Advertisement

Accurate solution of several complicated problems

  • Y. -l. Zhu
  • X. -h. Wu
  • L. -a. Ni
  • Y. Wang
Contributed Papers
Part of the Lecture Notes in Physics book series (LNP, volume 218)

Keywords

Shock Wave Flow Field Accurate Solution Mesh Point Nonconvex Problem 
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.

Preview

Unable to display preview. Download preview PDF.

Unable to display preview. Download preview PDF.

References

  1. Ni, L.-a., Wu, X.-h., Wang, Y. and Zhu, Y.-l. (1984): Quantitative comparison among several difference schemes, Journal of Computational Mathematics, vol.2, No.4 (to appear).Google Scholar
  2. Wu, X.-h., Huang, D. and Zhu, Y.-l. (1983): Numerical computation of the flow with a shock wave passing through a “strong explosion” center, Journal of Computational Mathematics, Vol.1, No.3, 247–258.Google Scholar
  3. Wu, X.-h., Wang, Y., Teng, Z.-h. and Zhu, Y.-l. (1984a): Numerical computation of flow field with deflagration and detonation, Journal of Computational Mathematics, Vol.2, No.3 (to appear).Google Scholar
  4. Wu, X.-h., and Zhu, Y.-l. (1984b): A scheme of the singularity-separating method for the nonconvex problem, Report of the Computing Center of Academia Sinica, Beijing, China.Google Scholar
  5. Zhu, Y.-l., Chen, B.-m., Wu, X.-h. and Xu, Q-s. (1982): Some new developments of the singularity-separating difference method, Lecture Notes in Physics, Vol.170, Spinger-Verlag 553–559.Google Scholar
  6. Zhu, Y.-l., Zhong, X.-c., Chen, B.-m. and Zhang, Z.-m. (1980): Difference methods for initial-boundary-value problems and flow around bodies, Science Press, Beijing, China.Google Scholar

Copyright information

© Springer-Verlag 1985

Authors and Affiliations

  • Y. -l. Zhu
    • 1
  • X. -h. Wu
    • 1
  • L. -a. Ni
    • 1
  • Y. Wang
    • 1
  1. 1.The Computing Center of Academia SinicaBeijingChina

Personalised recommendations