The convergence ball of Wang’s method for finding a zero of a derivative

Under the hypotheses that nonlinear operators have (K,p)-Htilder-type continuous derivatives, exact estimates of the radius of the convergence ball of Newton's method and of the uniqueness ball of solution of equations are obtained.

calculating the zeros of the transfer function which exists between an input and output of an arbitrary multivariable linear time invariant system• The method is simple to use; is computationally fast and is accurate. Some numerical examples for a 9th order system are included.

For an equation f (x) = 0 having a multiple root of multiplicity m > 1 unknown, we propose a transformation which converts the multiple root to a simple root of H (x) = 0. The transformed function H (x) of f (x) with a small > 0 has appropriate properties in applying a derivative free iterative meth

This paper presents a convergence theory for non-linear eigenvalue methods. The basic idea of these methods, which have been described by the author in an earlier paper, 1 is to apply an eigen-solver in conjunction with a zero-ÿnding technique for solving the non-linear eigenvalue problems. The main