Add to ORKGIn this thesis we will consider the problems that occur at the intersection of arithmetic progressions and perfect powers. In particular we will study the Erd˝os-Selfridge curves, By^l = x(x + d). . .(x + (k − 1)d), and sums of powers of arithmetic progressions, in particular y ^l = (x−d)^3+x^3+ (x+d)^3 . We shall study these curves using aspects of algebraic and analytic number theory. To all the equations studied we shall show that a putative solution gives rise to solutions of (potentially many) Fermat equations. In the case of Erd˝os-Selfridge curves we will use the modular method to understand the prime divisors of d for large `. Then we shall attach Dirichlet characters to such solutions, which allows us to use analytic met...
Deep methods from the theory of elliptic curves and modular forms have been used to prove Fermat's l...
AbstractIn this paper we present some new results about unlike powers in arithmetic progression. We ...
In this paper we study elliptic curves which have a number of points whose coordinates are in arithm...
In this thesis we will consider the problems that occur at the intersection of arithmetic progressi...
Integral solutions to y² = X³ + k, where either the x's or the y's, or both, are in arithmetic progr...
The arithmetic progression 1, 2, 3 can be broken into two consecutive pieces that have equal sums by...
This thesis is an exposition on the theory of elliptic curves and modular forms as applied to the Fe...
The main purpose of this thesis is to apply the modular approach to Diophantine equations to study s...
Let n, d, k ≥ 2, b, y and l ≥ 3 be positive integers with the greatest prime factor of b not exceedi...
If k is a sufficiently large positive integer, we show that the Diophantine equation n(n+d)⋯(n+(k−1...
This volume contains expanded versions of lectures given at an instructional conference on number th...
abstract: Pierre de Fermat, an amateur mathematician, set upon the mathematical world a challenge so...
We look for elliptic curves featuring rational points whose coordinates form two arithmetic progress...
This is a survey on Diophantine equations, with the purpose being to give the flavour of some known ...
summary:We consider a variety of Euler's sum of powers conjecture, i.e., whether the Diophantine sys...
Deep methods from the theory of elliptic curves and modular forms have been used to prove Fermat's l...
AbstractIn this paper we present some new results about unlike powers in arithmetic progression. We ...
In this paper we study elliptic curves which have a number of points whose coordinates are in arithm...
In this thesis we will consider the problems that occur at the intersection of arithmetic progressi...
Integral solutions to y² = X³ + k, where either the x's or the y's, or both, are in arithmetic progr...
The arithmetic progression 1, 2, 3 can be broken into two consecutive pieces that have equal sums by...
This thesis is an exposition on the theory of elliptic curves and modular forms as applied to the Fe...
The main purpose of this thesis is to apply the modular approach to Diophantine equations to study s...
Let n, d, k ≥ 2, b, y and l ≥ 3 be positive integers with the greatest prime factor of b not exceedi...
If k is a sufficiently large positive integer, we show that the Diophantine equation n(n+d)⋯(n+(k−1...
This volume contains expanded versions of lectures given at an instructional conference on number th...
abstract: Pierre de Fermat, an amateur mathematician, set upon the mathematical world a challenge so...
We look for elliptic curves featuring rational points whose coordinates form two arithmetic progress...
This is a survey on Diophantine equations, with the purpose being to give the flavour of some known ...
summary:We consider a variety of Euler's sum of powers conjecture, i.e., whether the Diophantine sys...
Deep methods from the theory of elliptic curves and modular forms have been used to prove Fermat's l...
AbstractIn this paper we present some new results about unlike powers in arithmetic progression. We ...
In this paper we study elliptic curves which have a number of points whose coordinates are in arithm...