Ordinary Isogeny Graphs with Level Structure

Abstract

We study -isogeny graphs of ordinary elliptic curves defined over Fq with an added level structure. Given an integer N coprime to p and , we look at the graphs obtained by adding 0(N), 1(N), and (N)-level structures to volcanoes. Given an order O in an imaginary quadratic field K, we look at the action of generalised ideal class groups of O on the set of elliptic curves whose endomorphism rings are O along with a given level structure. We show how the structure of the craters of these graphs is determined by the choice of parameters.

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