文件名称:19680027281_1968027281
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nasa经典资料,对各种数值积分方法进行了深入分析,值得大家-the author has described a Runge-Kutta
procedure which provides a stepsize control by one or two additional
evaluations of the differential equations. This earlier procedure, requiring
an m-fold differentiation and a suitable transformation of the
differential equations, yielded (m+4)-th order Runge-Kutta formulas-
as well as (m+5)-th order formulas for the purpose of stepsize control.
The stepsize control was based on a complete coverage of the leading
local truncation error term. The procedure required altogether six
evaluations of the differential equations, regardless of m.
procedure which provides a stepsize control by one or two additional
evaluations of the differential equations. This earlier procedure, requiring
an m-fold differentiation and a suitable transformation of the
differential equations, yielded (m+4)-th order Runge-Kutta formulas-
as well as (m+5)-th order formulas for the purpose of stepsize control.
The stepsize control was based on a complete coverage of the leading
local truncation error term. The procedure required altogether six
evaluations of the differential equations, regardless of m.
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