CONVERGENCE OF INEXACT INFINITE PRODUCTS OF NONEXPANSIVE MAPPINGS
We consider nonexpansive mappings which take a nonempty closed subset of a complete metric space into the space and analyze the convergence of their inexact infinite products to their fixed point sets in the case where the errors are not necessarily summable. In this way, we extend certain known results regarding inexact iterates of nonexpansive mappings.
complete metric space, computational error, infinite product, nonexpansive mapping.