Abstract
This article is a sequel of $\langle$Geometric aspects of Lucas sequences, I$\rangle$, which presents a way of viewing Lucas sequences in the framework of group scheme theory. This enables us to treat the Lucas sequences from a geometric and functorial viewpoint, which was suggested by Laxton $\langle$On groups of linear recurrences, I$\rangle$ and by Aoki-Sakai $\langle$Mod $p$ equivalence classes of linear recurrence sequences of degree 2$\rangle$. It is crucial in this work to employ the notion of quotients though at an elementary level.
Citation
Noriyuki SUWA. "Geometric Aspects of Lucas Sequences, II." Tokyo J. Math. 43 (2) 383 - 454, December 2020. https://doi.org/10.3836/tjm/1502179332
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