Add to ORKGFor each $t\in\mathbb{Q}\setminus\{-1,0,1\}$, define an elliptic curve over $\mathbb{Q}$ by \begin{align*} E_t:y^2=x(x+1)(x+t^2). \end{align*} Using a formula for the root number $W(E_t)$ as a function of $t$ and assuming some standard conjectures about ranks of elliptic curves, we determine (up to a set of density zero) the set of isomorphism classes of elliptic curves $E/\mathbb{Q}$ whose Mordell-Weil group contains $\mathbb{Z}\times \mathbb{Z}/2\mathbb{Z}\times \mathbb{Z}/4\mathbb{Z}$, and the set of rational numbers that can be written as a product of the slopes of two rational right triangles.Comment: 15 pages, 1 figure. Updated to reference prior work that proved the root number formula (Lemma 5.1
An elliptic curve is the set of zeros of a non-singular cubic polynomial in x and y. Throughout this...
An elliptic curve is the set of zeros of a non-singular cubic polynomial in x and y. Throughout this...
summary:A conjecture due to Honda predicts that given any abelian variety over a number field $K$, a...
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...
Let $\{E_{(p,q)}\}$ be a family of elliptic curves over a rational field such that we have $E_{(p,q)...
textabstractIn this paper the family of elliptic curves over Q given by the equation y2 = (x + p)(x2...
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...
This dissertation presents results related to two problems in the arithmetic of elliptic curves. Let...
In this paper the family of elliptic curves over Q given by the equation y(2) = (x + p)(x(2) + p(2))...
The author reports the recent progress on the structure of the natural group consisting of the ratio...
[[abstract]]From some basic results of Algebraic Number Theory and Algebraic Geometry, we know that ...
Abstract. An elliptic curve is a specific type of algebraic curve on which one may impose the struct...
Let E m be the family of elliptic curves given by y^2=x^3-x+m^2, which has rank 2 when regarded as a...
An elliptic curve is the set of zeros of a non-singular cubic polynomial in x and y. Throughout this...
An elliptic curve is the set of zeros of a non-singular cubic polynomial in x and y. Throughout this...
summary:A conjecture due to Honda predicts that given any abelian variety over a number field $K$, a...
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...
Let $\{E_{(p,q)}\}$ be a family of elliptic curves over a rational field such that we have $E_{(p,q)...
textabstractIn this paper the family of elliptic curves over Q given by the equation y2 = (x + p)(x2...
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...
This dissertation presents results related to two problems in the arithmetic of elliptic curves. Let...
In this paper the family of elliptic curves over Q given by the equation y(2) = (x + p)(x(2) + p(2))...
The author reports the recent progress on the structure of the natural group consisting of the ratio...
[[abstract]]From some basic results of Algebraic Number Theory and Algebraic Geometry, we know that ...
Abstract. An elliptic curve is a specific type of algebraic curve on which one may impose the struct...
Let E m be the family of elliptic curves given by y^2=x^3-x+m^2, which has rank 2 when regarded as a...
An elliptic curve is the set of zeros of a non-singular cubic polynomial in x and y. Throughout this...
An elliptic curve is the set of zeros of a non-singular cubic polynomial in x and y. Throughout this...
summary:A conjecture due to Honda predicts that given any abelian variety over a number field $K$, a...