Florian Breuer, Igor E. Shparlinski
Published 2019-09-10Version 1
A Ducci sequence is a sequence of integer $n$-tuples obtained by iterating the map \[ D : (a_1, a_2, \ldots, a_n) \mapsto \big(|a_1-a_2|,|a_2-a_3|,\ldots,|a_n-a_1|\big). \] Such a sequence is eventually periodic and we denote by $P(n)$ the maximal period of such sequences for given $n$. We prove lower bounds for $P(n)$ by counting certain partitions.
Lower bounds for the total stopping time of 3X+1 iterates
Brauer-Siegel for Arithmetic Tori and lower bounds for Galois orbits of special points
A note on entire $L$-functions
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