Values of Ducci Periods for Sequences on Zmn
Abstract
Let D: Zmn Zmn be defined so that \[D(x1, x2, ..., xn)=(x1+x2 \; mod \; m, x2+x3 \; mod \; m, ..., xn+x1 \; mod \; m).\] We call D the Ducci function and the sequence \Dα(u)\α=0∞ the Ducci sequence of u for u ∈ Zmn. Every Ducci sequence enters a cycle, so we can let Per(u) be the number of tuples in the Ducci cycle of u, or the period of u. In this paper, we will look at what different possible values of Per(u) we can have and some conditions that if u meets at least one of them, u will generate a period smaller than the maximum period.
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