A numerical method for simultaneous convergence to the elements of a sequence

An iterative non-stationary method, depending on a parameter, has been obtained for accelerating the convergence of power series. When the parameter is equal to t I, the method of Salzer and Sdsz[4,6] is recovered (called Method A), and when the parameter is equal to the argument of the power series

## Abstract In the present paper we introduce a new class of sequences called __GM__(β, __r__), which is a generalization of the class considered by Tikhonov in 13. Moreover, we obtain sufficient and necessary conditions for uniform convergence of sine series with (β, __r__)‐general monotone coeffi

We discuss several methods for accelerating the convergence of the iterative solution of nonlinear equation systems commonly in tion they are solved by iteration (for a more detailed deuse and point to interrelations between them. In particular we invesscription see Ref. [9] and references therein)