Some convergence theorems for asymptotically pseudocontractive mappings (Q2372841)

The author introduces the Mann iteration scheme \(x_{0} \in K\), \(x_{n+1} = (1 - \alpha _{n})x_{n} + \alpha _{n}T^{n}v_{n}\), \(n\geq 0\), associated with uniformly \(L\)- Lipschitzian asymptotically pseudocontractive mapping \(T\), to obtain a strong convergence in the setting of real Banach spaces. Let \(K\) be a closed convex subset of a real normed space \(E\) and \(T: K \to K\) be a mapping. For a sequence \(\{ v_{n}\} _{n \geq 0} \) in \(K\), the sequence \(\{ x_{n}\} \) is generated by the Mann scheme above, where \(\{ \alpha _{n}\} _{n\geq 0}\} \) is a sequence in [0,1]. The author improves upon the results of \textit{E.\,U.\thinspace Ofoedu} [J.~Math.\ Anal.\ Appl.\ 321, No.\,2, 722--728 (2006; Zbl 1109.47061)]. The conclusions of Theorems 3--5 in that paper are proved wrong. The author further obtains a related result involving a bounded sequence of error terms.