On the convergence of a perturbed one dimensional Mann's process

Abstract

We consider the perturbed Mann's iterative process equation xn+1=(1-θn)xn+θn f(xn)+rn, equation where f:[0,1]→[0,1] is a continuous function, \θn\∈ [0,1] is a given sequence, and \rn\ is the error term. We establish that if the sequence \θn\ converges relatively slowly to 0 and the error term rn becomes enough small at infinity, any sequences \xn\∈ [0,1] satisfying the process converges to a fixed point of the function f. We also study the asymptotic behavior of the trajectories x(t) as t→∞ of a continuous version of the the considered. We investigate the similarities between the asymptotic behaviours of the sequences generated by the considered discrete process and the trajectories x(t) of its corresponding continuous version.

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