Common fixed points of jointly asymptotically nonexpansive mappings

A definition of two jointly asymptotically nonexpansive mappings S and T on uniformly convex Banach space E is studied to approximate common fixed points of two such mappings through weak and strong convergence of an Ishikawa type iteration scheme generated by S and T on a bounded closed and convex subset of E. As a consequence of the notion of two jointly asymptotically nonexpansive maps, we can relax the very commonly used strong condition "F(S) and F(T) has a nonempty intersection" with the weaker assumption "either F(S) is nonempty or F(T) is nonempty". Our convergence results are refinements and generalizations of several recent results from the current literature.