On the convergence acceleration of some continued fractions

Abstract

A well known method for convergence acceleration of continued fraction (an/bn) is to use the modified approximants Sn(ωn) in place of the classical approximants Sn(0), where ωn are close to tails f(n) of continued fraction. Recently, author proposed a method of iterative character producing tail approximations whose asymptotic expansion's accuracy is improving in each step. This method can be applied to continued fractions (an/bn), where an, bn are polynomials in n ( an=2, bn≤ 1) for sufficiently large n. The purpose of this paper is to extend this idea for the class of continued fractions (an/bn + an'/bn'), where an, an', bn, bn' are polynomials in n ( an= an', bn= bn'). We give examples involving such continued fraction expansions of some mathematical constants, as well as elementary and special functions.