Assuming the Birch and Swinnerton-Dyer conjecture, an odd square-free integer $n$ is a congruent number if and only if the number of triplets of integers $(x, y, z)$ satisfying $2 \cdot x^{2} + y^{2} + 8 \cdot z^{2} = n$ is twice the number of triplets satisfying $2 \cdot x^{2} + y^{2} + 32 \cdot z^{2} = n$ due to Tunnell's theorem. However, we show these equations are instances of a variant of counting solutions of the homogeneous Diophantine equations of degree two which is a $\textit{\#P--complete}$ problem. Deciding whether $n$ is congruent or not is a problem in $NP$ since congruent numbers could be easily checked by a congruum, because of every congruent number is a product of a congruum and the square of a rational number. We conject...
We consider the problem of describing all non-negative integer solutions to a linear congruence in m...
summary:We consider a variety of Euler's sum of powers conjecture, i.e., whether the Diophantine sys...
summary:We consider a variety of Euler's sum of powers conjecture, i.e., whether the Diophantine sys...
Assuming the Birch and Swinnerton-Dyer conjecture, an odd square-free integer $n$ is a congruent num...
Assuming the Birch and Swinnerton-Dyer conjecture, an odd square-free integer $n$ is a congruent num...
Assuming the Birch and Swinnerton-Dyer conjecture, an odd square-free integer $n$ is a congruent num...
Number theory is an area of mathematics which is concerned with properties of the integers, and beca...
Abstract. We discuss positive integer solutions to Diophantine equa-tions of the shape x(x+ 1)(x+ 2)...
This paper contributes to the conjecture of R. Scott and R. Styer which asserts that for any fixed r...
The simplest case of Fermat's last theorem, the impossibility of solving x3 + y3 = z3 in nonzero int...
AbstractFor any positive integer n we state and prove formulas for the number of solutions, in integ...
We take an approach toward Counting the number of integers n for which the curve (n),: y(2) = x(3) -...
A positive integer n is a congruent number if it is equal to the area of a right triangle with ratio...
We consider the diophantine equation xp - x = yq - y, in integers (x, p, y, q). We prove that for gi...
If a and b are distinct positive integers then a previous result of the author implies that the simu...
We consider the problem of describing all non-negative integer solutions to a linear congruence in m...
summary:We consider a variety of Euler's sum of powers conjecture, i.e., whether the Diophantine sys...
summary:We consider a variety of Euler's sum of powers conjecture, i.e., whether the Diophantine sys...
Assuming the Birch and Swinnerton-Dyer conjecture, an odd square-free integer $n$ is a congruent num...
Assuming the Birch and Swinnerton-Dyer conjecture, an odd square-free integer $n$ is a congruent num...
Assuming the Birch and Swinnerton-Dyer conjecture, an odd square-free integer $n$ is a congruent num...
Number theory is an area of mathematics which is concerned with properties of the integers, and beca...
Abstract. We discuss positive integer solutions to Diophantine equa-tions of the shape x(x+ 1)(x+ 2)...
This paper contributes to the conjecture of R. Scott and R. Styer which asserts that for any fixed r...
The simplest case of Fermat's last theorem, the impossibility of solving x3 + y3 = z3 in nonzero int...
AbstractFor any positive integer n we state and prove formulas for the number of solutions, in integ...
We take an approach toward Counting the number of integers n for which the curve (n),: y(2) = x(3) -...
A positive integer n is a congruent number if it is equal to the area of a right triangle with ratio...
We consider the diophantine equation xp - x = yq - y, in integers (x, p, y, q). We prove that for gi...
If a and b are distinct positive integers then a previous result of the author implies that the simu...
We consider the problem of describing all non-negative integer solutions to a linear congruence in m...
summary:We consider a variety of Euler's sum of powers conjecture, i.e., whether the Diophantine sys...
summary:We consider a variety of Euler's sum of powers conjecture, i.e., whether the Diophantine sys...