Ishikawa iterative process in uniformly smooth Banach spaces. (Q1596426)

This article deals with Ishikawa approximations \[ x_{n+1}= (1-\alpha_n) x_n+ \alpha_nTy_n,\;y_n=(1-\beta_n)x_n+\beta_nTx_n\;(n=1,2,\dots) \] for a continuous \(\Phi\)-strongly pseudocontractive operator \(T:K\to K\) (this means that for the duality mapping \(J\) and a strictly increasing function \(\varphi:[0,\infty) \to[0 ,\infty)\), \(\varphi(0) =0\) the inequality \[ \bigl\langle Tx-Ty,J(x-y)\bigr\rangle \leq\| x-y \|^2-\varphi\bigl(\| x-y\|\bigr)\| x-y\|,\;x,y\in K \] holds) with a bounded range; \(K\) is a nonempty closed convex subset in a uniformly smooth Banach space \(E\). Under the assumption that \(T\) has fixed points in \(C\), the author shows that \[ 0\leq\alpha_n, \beta_n< 1,\;\sum^\infty_{n=1} \alpha_n=+\infty,\;\lim_{n\to\infty}\beta_n=0 \] implies the convergence of Ishikawa approximations to the unique fixed point \(x^*\) of \(T\). As the author writes, this result ``generalizes and extends a lot of recent corresponding results''.