【 摘 要 】

Let R[f] be the remainder of some approximation method, having estimates of the form \R[f]\ less-than-or-equal-to rho(i) \\ f(i) \\ for i = 0,..., r. In many cases, rho0 and rho(r) are known, but not the intermediate error constants rho1,..., rho(r-1). For periodic functions, Ligun (1973) has obtained an estimate for these intermediate error constants by rho0 and rho(r). In this paper, we show that this holds in the nonperiodic case, too. For instance, the estimates obtained can be applied to the error of polynomial or spline approximation and interpolation, or to numerical integration and differentiation.

【 授权许可】

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【 预 览 】

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Files	Size	Format	View
10_1016_0377-0427(94)90312-3.pdf	638KB	PDF	download