Loops, Multi-Edges and Collisions in Supersingular Isogeny Graphs

Abstract

Supersingular isogeny graphs are known to have very few loops and multi-edges. We formalize this idea by studying and finding bounds for the number of loops and multi-edges in such graphs. We also find conditions under which the supersingular isogeny graph p() is simple. The methods presented in this paper can be used to study many kinds of collisions in supersingular isogeny graphs. As an application, we introduce the notion of bi-route number for two graphs p(1),p(2) and compute bounds for it. We also study the number of edges in common between the graphs p(1),p(2).

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