Numerical solution of stiff differential equations via Haar wavelets

@article{Hsiao2005NumericalSO,
  title={Numerical solution of stiff differential equations via Haar wavelets},
  author={Chun-hui Hsiao},
  journal={Int. J. Comput. Math.},
  year={2005},
  volume={82},
  pages={1117-1123}
}
Stiffness [1] occurs in a differential equation where there are two or more very different time scales of the independent variable on which the dependent variables are changing. In practical solution of stiff problems, the choice of the solution steps is critical. Large steps will lose some fast changing properties of the system, whereas small steps will introduce too many round-off errors and cause numerical instability. In ref. [2], Carroll presents an exponentially fitted scheme for solving… CONTINUE READING

References

Publications referenced by this paper.
Showing 1-3 of 3 references

Solving Ordinary Differential Equations II, Stiff and Differential Alagebraic Problems (New York: Springer Verlag)

E. Hairer, G. Wanner
1996
View 3 Excerpts
Highly Influenced

Computing Methods for Scientists and Engineers (Oxford

L. Fox, D. F. Mayers
1968
View 3 Excerpts
Highly Influenced

Computational Mathematics and Mathematical Physics 27, 30–41

B. V. Pavlov, O. E. Rodionova
1987
View 1 Excerpt

Similar Papers

Loading similar papers…