On the length over which $k$-Göbel sequences remain integers
Yuh Kobayashi, Shin-ichiro Seki·2025-02-05·via math.CO updates on arXiv.org
We prove that the sequence $(N_k)_k$, where each $N_k$ is defined as the smallest positive integer $n$ for which the $n$th term $g_{k,n}$ of the $k$-Göbel sequence is not an integer, is unbounded.