AGM aquariums and elliptic curves over arbitrary finite fields

Abstract

In this paper, we define a version of the arithmetic-geometric mean (AGM) function for arbitrary finite fields Fq, and study the resulting AGM graph with points (a,b) ∈ Fq × Fq and directed edges between points (a,b), (a+b2,ab) and (a,b), (a+b2,-ab). The points in this graph are naturally associated to elliptic curves over Fq in Legendre normal form, with the AGM function defining a 2-isogeny between the associated curves. We use this correspondence to prove several results on the structure, size, and multiplicity of the connected components in the AGM graph.

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