Abstract

This paper is concerned with p(≥2)‐cyclic self‐mappings in a metric space (X, d), with Ai ⊂ X, T(Ai)⊆Ai+1 for i = 1, 2, …, p, under a general contractive condition which includes as particular cases several of the existing ones in the literature. The existence and uniqueness of fixed points and best proximity points is discussed as well as the convergence to them of the iterates generated by the self‐mapping from given initial points.

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