Convergence theorems for finite families of asymptotically quasi-nonexpansive mappings (Q2471906)

Let \(E\) be a Banach space, \(K\) a nonempty closed convex subset of \(E\), and let \(T_1,T_2,\dots,T_m:K\rightarrow K\) be a family of selfmappings. By considering the iterative scheme \(\{x_n\}\) defined by \(x_1\in K\) and \[ \begin{aligned} x_{n+1}&=(1-\alpha_n)x_n+\alpha_n T_1^n y_{n+m-2}, \\ y_{n+m-2}&=(1-\alpha_n)x_n+\alpha_n T_2^n y_{n+m-3}, \\ &\dots \\ y_{n}&=(1-\alpha_n)x_n+\alpha_n T_m^n x_n,\;n\geq 1,\;m\geq 2,\end{aligned} \] the authors obtain necessary and sufficient conditions for the strong convergence of \(\{x_n\}\) to a common fixed point in the case when \(\{T_1,T_2,\dots,T_m\}\) is a family of asymptotically nonexpansive mappings. Weak convergence theorems are also obtained when \(E\) satisfies Opial's condition and the \(T_i\) satisfy a certain weak version of demiclosedness at origin.