Add to ORKGSuppose that $U_n$ is a Lucas sequence of first kind and has a dominant root $\alpha$ with $\alpha>1$ and the discriminant $D>0$. In this paper, we study the Diophantine equation $U_n + U_m = x^q$ in integers $n \geq m \geq 0$, $x \geq 2$, and $q \geq 2$. Firstly, we show that there are only finitely many of them for a fixed $x$ using linear forms in logarithms. Secondly, we show that there are only finitely many solutions in $(n, m, x, q)$ with $q, x\geq 2$ under the assumption of the {\em abc conjecture}. To prove this, we use several classical results like Schmidt subspace theorem, a fundamental theorem on linear equations in $S$-units and Siegel's theorem concerning the finiteness of the number of solutions of a hyperelliptic equation.C...
AbstractWe prove a necessary condition for the Diophantine equation Gm = P(x), with Gm a second orde...
We study solvability of the Diophantine equation in integers satisfying the conditions and for . The...
We consider the diophantine equation xp - x = yq - y, in integers (x, p, y, q). We prove that for gi...
AbstractIn this paper, we show that if (un)n⩾1 is a Lucas sequence, then the Diophantine equation un...
In this paper, we show that if (u<SUB>n</SUB>)<SUB>n≥1</SUB> is a Lucas sequence, then the Diophanti...
summary:Let $(G_{n})_{n \geq 1}$ be a binary linear recurrence sequence that is represented by the L...
summary:Let $(G_{n})_{n \geq 1}$ be a binary linear recurrence sequence that is represented by the L...
In 1876 Brocard, and independently in 1913 Ramanujan, asked to find all integer solutions for the eq...
AbstractLet A, B, G0, G1 be integers, and Gn = AGn − 1 − BGn − 2 for n ≥ 2. Let further S be the set...
AbstractIn this paper, we show that if (un)n⩾1 is a Lucas sequence, then the Diophantine equation un...
In this note, we show that the ABC-conjecture implies that a diophantine equation of the form P(x) =...
Erd\"os and Obl\'ath proved that the equation $n!\pm m!=x^p$ has only finitely many integer solution...
We give the complete solution (n, a, b, x, y) of the title equation when gcd(x,y) = 1, except for th...
AbstractLet A1, …, Ar, x1, …, xr, and A be known positive integers. Let f(A) be the number of intege...
In this note, we show that the ABC-conjecture implies that a diophantine equation of the form P(x) =...
AbstractWe prove a necessary condition for the Diophantine equation Gm = P(x), with Gm a second orde...
We study solvability of the Diophantine equation in integers satisfying the conditions and for . The...
We consider the diophantine equation xp - x = yq - y, in integers (x, p, y, q). We prove that for gi...
AbstractIn this paper, we show that if (un)n⩾1 is a Lucas sequence, then the Diophantine equation un...
In this paper, we show that if (u<SUB>n</SUB>)<SUB>n≥1</SUB> is a Lucas sequence, then the Diophanti...
summary:Let $(G_{n})_{n \geq 1}$ be a binary linear recurrence sequence that is represented by the L...
summary:Let $(G_{n})_{n \geq 1}$ be a binary linear recurrence sequence that is represented by the L...
In 1876 Brocard, and independently in 1913 Ramanujan, asked to find all integer solutions for the eq...
AbstractLet A, B, G0, G1 be integers, and Gn = AGn − 1 − BGn − 2 for n ≥ 2. Let further S be the set...
AbstractIn this paper, we show that if (un)n⩾1 is a Lucas sequence, then the Diophantine equation un...
In this note, we show that the ABC-conjecture implies that a diophantine equation of the form P(x) =...
Erd\"os and Obl\'ath proved that the equation $n!\pm m!=x^p$ has only finitely many integer solution...
We give the complete solution (n, a, b, x, y) of the title equation when gcd(x,y) = 1, except for th...
AbstractLet A1, …, Ar, x1, …, xr, and A be known positive integers. Let f(A) be the number of intege...
In this note, we show that the ABC-conjecture implies that a diophantine equation of the form P(x) =...
AbstractWe prove a necessary condition for the Diophantine equation Gm = P(x), with Gm a second orde...
We study solvability of the Diophantine equation in integers satisfying the conditions and for . The...
We consider the diophantine equation xp - x = yq - y, in integers (x, p, y, q). We prove that for gi...