N. Bradley Fox, Nathan H. Fox, Helen G. Grundman, Rachel Lynn, Changningphaabi Namoijam, Mary Vanderschoot
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For a base $b \geq 2$, the $b$-elated function, $E_{2,b}$, maps a positive
integer written in base $b$ to the product of its leading digit and the sum of
the squares of its digits. A $b$-elated number is a positive integer that maps
to $1$ under iteration of $E_{2,b}$. The height of a $b$-elated number is the
number of iterations required to map it to $1$. We determine the fixed points
and cycles of $E_{2,b}$ and prove a range of results concerning sequences of
$b$-elated numbers and $b$-elated numbers of minimal heights. Although the
$b$-elated function is closely related to the $b$-happy function, the behaviors
of the two are notably different, as demonstrated by the results in this work.
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