Convergence and stability of the Ishikawa iteration procedures with errors for nonlinear equations of the \(\varphi\)-strongly accretive type (Q2746449)

This article deals with Ishikawa approximations NEWLINE\[NEWLINEx_{n+1}= (1- a_n) x_n+ a_n(f+ y_n= Tx_n)+ u_n,\quad y_n= (1- b_n)x_n+ b_n(f+ x_n- Tx_n)+ v_nNEWLINE\]NEWLINE for the equations \(Tx=f\) and \(x+ Tx=f\) with an Lipschitzian continuous and \(\phi\)-strongly accretive operator \(T\) in an arbitrary real Banach space \(X\). The authors presents 7 theorems about the convergence of Ishikawa approximations; in particular, they prove a theorem about strong convergence and \(S\)-stability to the solution \(x_*\) of \(Tx= f\) under the following conditions: NEWLINE\[NEWLINE\sum^\infty_{n=0} a^2_n< \infty,\;\sum^\infty_{n=0} a_n b_n^2<\infty,\;\sum^\infty_{n=0}\|u_n\|<\infty,\;\sum^\infty_{n=0} a_n= \infty,\;\|u_n\|= O(a_n)NEWLINE\]NEWLINE (\(0\leq a_n\), \(b_n\leq 1\), it is assumed that \(x_*\) exists).