Abstract
Let X be a real uniformly smooth Banach space, K be a nonempty closed convex subset of X and T : K → K be a generalized Lipschitzian and hemicontractive mapping. It is shown that the Ishikawa iterative process with mixed errors converges strongly to the unique fixed point of the mapping T. As consequences, several new strong convergence results are deduced and some known results are improved.
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