A weak ergodic theorem for infinite products of Lipschitzian mappings (Q1864356)

Given a bounded, closed, and convex subset of \(K\) of a Banach space and sequence \({\mathfrak A}= \{A_t\}^\infty_{t=1}\) of self-mappings of \(K\), the authors are interested in the convergence properties of the sequences of products \(\{A_n\cdots A_1x\}^\infty_{n=1}\), where \(x\in K\). In the special case of a constant sequence \({\mathfrak A}\), this leads to study the asymptotic behaviour of a single operator. The authors prove a convergence property of infinite products in the case of Lipschitzian self-mappings of \(K\), which are not necessarily nonexpansive. The authors present also a weak ergodic theorem in this case.