Coefficients for the study of Runge-Kutta integration processes

Abstract: We consider a set of η first order simultaneous differential equations in the dependent variables y1, y2, …, yn and the independent variable x ⋮ No loss of gernerality results from taking the functions f1, f2, …, fn to be independent of x, for if this were not so an additional dependent variable yn+1, anc be introduced which always equals x and thus satisfies the differential equation

“…Thus, The remaining coefficients may be obtained by considering conditions (7.2) and (7.3). These give it has been verified that the coefficients satisfy all the order conditions given by Butcher [1]. A similar method may be obtained by interchanging c3 and c4 and this gives c2 E (0, 1), but some coefficients are large.…”

Semiexplicit 𝐴-stable Runge-Kutta methods

“…Thus, The remaining coefficients may be obtained by considering conditions (7.2) and (7.3). These give it has been verified that the coefficients satisfy all the order conditions given by Butcher [1]. A similar method may be obtained by interchanging c3 and c4 and this gives c2 E (0, 1), but some coefficients are large.…”

Semiexplicit 𝐴-stable Runge-Kutta methods

“…. , c 6 The exact solution of the resulted nonlinear system is out of question. Only after considering simplifying assumptions, we can use nonlinear optimization techniques to get accurate enough solutions.…”

On the modification of Differential Evolution strategy for the construction of Runge Kutta pairs

“…fj -, \i { we have many variations, among which the classical Runge-Kutta method or the Runge-Kutta-Fehlberg method is famous. A distinguished contribution for the study of the RungeKutta methods has been made by J. C. BUTCHER ( [1] ~ [4]). He determined the attainable order of the RK methods up to 10-stage formula.…”

Runge-Kutta Type Integration Formulas Including the Evaluation of the Second Derivative, Part I