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18 votes
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rational points of a hyperelliptic curve

By now there is a fairly rich literature on computing the set of rational points on curves of higher genus, see for example my survey paper on "Rational points on curves". What one can do for your co …
Michael Stoll's user avatar
16 votes

rational points of a hyperelliptic curve of genus 3

It turns out that $C(K) = C(\mathbb Q) = \{\infty_+, \infty_-, (0,1), (0,-1), (1,1), (1,-1)\}$. To see this, consider a point $P \in C(K)$ and write $\bar{P}$ for its image under the nontrivial automo …
Michael Stoll's user avatar
7 votes
Accepted

Hyperelliptic curve of genus 2 over R

Basically, the problem is that there are really five intersection points with your line (two of them are complex non-real). If you could make a group in the same way as for elliptic curves, then this …
Michael Stoll's user avatar
4 votes
Accepted

Calculate reduction of Jacobian of hyperelliptic curve

The relevant information can be obtained from a regular model of the curve over ${\mathbb Z}_p$. Such a model can be computed by repeatedly blowing up points or components of the special fiber that ar …
Michael Stoll's user avatar
4 votes
Accepted

Function field of the Jacobian of genus 2 curve over $\mathbb{F}_q$

You get an open subset of the Jacobian by looking at points "in general position", i.e., points represented by divisors of the form $(P)+(P')-2(\infty)$, where $\infty$ denotes the point at infinity, …
Michael Stoll's user avatar
2 votes
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Identifying elements in the kernel of an explicit endomorphism of a Jacobian variety

I would suggest that you work with the Kummer surface $K$ of $J$ instead of using Mumford coordinates. The advantage is that $K$ is a quartic surface in $\mathbb P^3$; in the case you are considering …
Michael Stoll's user avatar