An efficient method of spline approximation for power function

Abstract

Let P(m, X, N) be an m-degree polynomial in X∈R having fixed non-negative integers m and N. The polynomial P(m, X, N) is derived from a rearrangement of Faulhaber's formula in the context of Knuth's work entitled "Johann Faulhaber and sums of powers". In this manuscript we discuss the approximation properties of polynomial P(m,X,N). In particular, the polynomial P(m,X,N) approximates the odd power function X2m+1 in a certain neighborhood of a fixed non-negative integer N with a percentage error under 1\%. By increasing the value of N the length of convergence interval with odd-power X2m+1 also increases. Furthermore, this approximation technique is generalized for arbitrary non-negative exponent j of the power function Xj by using splines.

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