Add to ORKGWe shall discuss the idea of finding all rational points on a curve C by first finding an associated collection of curves whose rational points cover those of C. This classical technique has recently been given a new lease of life by being combined with descent techniques on Jacobians of curves, Chabauty techniques, and the increased power of software to perform algebraic number theory. We shall survey recent applications during the last 5 years which have used Chabauty techniques and covering collections of curves of genus 2 obtained from pullbacks along isogenies on their Jacobians
This thesis is concerned with the problem of determining sets of rational points on algebraic curves...
We discuss a technique for trying to find all rational points on curves of the form $Y^2 = f_3 X^6 +...
We discuss a technique for trying to find all rational points on curves of the form $Y^2 = f_3 X^6 +...
We shall discuss the idea of finding all rational points on a curve C by first finding an associated...
We shall discuss the idea of finding all rational points on a curve C by first finding an associated...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
AbstractMuch success in finding rational points on curves has been obtained by using Chabauty's Theo...
We discuss a technique for trying to find all rational points on curves of the form $Y^2 = f_3 X^6 +...
A simplified method of descent via isogeny is given for Jacobians of curves of genus 2. This method ...
AbstractMuch success in finding rational points on curves has been obtained by using Chabauty's Theo...
A strategy is proposed for applying Chabauty's Theorem to hyperelliptic curves of genus>1. In the ge...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
In this article, we give a way of constructing an unramified Galois cover of a hyperelliptic curve. ...
This thesis is concerned with the problem of determining sets of rational points on algebraic curves...
We discuss a technique for trying to find all rational points on curves of the form $Y^2 = f_3 X^6 +...
We discuss a technique for trying to find all rational points on curves of the form $Y^2 = f_3 X^6 +...
We shall discuss the idea of finding all rational points on a curve C by first finding an associated...
We shall discuss the idea of finding all rational points on a curve C by first finding an associated...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
AbstractMuch success in finding rational points on curves has been obtained by using Chabauty's Theo...
We discuss a technique for trying to find all rational points on curves of the form $Y^2 = f_3 X^6 +...
A simplified method of descent via isogeny is given for Jacobians of curves of genus 2. This method ...
AbstractMuch success in finding rational points on curves has been obtained by using Chabauty's Theo...
A strategy is proposed for applying Chabauty's Theorem to hyperelliptic curves of genus>1. In the ge...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
In this article, we give a way of constructing an unramified Galois cover of a hyperelliptic curve. ...
This thesis is concerned with the problem of determining sets of rational points on algebraic curves...
We discuss a technique for trying to find all rational points on curves of the form $Y^2 = f_3 X^6 +...
We discuss a technique for trying to find all rational points on curves of the form $Y^2 = f_3 X^6 +...