A hypothetical upper bound on the heights of the solutions of a Diophantine equation with a finite number of solutions

Let f ( 1 ) = 1 , and let f ( n + 1 ) = 2 2 f ( n ) for every positive integer n. We consider the following hypothesis: if a system S &sube; {xi · xj = xk : i, j, k ∈ {1, . . . , n}} ∪ {xi + 1 = xk : i, k ∈{1, . . . , n}} has only finitely many solutions in non-negative integers x1, . . . , xn, then each such solution (x1, . . . , xn) satisfies x1, . . . , xn ≤ f (2n). We prove:   (1) the hypothesisimplies that there exists an algorithm which takes as input a Diophantine equation, returns an integer, and this integer is greater than the heights of integer (non-negative integer, positive integer, rational) solutions, if the solution set is finite; (2) the hypothesis implies that there exists an algorithm for listing the Diophantine equations with infinitely many solutions in non-negative integers; (3) the hypothesis implies that the question whether or not a given Diophantine equation has only finitely many rational solutions is decidable by a single query to an oracle that decides whether or not a given Diophantine equation has a rational solution; (4) the hypothesis implies that the question whether or not a given Diophantine equation has only finitely many integer solutions is decidable by a single query to an oracle that decides whether or not a given Diophantine equation has an integer solution; (5) the hypothesis implies that if a set M &sube; N has a finite-fold Diophantine representation, then M is computable.

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A Hypothetical Upper Bound on the Heights of the Solutions of a Diophantine Equation with a Finite Number of Solutions

10.20944/preprints201804.0121.v1 ◽

2018 ◽

Author(s):

Apoloniusz Tyszka

Keyword(s):

Positive Integer ◽

Finite Number ◽

Diophantine Equation ◽

Upper Bound ◽

Diophantine Equations ◽

Rational Solution ◽

Infinitely Many Solutions ◽

Rational Solutions ◽

Number Of Solutions ◽

Integer Solutions

Let f ( 1 ) = 1 , and let f ( n + 1 ) = 2 2 f ( n ) for every positive integer n. We consider the following hypothesis: if a system S &sube; {xi · xj = xk : i, j, k ∈ {1, . . . , n}} ∪ {xi + 1 = xk : i, k ∈{1, . . . , n}} has only finitely many solutions in non-negative integers x1, . . . , xn, then each such solution (x1, . . . , xn) satisfies x1, . . . , xn ≤ f (2n). We prove:   (1) the hypothesisimplies that there exists an algorithm which takes as input a Diophantine equation, returns an integer, and this integer is greater than the heights of integer (non-negative integer, positive integer, rational) solutions, if the solution set is finite; (2) the hypothesis implies that there exists an algorithm for listing the Diophantine equations with infinitely many solutions in non-negative integers; (3) the hypothesis implies that the question whether or not a given Diophantine equation has only finitely many rational solutions is decidable by a single query to an oracle that decides whether or not a given Diophantine equation has a rational solution; (4) the hypothesis implies that the question whether or not a given Diophantine equation has only finitely many integer solutions is decidable by a single query to an oracle that decides whether or not a given Diophantine equation has an integer solution; (5) the hypothesis implies that if a set M &sube; N has a finite-fold Diophantine representation, then M is computable.

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ON THE NUMBER OF SOLUTIONS OF THE DIOPHANTINE EQUATION axm−byn=c

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972709001002 ◽

2010 ◽

Vol 81 (2) ◽

pp. 177-185 ◽

Cited By ~ 1

Author(s):

BO HE ◽

ALAIN TOGBÉ

Keyword(s):

Positive Integer ◽

Diophantine Equation ◽

Number Of Solutions ◽

Integer Solutions ◽

Image Position ◽

Positive Integers

AbstractLet a, b, c, x and y be positive integers. In this paper we sharpen a result of Le by showing that the Diophantine equation has at most two positive integer solutions (m,n) satisfying min (m,n)>1.

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Is there a computable upper bound on the heights of rational solutions of a Diophantine equation with a finite number of solutions?

Proceedings of the 2017 Federated Conference on Computer Science and Information Systems ◽

10.15439/2017f42 ◽

2017 ◽

Cited By ~ 1

Author(s):

Krzysztof Molenda ◽

Agnieszka Peszek ◽

Maciej Sporysz ◽

Apoloniusz Tyszka

Keyword(s):

Finite Number ◽

Diophantine Equation ◽

Upper Bound ◽

Rational Solutions ◽

Number Of Solutions

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A note on the exponential Diophantine equation (A^2n)^x+(B^2n)^y=((A^2+B^2)n)^z

Glasnik Matematicki ◽

10.3336/gm.55.2.03 ◽

2020 ◽

Vol 55 (2) ◽

pp. 195-201

Author(s):

Maohua Le ◽

◽

Gökhan Soydan ◽

Keyword(s):

Positive Integer ◽

Diophantine Equation ◽

Upper Bound ◽

Diophantine Equations ◽

Exponential Diophantine Equation ◽

Positive Integer Solution ◽

Exponential Diophantine Equations ◽

Integer Solutions ◽

Positive Integers ◽

Upper Bound For Solutions

Let A, B be positive integers such that min{A,B}>1, gcd(A,B) = 1 and 2|B. In this paper, using an upper bound for solutions of ternary purely exponential Diophantine equations due to R. Scott and R. Styer, we prove that, for any positive integer n, if A >B3/8, then the equation (A2 n)x + (B2 n)y = ((A2 + B2)n)z has no positive integer solutions (x,y,z) with x > z > y; if B>A3/6, then it has no solutions (x,y,z) with y>z>x. Thus, combining the above conclusion with some existing results, we can deduce that, for any positive integer n, if B ≡ 2 (mod 4) and A >B3/8, then this equation has only the positive integer solution (x,y,z)=(1,1,1).

