Add to ORKGA formula is given for the dimension of the Selmer group of the non-constant j-invariant case of a rational three-isogeny of elliptic curves, in terms of the three-ranks of two associated quadratic number fields and various aspects of the arithmetic of these number fields. A duality theorem is used to relate the dimension of the Selmer group of the three-isogeny with the dimension of the Selmer group of its dual isogeny. Similar results of Satge are extended for the special case when the j-invariant of the elliptic curve is 0. These results are used to translate some of the machinery of rational elliptic surfaces to obtain old and new results on polynomials which give rise to infinite families of quadratic fields with non-trivial three-r...
This thesis studies several aspects of the arithmetic of elliptic curves. In particular, we explore ...
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...
A formula is given for the dimension of the Selmer group of the non-constant j-invariant case of a r...
[[abstract]]Let D be an integer. Consider the elliptic curve E/Q :y2 = x3 + D, which has j-invariant...
[[abstract]]In this paper, we study a family of elliptic curves with CM by which also admits a ℚ-ra...
A universal family of elliptic curves of rank 4 with 3-division rational points is constructed. The ...
Thesis (Ph. D.)--University of Washington, 2003The Mordell-Weil theorem states that the points of an...
AbstractLet E be an elliptic curve over Q of conductor N and K be an imaginary quadratic field, wher...
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...
This dissertation presents results related to two problems in the arithmetic of elliptic curves. Let...
AbstractFrey and his coauthors have established a relationship between the 2-torsion of the Selmer g...
Inspired by recent papers of Mazur-Rubin [8] and Klagsbrun-Mazur-Rubin [6], this thesisinvestigates ...
We obtain lower bounds for Selmer ranks of elliptic curves over dihedral extensions of number fields...
Gauss' class number problem is that of finding an upper bound for |D| with given class number h(D) ...
This thesis studies several aspects of the arithmetic of elliptic curves. In particular, we explore ...
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...
A formula is given for the dimension of the Selmer group of the non-constant j-invariant case of a r...
[[abstract]]Let D be an integer. Consider the elliptic curve E/Q :y2 = x3 + D, which has j-invariant...
[[abstract]]In this paper, we study a family of elliptic curves with CM by which also admits a ℚ-ra...
A universal family of elliptic curves of rank 4 with 3-division rational points is constructed. The ...
Thesis (Ph. D.)--University of Washington, 2003The Mordell-Weil theorem states that the points of an...
AbstractLet E be an elliptic curve over Q of conductor N and K be an imaginary quadratic field, wher...
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...
This dissertation presents results related to two problems in the arithmetic of elliptic curves. Let...
AbstractFrey and his coauthors have established a relationship between the 2-torsion of the Selmer g...
Inspired by recent papers of Mazur-Rubin [8] and Klagsbrun-Mazur-Rubin [6], this thesisinvestigates ...
We obtain lower bounds for Selmer ranks of elliptic curves over dihedral extensions of number fields...
Gauss' class number problem is that of finding an upper bound for |D| with given class number h(D) ...
This thesis studies several aspects of the arithmetic of elliptic curves. In particular, we explore ...
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...