Add to ORKGWe give new instances where Chabauty–Kim sets can be proved to be finite, by developing a notion of “generalised height functions” on Selmer varieties. We also explain how to compute these generalised heights in terms of iterated integrals and give the 1st explicit nonabelian Chabauty result for a curve X/Q whose Jacobian has Mordell–Weil rank larger than its genus
We describe how the quadratic Chabauty method may be applied to explicitly determine the set of rati...
We explore a number of problems related to the quadratic Chabauty method for determining integral po...
AbstractMuch success in finding rational points on curves has been obtained by using Chabauty's Theo...
The Selmer varieties of a hyperbolic curve X over ℚ are refinements of the Selmer group ar...
Since Faltings proved Mordell's conjecture in [16] in 1983, we have known that the sets of rational ...
The Chabauty–Kim method allows one to find rational points on curves under certain technical conditi...
One of the most important results in Diophantine geometry is the finiteness of the number of rationa...
This thesis deals with several theoretical and computational problems in the theory of p-adic height...
We give a formula for the component at p of the p-adic height pairing of a divisor of degree 0 on a ...
This article generalizes the geometric quadratic Chabauty method, initiated over $\mathbb{Q}$ by Edi...
We generalize the explicit quadratic Chabauty techniques for integral points on odd degree hyperelli...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2014.Cataloged fro...
We give a new construction of p-adic heights on varieties over number fields using p-adic Arakelov t...
We introduce the notion of height for the points on an elliptic curve, an abelian variety of genus 1...
We describe how the quadratic Chabauty method may be applied to explicitly determine the set of rati...
We explore a number of problems related to the quadratic Chabauty method for determining integral po...
AbstractMuch success in finding rational points on curves has been obtained by using Chabauty's Theo...
The Selmer varieties of a hyperbolic curve X over ℚ are refinements of the Selmer group ar...
Since Faltings proved Mordell's conjecture in [16] in 1983, we have known that the sets of rational ...
The Chabauty–Kim method allows one to find rational points on curves under certain technical conditi...
One of the most important results in Diophantine geometry is the finiteness of the number of rationa...
This thesis deals with several theoretical and computational problems in the theory of p-adic height...
We give a formula for the component at p of the p-adic height pairing of a divisor of degree 0 on a ...
This article generalizes the geometric quadratic Chabauty method, initiated over $\mathbb{Q}$ by Edi...
We generalize the explicit quadratic Chabauty techniques for integral points on odd degree hyperelli...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2014.Cataloged fro...
We give a new construction of p-adic heights on varieties over number fields using p-adic Arakelov t...
We introduce the notion of height for the points on an elliptic curve, an abelian variety of genus 1...
We describe how the quadratic Chabauty method may be applied to explicitly determine the set of rati...
We explore a number of problems related to the quadratic Chabauty method for determining integral po...
AbstractMuch success in finding rational points on curves has been obtained by using Chabauty's Theo...