:1024-123X
1563-5147
DOI:10.1155/2015/414808