A nonlinear Abelian ergodic theorem for asymptotically nonexpansive mappings in a Hilbert space (Q2769239)

Let \(C\) be a closed convex subset of a real Hilbert space and let \(T\) be an asymptotically nonexpansive self-mapping of \(C.\) For every \(r\in \left( 0,1\right) \) and \(x\in C,\) let \(M_{r}\left[ T\right] x\) be the so-called Abelian average of the iterates \(\left\{ T^{n}x\right\} ,\) defined by \(M_{r} \left[ T\right] x=\left( 1-r\right) \sum_{n=0}^{\infty }r^{n}T^{n}x=\left( 1-r\right) \left( I-rT\right) ^{-1}x\) whenever \(\left( I-rT\right) ^{-1}x\) exists. The author deals with the weak convergence of \(A_{r}\left[ T\right] x,\) as well as of some other quantities containing \(A_{r}\left[ T\right] x,\) as \(r\rightarrow 1,\) and its connections with the fixed points of \(T.\)