Abstract
We study an Ishikawa type algorithm for two multi-valued quasi-nonexpansive maps on a special class of nonlinear spaces namely hyperbolic metric spaces; in particular, strong and $\triangle-$convergence theorems for the proposed algorithms are established in a uniformly convex hyperbolic space which improve and extend the corresponding known results in uniformly convex Banach spaces. Our new results are also valid in geodesic spaces.
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