# A new approach in constructing isogenies of elliptic curves in characteristic three

**Authors:** Marius B\u{a}loi

arXiv: 2509.00427 · 2025-09-03

## TL;DR

This paper introduces a novel method for constructing isogenies of elliptic curves in characteristic three by analyzing formal endomorphisms within Laurent series, providing a way to identify rational solutions and endomorphisms.

## Contribution

It presents a new approach to find formal endomorphisms of elliptic curves in characteristic three using Laurent series and rational points on a plane cubic, with an efficient test for rationality.

## Key findings

- Identifies formal endomorphisms with rational points on a cubic over Laurent series.
- Provides a method to find all formal separable endomorphisms in characteristic 3.
- Offers an efficient test to determine if a formal solution corresponds to a curve endomorphism.

## Abstract

Given an elliptic curve ${\mathcal E}$ over a field $K$ it is a challenging problem to write down explicit elements of its endomorphism ring ${\rm End}({\mathcal E});$ the problem amounts to find all possible solutions to a functional equation in the field of rational functions $K(X).$ Instead of attempting to describe them directly, we look first for solutions in the larger field of Laurent power series $K((X))$, which we call them {\em formal endomorphisms}. We show that the set of separable formal endomorphisms naturally identifies with a subset of $\frac{1}{X}K[[X]]-$rational points of a plane cubic defined over $K((X)).$ As a by-product, we present a method for finding all formal separable endomorphisms in characteristic $3$. %and an efficient test for determining if a given formal solution is actually rational, yielding to an endomorphism of the given curve.

## Full text

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## References

3 references — full list in the complete paper: https://tomesphere.com/paper/2509.00427/full.md

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Source: https://tomesphere.com/paper/2509.00427