Add to ORKGThis note proves two theorems regarding Fermat-type equation $x^r + y^r = dz^p$ where $r \geq 5$ is a prime. Our main result shows that, for infinitely many integers~$d$, the previous equation has no non-trivial primitive solutions such that $2 \mid x+y$ or $r \mid x+y$, for a set of exponents $p$ of positive density. We use the modular method with a symplectic argument to prove this result.Comment: 6 page
AbstractWe prove by the theory of algebraic numbers a result (Theorem 3) which, together with our ea...
The project aims to deliver sufficient mathematical background to understand a partial proof, due to...
In this thesis we study the Diophantine equation xp - Dy2p = z2; gcd(x; z) = 1; p prime: We combin...
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We show that the equation $\frac{x^p + y^p}{x+y} = p^e z^q$ has no solutions in coprime integers $x,...
Assuming a deep but standard conjecture in the Langlands programme, we prove Fermat’s Last Theorem o...
In 1995, A, Wiles [2], [3], announced, using cyclic groups ( a subject area which was not available ...
Fermat's Last Theorem—which we shall abbreviate to FLT—is the (as yet unproved) assertion that ...
AbstractKummer's method of proof is applied to the Fermat equation over quadratic fields. The concep...
Treballs finals del Màster en Matemàtica Avançada, Facultat de matemàtiques, Universitat de Barcelon...
In 1995, A, Wiles announced, using cyclic groups ( a subject area which was not available at the tim...
In this article, we study the non-trivial solutions of the Diophantine equations $x^p+y^p=2^r z^p$ a...
We study the Fermat equation xn+yn=zn over quadratic fields Q(d√) for squarefree d with 26≤d≤97. By ...
Let K be a number field, S be the set of primes of K above 2 and T the subset of primes above 2 havi...
Let $K$ be a number field. Using the modular method, we prove asymptotic results on solutions of the...
AbstractWe prove by the theory of algebraic numbers a result (Theorem 3) which, together with our ea...
The project aims to deliver sufficient mathematical background to understand a partial proof, due to...
In this thesis we study the Diophantine equation xp - Dy2p = z2; gcd(x; z) = 1; p prime: We combin...
AbstractThis paper continues the search to determine for what exponents n Fermat's Last Theorem is t...
We show that the equation $\frac{x^p + y^p}{x+y} = p^e z^q$ has no solutions in coprime integers $x,...
Assuming a deep but standard conjecture in the Langlands programme, we prove Fermat’s Last Theorem o...
In 1995, A, Wiles [2], [3], announced, using cyclic groups ( a subject area which was not available ...
Fermat's Last Theorem—which we shall abbreviate to FLT—is the (as yet unproved) assertion that ...
AbstractKummer's method of proof is applied to the Fermat equation over quadratic fields. The concep...
Treballs finals del Màster en Matemàtica Avançada, Facultat de matemàtiques, Universitat de Barcelon...
In 1995, A, Wiles announced, using cyclic groups ( a subject area which was not available at the tim...
In this article, we study the non-trivial solutions of the Diophantine equations $x^p+y^p=2^r z^p$ a...
We study the Fermat equation xn+yn=zn over quadratic fields Q(d√) for squarefree d with 26≤d≤97. By ...
Let K be a number field, S be the set of primes of K above 2 and T the subset of primes above 2 havi...
Let $K$ be a number field. Using the modular method, we prove asymptotic results on solutions of the...
AbstractWe prove by the theory of algebraic numbers a result (Theorem 3) which, together with our ea...
The project aims to deliver sufficient mathematical background to understand a partial proof, due to...
In this thesis we study the Diophantine equation xp - Dy2p = z2; gcd(x; z) = 1; p prime: We combin...