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On the Ternary Exponential Diophantine Equation Equating a Perfect Power and Sum of Products of Consecutive Integers

Mathematics ◽

10.3390/math9151813 ◽

2021 ◽

Vol 9 (15) ◽

pp. 1813

Author(s):

S. Subburam ◽

Lewis Nkenyereye ◽

N. Anbazhagan ◽

S. Amutha ◽

M. Kameswari ◽

...

Keyword(s):

Positive Integer ◽

Diophantine Equation ◽

Upper Bound ◽

Exponential Diophantine Equation ◽

Research Article ◽

All Solutions ◽

Sum Of Products ◽

Consecutive Integers ◽

Sums Of Products ◽

Positive Integers

Consider the Diophantine equation yn=x+x(x+1)+⋯+x(x+1)⋯(x+k), where x, y, n, and k are integers. In 2016, a research article, entitled – ’power values of sums of products of consecutive integers’, primarily proved the inequality n= 19,736 to obtain all solutions (x,y,n) of the equation for the fixed positive integers k≤10. In this paper, we improve the bound as n≤ 10,000 for the same case k≤10, and for any fixed general positive integer k, we give an upper bound depending only on k for n.

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A hypothetical way to compute an upper bound for the heights of solutions of a Diophantine equation with a finite number of solutions

Proceedings of the 2015 Federated Conference on Computer Science and Information Systems ◽

10.15439/2015f41 ◽

2015 ◽

Cited By ~ 1

Author(s):

Apoloniusz Tyszka

Keyword(s):

Finite Number ◽

Diophantine Equation ◽

Upper Bound ◽

Number Of Solutions

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On Positive Integer Solutions of the Equation xy + yz + xz = n

Canadian Mathematical Bulletin ◽

10.4153/cmb-1996-024-5 ◽

1996 ◽

Vol 39 (2) ◽

pp. 199-202 ◽

Cited By ~ 1

Author(s):

Al-Zaid Hassan ◽

B. Brindza ◽

Á. Pintér

Keyword(s):

Positive Integer ◽

Upper Bound ◽

Class Number ◽

Quadratic Forms ◽

Negative Integer ◽

Number Of Solutions ◽

Integer Solutions

AbstractAs it had been recognized by Liouville, Hermite, Mordell and others, the number of non-negative integer solutions of the equation in the title is strongly related to the class number of quadratic forms with discriminant —n. The purpose of this note is to point out a deeper relation which makes it possible to derive a reasonable upper bound for the number of solutions.

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ON THE DIOPHANTINE EQUATION axy + byz + czx = 0

International Journal of Number Theory ◽

10.1142/s1793042112500467 ◽

2012 ◽

Vol 08 (03) ◽

pp. 813-821 ◽

Cited By ~ 2

Author(s):

ZHONGFENG ZHANG ◽

PINGZHI YUAN

Keyword(s):

Positive Integer ◽

Diophantine Equation ◽

Integer Solutions ◽

Positive Integers

Let a, b, c be integers. In this paper, we prove the integer solutions of the equation axy + byz + czx = 0 satisfy max {|x|, |y|, |z|} ≤ 2 max {a, b, c} when a, b, c are odd positive integers, and when a = b = 1, c = -1, the positive integer solutions of the equation satisfy max {x, y, z} < exp ( exp ( exp (5))).

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COUNTING THE NUMBER OF SOLUTIONS TO THE ERDŐS–STRAUS EQUATION ON UNIT FRACTIONS

Journal of the Australian Mathematical Society ◽

10.1017/s1446788712000468 ◽

2013 ◽

Vol 94 (1) ◽

pp. 50-105 ◽

Cited By ~ 12

Author(s):

CHRISTIAN ELSHOLTZ ◽

TERENCE TAO

Keyword(s):

Positive Integer ◽

Lower Bounds ◽

Diophantine Equation ◽

Upper And Lower Bounds ◽

Natural Numbers ◽

Number Of Solutions ◽

Waring’S Problem ◽

Unit Fractions ◽

Image Position ◽

Positive Integers

AbstractFor any positive integer $n$, let $f(n)$ denote the number of solutions to the Diophantine equation $$\begin{eqnarray*}\frac{4}{n} = \frac{1}{x} + \frac{1}{y} + \frac{1}{z}\end{eqnarray*}$$ with $x, y, z$ positive integers. The Erdős–Straus conjecture asserts that $f(n)\gt 0$ for every $n\geq 2$. In this paper we obtain a number of upper and lower bounds for $f(n)$ or $f(p)$ for typical values of natural numbers $n$ and primes $p$. For instance, we establish that $$\begin{eqnarray*}N\hspace{0.167em} {\mathop{\log }\nolimits }^{2} N\ll \displaystyle \sum _{p\leq N}f(p)\ll N\hspace{0.167em} {\mathop{\log }\nolimits }^{2} N\log \log N.\end{eqnarray*}$$ These upper and lower bounds show that a typical prime has a small number of solutions to the Erdős–Straus Diophantine equation; small, when compared with other additive problems, like Waring’s problem.

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