AGM and jellyfish swarms of elliptic curves

Abstract

The classical AGM produces wonderful interdependent infinite sequences of arithmetic and geometric means with common limit. For finite fields Fq, with q 3 4, we introduce a finite field analogue AGMFq that spawns directed finite graphs instead of infinite sequences. The compilation of these graphs reminds one of a jellyfish~swarm, as the 3D renderings of the connected components resemble jellyfish (i.e. tentacles connected to a bell head). These swarms turn out to be more than the stuff of child's play; they are taxonomical devices in number theory. Each jellyfish is an isogeny graph of elliptic curves with isomorphic groups of Fq-points, which can be used to prove that each swarm has at least (1/2-)q jellyfish. Additionally, this interpretation gives a description of the class~numbers of Gauss, Hurwitz, and Kronecker which is akin to counting types of spots on jellyfish.

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