A note on two convergence acceleration methods for ordinary continued fractions

In this note we relate two methods of convergence acceleration for ordinary continued fractions, the first one is due

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)

In this paper, we consider solutions of Toeplitz systems Au = b where the Toeplitz matrices A are generated by nonnegative functions with zeros. Since the matrices A are ill-conditioned, the convergence factor of classical iterative methods, such as the Richardson method, will approach 1 as the size

We prove the convergence of line iterative methods for solving the linear system arising from a nine-point compact discretization of a special two-dimensional convection diff~ion equation. The results provide rigorous justification for the numerical experim~ts conducted elsewhere, which demonstrate