Examining H-Closed Ducci Sequences on Zmn
Abstract
Let D be an endomorphism on Zmn so that \[D(x1, x2, ..., xn)=(x1+x2 \; mod \; m, x2+x3 \; mod \; m, ..., xn+x1 \; mod \; m).\] We call the sequence \Dα(u)\α=0∞ the Ducci sequence of u ∈ Zmn, which always enters a cycle. Now let H be an endomorphism on Zmn such that \[H(x1, x2, ..., xn)=(x2, x3, ..., xn, x1).\] In this paper, we will talk about a few cases when u and Hβ(u) have the same Ducci cycle for β > 0, as well as prove a few cases of n,m where this is guaranteed for every u ∈ Zmn.
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