User:Mathemajor/Contractive sequences
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In mathematics and, in particular, analysis a sequence in a metric space is said to be contractive if the distance between consecutive terms in the sequence shrinks in a predictable manner as one observes terms further into the sequence. The word "contractive" stems comes from the fact that, formally, a contractive sequence is a contractive function such that for all . Due to satisfying several desirable properties (including being Cauchy), observing that a sequence is contractive immediately provides insights into its behavior. Beyond analysis, contractive sequences are useful and arise naturally in the general theory that allows computer scientists to generate a large class of functions efficiently via iterated function sequences.