Bounds on Heights of $2$-isogeny Graphs in Ordinary Curves over $\mathbb{F}_p$ and $\mathbb{F}_{p^2}$ and Its Application

Koji Nuida

Bounds on Heights of 2-isogeny Graphs in Ordinary Curves over Fp and Fp2 and Its Application

Abstract

It is known that any isogeny graph consisting of ordinary elliptic curves over Fq with q = p or p2 has a special structure, called a volcano graph. We have a bound h < 2 4q of a height h of the 2-volcano graph. In this paper, we improve the bound on a height of 2-volcano graphs over Fq. In case q = p2, we show a tighter bound h ≤ 1 2 2 p + 2 . In case q = p, we also show that a good bound for each prime p can be computed by using our proposed techniques.

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