Add to ORKGUsing the theory of Pellian equations, we show that the Diophantine equations have infinitely many nontrivial integer solutions (x, y) by using Generalized Biperiodic Fibonacci and lucas sequence. We also derive some recurrence relations on the integer solutions (x, y) of E. AMS Subject Classification: 11D09
Let t ≥ 2 be a positive integer. Extending the work of A. Tekcan, here we consider the number of int...
summary:Consider the system $x^2-ay^2=b$, $P(x,y)= z^2$, where $P$ is a given integer polynomial. Hi...
We consider the equation (1) ax 2 by2 c 0, with a,b * and c *. It is a generalization of the Pell’s...
In this study, we deal with some Diophantine equations. By using the generalized Fibonacci and Lucas...
Let t ? 2 be an integer. In this work, we consider the number of integer solutions of Diophantine eq...
AbstractWe prove that the Diophantine equation x2−kxy+y2+lx=0,l∈{1,2,4} has an infinite number of po...
The binary quadratic Diophantine equation represented by is analyzed for its non-zero distinct inte...
Let t >= 2 be an integer. In this work, we consider the number of integer solutions of Diophantine e...
In this study, we determine when the Diophantine equation x (2)-kxy+y (2)-2 (n) = 0 has an infinite ...
n=0 is given by the recurrence un = 2un−1 + un−2 with initial condition u0 = 0, u1 = 1 and its assoc...
Consider the system x 2 − ay 2 = b, P (x, y) = z ...
Consider the system x2 − ay2 = b, P (x, y) = z2, where P is a given integer polynomial. Historically...
By using the theory of Pell equations, we prove that the Diophantine equation $(x+y+z)^2=xyw$ has in...
summary:In this study, we determine when the Diophantine equation $x^{2}-kxy+y^{2}-2^{n}=0$ has an i...
summary:In this study, we determine when the Diophantine equation $x^{2}-kxy+y^{2}-2^{n}=0$ has an i...
Let t ≥ 2 be a positive integer. Extending the work of A. Tekcan, here we consider the number of int...
summary:Consider the system $x^2-ay^2=b$, $P(x,y)= z^2$, where $P$ is a given integer polynomial. Hi...
We consider the equation (1) ax 2 by2 c 0, with a,b * and c *. It is a generalization of the Pell’s...
In this study, we deal with some Diophantine equations. By using the generalized Fibonacci and Lucas...
Let t ? 2 be an integer. In this work, we consider the number of integer solutions of Diophantine eq...
AbstractWe prove that the Diophantine equation x2−kxy+y2+lx=0,l∈{1,2,4} has an infinite number of po...
The binary quadratic Diophantine equation represented by is analyzed for its non-zero distinct inte...
Let t >= 2 be an integer. In this work, we consider the number of integer solutions of Diophantine e...
In this study, we determine when the Diophantine equation x (2)-kxy+y (2)-2 (n) = 0 has an infinite ...
n=0 is given by the recurrence un = 2un−1 + un−2 with initial condition u0 = 0, u1 = 1 and its assoc...
Consider the system x 2 − ay 2 = b, P (x, y) = z ...
Consider the system x2 − ay2 = b, P (x, y) = z2, where P is a given integer polynomial. Historically...
By using the theory of Pell equations, we prove that the Diophantine equation $(x+y+z)^2=xyw$ has in...
summary:In this study, we determine when the Diophantine equation $x^{2}-kxy+y^{2}-2^{n}=0$ has an i...
summary:In this study, we determine when the Diophantine equation $x^{2}-kxy+y^{2}-2^{n}=0$ has an i...
Let t ≥ 2 be a positive integer. Extending the work of A. Tekcan, here we consider the number of int...
summary:Consider the system $x^2-ay^2=b$, $P(x,y)= z^2$, where $P$ is a given integer polynomial. Hi...
We consider the equation (1) ax 2 by2 c 0, with a,b * and c *. It is a generalization of the Pell’s...