Liancun Zheng, Fei Ma, Jing Zhu, and Xinxin Zhang, Analytic decomposition and numerical procedure for solving the singular boundary value problem arising in viscous flows, J. Univ. Sci. Technol. Beijing, 13(2006), No. 3, pp. 226-229. https://doi.org/10.1016/S1005-8850(06)60048-0
Cite this article as:
Liancun Zheng, Fei Ma, Jing Zhu, and Xinxin Zhang, Analytic decomposition and numerical procedure for solving the singular boundary value problem arising in viscous flows, J. Univ. Sci. Technol. Beijing, 13(2006), No. 3, pp. 226-229. https://doi.org/10.1016/S1005-8850(06)60048-0
Liancun Zheng, Fei Ma, Jing Zhu, and Xinxin Zhang, Analytic decomposition and numerical procedure for solving the singular boundary value problem arising in viscous flows, J. Univ. Sci. Technol. Beijing, 13(2006), No. 3, pp. 226-229. https://doi.org/10.1016/S1005-8850(06)60048-0
Citation:
Liancun Zheng, Fei Ma, Jing Zhu, and Xinxin Zhang, Analytic decomposition and numerical procedure for solving the singular boundary value problem arising in viscous flows, J. Univ. Sci. Technol. Beijing, 13(2006), No. 3, pp. 226-229. https://doi.org/10.1016/S1005-8850(06)60048-0
An efficient analytical decomposition technique was presented for solving the singular nonlinear boundary value problem arising in viscous flow when the Crocco variable was introduced. The approximate analytical solution may be represented in terms of a rapid convergent power series with elegantly computable terms. The reliability and efficiency of the approximate solutions were verified by numerical ones in the literature. The approximate analytical solutions can be successfully applied to give the values of skin friction coefficient.
An efficient analytical decomposition technique was presented for solving the singular nonlinear boundary value problem arising in viscous flow when the Crocco variable was introduced. The approximate analytical solution may be represented in terms of a rapid convergent power series with elegantly computable terms. The reliability and efficiency of the approximate solutions were verified by numerical ones in the literature. The approximate analytical solutions can be successfully applied to give the values of skin friction coefficient.