Rate of approximation of zf'(z) by special sums associated with the zeros of the Bessel polynomials

Abstract

Let αn1,…,αnn be the zeros of the nth Bessel polynomial yn(z) and let ank=1-αnk/2, bnk=1+αnk/2 (k=1,…,n). We propose the new formula \[z f'(z)≈ Σk=1n (f(ank z)-f(bnk z))\] for numerical differentiation of analytic functions f(z)=Σ0∞ fm zm. This formula is exact for all polynomials of degree at most 2n. We find the sharp order of nonlocal estimate of the corresponding remainder for the case when all |fm| 1. The estimate shows a high rate of convergence of the differentiating sums to zf'(z) on compact subsets of the open unit disk, namely, O(0.85n n1-n) as n ∞.