The equivalence of convergence theorems of Ishikawa-Mann iterations with errors for \(\Phi \)-contractive mappings in uniformly smooth Banach spaces (Q2855185)

Let \(E\) be a real Banach spaces, \(D\) be a nonempty closed subset of \(E\) and \(T: D\rightarrow D\) be a self mapping. If \(T\) satisfies some contractive type condition (e.g., \(T\) is nonexpansive or \(T\) is strongly pseudocontractive etc.), then \(\operatorname{Fix}(T)\neq \emptyset.\)NEWLINENEWLINEIn order to approximate a fixed point \(p\in \operatorname{Fix}(T)\) of \(T\), one can use various iterative algorithms like Krasnoselskij, Mann, Ishikawa, etc., and their numerous variants, see, for example, the reviewer's monograph [Iterative approximation of fixed points. 2nd revised and enlarged ed. Lecture Notes in Mathematics 1912. Berlin: Springer (2007; Zbl 1165.47047)].NEWLINENEWLINEThe main aim of the present paper is to prove that, under suitable assumptions on \(E\) and \(T\), the convergence of a Mann iterative process with errors is equivalent to the convergence of an Ishikawa iterative process with errors.NEWLINENEWLINEAlas, no examples to illustrate the theoretical results are given.