Add to ORKGThe goal of this dissertation is to find the irreducible, admissible representation of GL(2; F) attached to an elliptic curve E over a p-adic field F. Associated to E is a 2-dimensional complex representation of the Weil-Deligne group via the action of the absolute Galois group on the Tate module. On the other hand, the local Langlands correspondence states that the 2-dimensional representations of the Weil-Deligne group are in bijection with equivalence classes of irreducible, admissible representations of GL(2; F). We consider a Weierstrass equation for E of the form y2 + a1xy + a2y = x3 + a2x2 + a4x + a6 (W) We will determine the representation the p-adic field in terms of the coefficients a1; a2; a3; a4; a6. We also investi...
We present an algorithm to determine if the $L$-series associated to an automorphic representation a...
AbstractLet K be a quadratic imaginary number field with discriminant DK≠-3,-4 and class number one....
The thesis treats two questions situated in the Langlands program, which is one of the most active a...
honors thesisCollege of ScienceMathematicsGil MossDiophantine equations and their solution sets are ...
by Song Li-Min.Thesis (M.Ph.)--Chinese University of Hong Kong, 1987.Bibliography: leaves 175-178
In this thesis I establish the modularity of a number of elliptic curves defined over quartic CM fie...
Let K:=\mathbb{F}_{2^{f}}((T)) be the field of Laurent series over the finite field with 2^{f} e...
There is a lifting from a non-CM elliptic curve $E/\mathbb{Q}$ to a cuspidal paramodular newform $f$...
The Langlands program is a vast and unifying network of conjectures that connect the world of automo...
[eng] The Langlands program is a vast and unifying network of conjectures that connect the world of ...
The Langlands program is a vast and unifying network of conjectures that connect the world of automo...
Addison-Wesley has just reissued Serre’s 1968 treatise on l-adic represen-tations in their Advanced ...
We call a Galois representation a finite dimensional vector space, or a free-module of finite rank o...
The thesis treats two questions situated in the Langlands program, which is one of the most active a...
The thesis treats two questions situated in the Langlands program, which is one of the most active a...
We present an algorithm to determine if the $L$-series associated to an automorphic representation a...
AbstractLet K be a quadratic imaginary number field with discriminant DK≠-3,-4 and class number one....
The thesis treats two questions situated in the Langlands program, which is one of the most active a...
honors thesisCollege of ScienceMathematicsGil MossDiophantine equations and their solution sets are ...
by Song Li-Min.Thesis (M.Ph.)--Chinese University of Hong Kong, 1987.Bibliography: leaves 175-178
In this thesis I establish the modularity of a number of elliptic curves defined over quartic CM fie...
Let K:=\mathbb{F}_{2^{f}}((T)) be the field of Laurent series over the finite field with 2^{f} e...
There is a lifting from a non-CM elliptic curve $E/\mathbb{Q}$ to a cuspidal paramodular newform $f$...
The Langlands program is a vast and unifying network of conjectures that connect the world of automo...
[eng] The Langlands program is a vast and unifying network of conjectures that connect the world of ...
The Langlands program is a vast and unifying network of conjectures that connect the world of automo...
Addison-Wesley has just reissued Serre’s 1968 treatise on l-adic represen-tations in their Advanced ...
We call a Galois representation a finite dimensional vector space, or a free-module of finite rank o...
The thesis treats two questions situated in the Langlands program, which is one of the most active a...
The thesis treats two questions situated in the Langlands program, which is one of the most active a...
We present an algorithm to determine if the $L$-series associated to an automorphic representation a...
AbstractLet K be a quadratic imaginary number field with discriminant DK≠-3,-4 and class number one....
The thesis treats two questions situated in the Langlands program, which is one of the most active a...