On Runge-Kutta processes of high order

J. C. Butcher

doi:10.1017/S1446788700023387

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

An (explicit) Runge-Kutta process is a means of numerically solving the differential equation , at the point x = x0+h, where y, f may be vectors.

References

[1]Butcher, J. C., Coefficients for the study of Runge-Kutta integration processes, This Journal 3 (1963), 185–201.Google Scholar

[2]Kutta, W., Beitrag zur näherungsweisen Integration totaler Differentialgleichungen, Zeit. Math. Physik 46 (1901), 435–452Google Scholar

[3]Nyström, E. J., Über die numerische Integration von Differentialgleichungen, Acta Soc. Sci. Fennicae 50, No. 13 (1925).Google Scholar

[4]Huta, A., Une amélioration de la méthode de Runge-Kutta-Nyström pour la résolution numérique des équations différentielles du premier ordre, Acta Fac. Nat. Univ. Commenian. Math. 1 (1956) 201–224.Google Scholar

[5]Huta, A., Contribution à la formule de sixième ordre dans la méthode de Runge-Kutta-Nyström, Acta Fac. Nat. Univ. Comenian. Math. 2 (1957), 21–24.Google Scholar

[6]Butcher, J. C., On the integration processes of A. Huta, This Journal 3 (1963), 202–206.Google Scholar

[7]Butcher, J. C., Integration processes based on Radau quadrature formulas, Math. Comp., 18 (04, 1964).Google Scholar

[8]Butcher, J. C., Implicit Runge-Kutta processes, Math. Comp., 18 (1964), 50–64.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Butcher, J. C. 1965. On the attainable order of Runge-Kutta methods. Mathematics of Computation, Vol. 19, Issue. 91, p. 408.

Lawson, J. Douglas 1966. An Order Five Runge-Kutta Process with Extended Region of Stability. SIAM Journal on Numerical Analysis, Vol. 3, Issue. 4, p. 593.

Shintani, Hisayoshi 1966. Two-step processes by one-step methods of order 3 and of order 4. Hiroshima Mathematical Journal, Vol. 30, Issue. 2,

Luther, H. A. 1966. Further Explicit Fifth-Order Runge-Kutta Formulas. SIAM Review, Vol. 8, Issue. 3, p. 374.

Waters, John 1966. Methods of numerical integration applied to a system having trivial function evaluations. Communications of the ACM, Vol. 9, Issue. 4, p. 293.

Casadei, G. 1966. Osservazioni sulla scelta dei coeficienti del metodo di Runge-Kutta per la soluzione di sistemi di equazioni differenziali ordinarie. Calcolo, Vol. 2, Issue. S1, p. 205.

Konen, H. P. and Luther, H. A. 1967. Some Singular Explicit Fifth Order Runge-Kutta Solutions. SIAM Journal on Numerical Analysis, Vol. 4, Issue. 4, p. 607.

Lawson, J. Douglas 1967. An Order Six Runge-Kutta Process with Extended Region of Stability. SIAM Journal on Numerical Analysis, Vol. 4, Issue. 4, p. 620.

Cooper, G. J. 1967. A class of single-step methods for systems of nonlinear differential equations. Mathematics of Computation, Vol. 21, Issue. 100, p. 597.

Luther, H. A. 1968. An explicit sixth-order Runge-Kutta formula. Mathematics of Computation, Vol. 22, Issue. 102, p. 434.

Fehlberg, E. 1969. Klassische Runge-Kutta-Formeln fünfter und siebenter Ordnung mit Schrittweiten-Kontrolle. Computing, Vol. 4, Issue. 2, p. 93.

Cooper, G. J. 1969. Conference on the Numerical Solution of Differential Equations. Vol. 109, Issue. , p. 140.

Curtis, A. R. 1970. An eighth order Runge-Kutta process with eleven function evaluations per step. Numerische Mathematik, Vol. 16, Issue. 3, p. 268.

Collins, George E. 1971. The Calculation of Multivariate Polynomial Resultants. Journal of the ACM, Vol. 18, Issue. 4, p. 515.

1971. Numerical Solution of Ordinary Differential Equations. Vol. 74, Issue. , p. 39.

Verner, J. H. 1971. Conference on Applications of Numerical Analysis. Vol. 228, Issue. , p. 340.

Chakravarti, P. C. and Worland, P. B. 1971. A class of self-starting methods for the numerical solution ofy″=f(x,y). BIT, Vol. 11, Issue. 4, p. 368.

Hull, T. E. Enright, W. H. Fellen, B. M. and Sedgwick, A. E. 1972. Comparing Numerical Methods for Ordinary Differential Equations. SIAM Journal on Numerical Analysis, Vol. 9, Issue. 4, p. 603.

Cooper, G. J. and Verner, J. H. 1972. Some Explicit Runge”Kutta Methods of High Order. SIAM Journal on Numerical Analysis, Vol. 9, Issue. 3, p. 389.

Stoer, Josef and Bulirsch, Roland 1973. Einführung in die Numerische Mathematik II. Vol. 114, Issue. , p. 95.

Download full list

Article contents

On Runge-Kutta processes of high order

Extract

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests