Rapidly convergent iteration method for simultaneous normal forms of commuting maps

## Abstract Let __E__ be a real reflexive Banach space having a weakly continuous duality mapping __J__~__φ__~ with a gauge function __φ__, and let __K__ be a nonempty closed convex subset of __E__. Suppose that __T__ is a non‐expansive mapping from __K__ into itself such that __F__ (__T__) ≠ ∅︁.

In this paper, we introduce a modified Ishikawa iterative process for approximating a fixed point of nonexpansive mappings in Hilbert spaces. We establish some strong convergence theorems of the general iteration scheme under some mild conditions. The results improve and extend the corresponding res

The purpose of this paper is to study the convergence problem of an iterative method for nonexpansive mappings in Banach spaces under some new control conditions on parameters.

Many problems in mathematics and other natural sciences and techniques reduce themselves to determining all roots of generalized polynomial equations. We consider in this paper the situations in which the critical initial approximations {z:}, i = 1,. ,n, fail, when the iterative methods of Newton-We