Add to ORKGAbstract. We study the family of elliptic curvesy2 = x3−t2x+1, both overQ(t) and over Q. In the former case, all integral solutions are determined; in the latter case, computation in the range 1 ≤ t ≤ 999 shows large ranks are common, giving a particularly simple example of curves which (admittedly over a small range) apparently contradict the once held belief that the rank under specialization will tend to have minimal rank consistent with the parity predicted by the Selmer conjecture
In this article, it is shown that certain kinds of Selmer groups of elliptic curves can be arbitrari...
In this article, it is shown that certain kinds of Selmer groups of elliptic curves can be arbitrari...
In this article, it is shown that certain kinds of Selmer groups of elliptic curves can be arbitrari...
Abstract. The main aim of this paper is to put a lower bound on the rank of elliptic curves from the...
The study of elliptic curves grows out of the study of elliptic functions which dates back to work d...
The study of elliptic curves grows out of the study of elliptic functions which dates back to work d...
In this thesis we will look at methods for constructing elliptic curves over Q with high ranks. Usin...
AbstractFix a finite field k, a positive integer d relatively prime to the characteristic of k, and ...
AbstractWe explain how recent work on 3-descent and 4-descent for elliptic curves over Q can be comb...
What can we say about the variation of the rank in a family of elliptic curves We know in particula...
What can we say about the variation of the rank in a family of elliptic curves We know in particula...
There have been many investigations regarding the distribution of ranks of el-liptic curves in natur...
In [Zagier and Kramarz 1987], the authors computed the critical value of the L-series of the family ...
We exhibit a genus{2 curve C de ned over Q(T ) which admits two independent morphisms to a rank{1 ...
AbstractWe exhibit a genus-2 curve C defined over Q(T) which admits two independent morphisms to a r...
In this article, it is shown that certain kinds of Selmer groups of elliptic curves can be arbitrari...
In this article, it is shown that certain kinds of Selmer groups of elliptic curves can be arbitrari...
In this article, it is shown that certain kinds of Selmer groups of elliptic curves can be arbitrari...
Abstract. The main aim of this paper is to put a lower bound on the rank of elliptic curves from the...
The study of elliptic curves grows out of the study of elliptic functions which dates back to work d...
The study of elliptic curves grows out of the study of elliptic functions which dates back to work d...
In this thesis we will look at methods for constructing elliptic curves over Q with high ranks. Usin...
AbstractFix a finite field k, a positive integer d relatively prime to the characteristic of k, and ...
AbstractWe explain how recent work on 3-descent and 4-descent for elliptic curves over Q can be comb...
What can we say about the variation of the rank in a family of elliptic curves We know in particula...
What can we say about the variation of the rank in a family of elliptic curves We know in particula...
There have been many investigations regarding the distribution of ranks of el-liptic curves in natur...
In [Zagier and Kramarz 1987], the authors computed the critical value of the L-series of the family ...
We exhibit a genus{2 curve C de ned over Q(T ) which admits two independent morphisms to a rank{1 ...
AbstractWe exhibit a genus-2 curve C defined over Q(T) which admits two independent morphisms to a r...
In this article, it is shown that certain kinds of Selmer groups of elliptic curves can be arbitrari...
In this article, it is shown that certain kinds of Selmer groups of elliptic curves can be arbitrari...
In this article, it is shown that certain kinds of Selmer groups of elliptic curves can be arbitrari...