International Association
for Cryptologic Research

We analyze Kaneko's bound to prove that, away from the $j$-invariant $0$, edges of multiplicity at least three can occur in the supersingular $\ell$-isogeny graph $\mathcal{G}_\ell(p)$ only if the base field's characteristic satisfies $p < 4\ell^3$. Further we prove a diameter bound for $\mathcal{G}_\ell(p)$, while also showing that most vertex pairs have a substantially smaller distance, in the directed case; this bound is then used in conjunction with Kaneko's bound to deduce that the distance of $0$ and $1728$ in $\mathcal{G}_\ell(p)$ is at least one fourth of the graph's diameter if $p \equiv 11 \mathrel{\operatorname{mod}} 12$. We also study other phenomena in $\mathcal{G}_\ell(p)$ with Kaneko's bound and provide data to demonstrate that the resulting bounds are optimal; for one of these bounds we investigate the connection between loop multiplicities in isogeny graphs and the factorization of the `diagonal' classical modular polynomial $\Phi_\ell(X,X)$ in positive characteristic.