On iterative solution methods for systems of partial differential equations
Conference paper
First Online:
Keywords
Hyperbolic System Evolution Problem Homogeneous Boundary Condition Transonic Flow Transient Error
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.
5. References
- 1.WIRZ, H.J.: Relaxation methods for time dependent conservation equations in fluid mechanics. AGARD LS 86, 1977.Google Scholar
- 2.PEACEMAN, D.W. & RACHFORD, H.H.: The numerical solution of parabolic and elliptic differential equations. SIAM 3, 1955, pp 28–41.MathSciNetMATHGoogle Scholar
- 3.FRANKEL, S.P.: Convergence rates of iterative treatments of partial differential equations. MTCA, Vol. 4, 1950, pp 65–75.MathSciNetGoogle Scholar
- 4.YOUNG, D.: Iterative methods for solving partial differential equations of elliptic type. Am. Math. Soc. Transact., Vol. 75, 1954, pp 92–111.CrossRefMATHGoogle Scholar
- 5.GARABEDIAN, P.: Estimation of the relaxation factor for small mesh size. Math. Tables Aids Comp. Vol. 10, 1956, pp 183–185.MathSciNetCrossRefMATHGoogle Scholar
- 6.VAINBERG, M.M.: Variational method and method of monotone operators in the theory of nonlinear equations. John Wiley, New York, 1973.MATHGoogle Scholar
- 7.LAX, P.D. & WENDROFF, B.: Difference schemes with high order of accuracy for solving hyperbolic equations. Comm. Pure & Appl. Math., Vol. 17, 1964, pp 381.MathSciNetCrossRefMATHGoogle Scholar
- 8.LAX, P.D.: Hyperbolic systems of conservation laws and the mathematical theory of shock waves. SIAM, Philadelphia, 1973.CrossRefMATHGoogle Scholar
Copyright information
© Springer-Verlag 1978