Weighted error-sum identities for periodic continued fractions and their generalizations

Abstract

For a purely N-periodic continued fraction =[a0,a1,…,aN-1]=[a0,a1,·s], with ak=ak+N for all k 0, and convergents hn/kn=[a0,a1,…,an], we obtain explicit expressions for the weighted error sums f(s)=Σ an+1 hn- kns for s>1. A key observation is that, for each residue class k0∈0,1,…,N-1, the subsequence of approximation errors (hk- kk) with k k0 N forms a geometric progression. In addition, we extend our methods to generalized continued fractions with numerators (bn), obtaining Euler-type identities and weighted error-sum formulae for π and 2.