Add to ORKGUsing pencils of quadrics, we study a construction of torsors of Jacobians of hyperelliptic curves twice of which is Pic^1. We then use this construction to study the arithmetic invariant theory of the actions of SO2n+1 and PSO2n+2 on self-adjoint operators and show how they facilitate in computing the average order of the 2-Selmer groups of Jacobians of hyperelliptic curves with a rational Weierstrass point, and the average order of the 2-Selmer groups of Jacobians of hyperelliptic curves with a rational non-Weierstrass point, over arbitrary number fields.Mathematic
Abstract: We prove that the average size of the 3‐Selmer group of a genus‐2 curve with a marked Weie...
In this paper we propose a method of solving the Jacobi inversion problem in terms of multiply perio...
AbstractThe thirty years old programme of Griffiths and Harris of understanding higher-dimensional a...
We summarise recent advances in techniques for solving Diophantine problems on hyperelliptic curves;...
My research involves answering various number-theoretic questions involving hyperelliptic curves. A ...
We discuss approaches to computing in the Shafarevich-Tate group of Jacobians of higher genus curves...
We discuss approaches to computing in the Shafarevich-Tate group of Jacobians of higher genus curves...
In this article, we give a way of constructing an unramified Galois cover of a hyperelliptic curve. ...
We use Arakelov intersection theory to study heights on the Jacobians of high-genus hyperelliptic c...
© 2018 World Scientific Publishing Company. We describe a qualitative improvement to the algorithms ...
To an algebraic curve C over the complex numbers one can associate a non-negative integer g, the gen...
We construct a point in the Jacobian of a non-hyperelliptic genus four curve which is defined over a...
We present new methods for computing square roots and factorization of polynomials over finite field...
For nearly three centuries mathematicians have been interested in polygons which simultaneously circ...
We suggest that the following plan will provide a powerful tool for trying to find the set of Q-rati...
Abstract: We prove that the average size of the 3‐Selmer group of a genus‐2 curve with a marked Weie...
In this paper we propose a method of solving the Jacobi inversion problem in terms of multiply perio...
AbstractThe thirty years old programme of Griffiths and Harris of understanding higher-dimensional a...
We summarise recent advances in techniques for solving Diophantine problems on hyperelliptic curves;...
My research involves answering various number-theoretic questions involving hyperelliptic curves. A ...
We discuss approaches to computing in the Shafarevich-Tate group of Jacobians of higher genus curves...
We discuss approaches to computing in the Shafarevich-Tate group of Jacobians of higher genus curves...
In this article, we give a way of constructing an unramified Galois cover of a hyperelliptic curve. ...
We use Arakelov intersection theory to study heights on the Jacobians of high-genus hyperelliptic c...
© 2018 World Scientific Publishing Company. We describe a qualitative improvement to the algorithms ...
To an algebraic curve C over the complex numbers one can associate a non-negative integer g, the gen...
We construct a point in the Jacobian of a non-hyperelliptic genus four curve which is defined over a...
We present new methods for computing square roots and factorization of polynomials over finite field...
For nearly three centuries mathematicians have been interested in polygons which simultaneously circ...
We suggest that the following plan will provide a powerful tool for trying to find the set of Q-rati...
Abstract: We prove that the average size of the 3‐Selmer group of a genus‐2 curve with a marked Weie...
In this paper we propose a method of solving the Jacobi inversion problem in terms of multiply perio...
AbstractThe thirty years old programme of Griffiths and Harris of understanding higher-dimensional a...