The approximate fixed point property in product spaces

In this paper we generalize to unbounded   convex subsets C$C$ of hyperbolic   spaces results obtained by W.A. Kirk and R. Espínola on approximate fixed points of nonexpansive mappings in product spaces _(C×M)∞${(C\times M)}_{\infty }$, where M$M$ is a metric space and C$C$ is a nonempty, convex, closed and bounded subset of a normed or a CAT(0)-space. We extend the results further, to families _(Cu)u∈M${\left(C_u\right)}_{u\in M}$ of unbounded convex subsets of a hyperbolic space. The key ingredient in obtaining these generalizations is a uniform quantitative version of a theorem due to Borwein, Reich and Shafrir, obtained by the authors in a previous paper using techniques from mathematical logic. Inspired by that, we introduce in the last section the notion of uniform approximate fixed point property   for sets C$C$ and classes of self-mappings of C$C$. The paper ends with an open problem.