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Glasnik matematički, Vol. 59 No. 2, 2024.

Izvorni znanstveni članak

https://doi.org/10.3336/gm.59.2.02

At most one solution to \(a^x + b^y = c^z\) of \(a\), \(b\), \(c\)

Robert Styer ; Department of Mathematics, Villanova University, Villanova, PA, USA

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str. 277-298

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For fixed coprime positive integers \(a\), \(b\), and \(c\) with \(\min(a, b, c) > 1\), we consider the number of solutions in positive integers \((x, y, z)\) for the purely exponential Diophantine equation \(a^x + b^y = c^z\). Apart from a list of known exceptions, a conjecture published in 2016 claims that this equation has at most one solution in positive integers \(x\), \(y\), and \(z\). We show that this is true for some ranges of \(a\), \(b\), \(c\), for instance, when \(1 \lt a,b \lt 3600\) and \(c \lt 10^{10}\). The conjecture also holds for small pairs \((a,b)\) independent of \(c\), where \(2 \le a,b \le 10\) with \(\gcd(a,b)=1\). We show that the Pillai equation \(a^x - b^y = r \gt 0\) has at most one solution (with a known list of exceptions) when \(2 \le a,b \le 3600\) (with \(\gcd(a,b)=1\)). Finally, the primitive case of the Jeśmanowicz conjecture holds when \(a \le 10^6\) or when \(b \le 10^6\). This work highlights the power of some ideas of Miyazaki and Pink and the usefulness of a theorem by Scott.

Ključne riječi

Purely exponential Diophantine, number of solutions, Jeśmanowicz conjecture, Pillai equation

Hrčak ID:

325171

URI

https://hrcak.srce.hr/325171

Datum izdavanja:

28.12.2024.

Posjeta: 0 *

Publication date: 15 December 2024

Volume: Vol 59

Issue: Svezak 2

Pages: 277-298

DOI: 10.3336/gm.59.2.02

Article Information (continued)

Categories:

Subject: Izvorni znanstveni članak

Keywords:

Keyword: Purely exponential Diophantine, number of solutions, Jeśmanowicz conjecture, Pillai equation

At most one solution to \(a^x + b^y = c^z\) of \(a\), \(b\), \(c\)

Robert Styer[1]

Email: robert.styer@villanova.edu

 

[1] Department of Mathematics, Villanova University, Villanova, PA, USA

Abstract

For fixed coprime positive integers \(a\), \(b\), and \(c\) with \(\min(a, b, c) > 1\), we consider the number of solutions in positive integers \((x, y, z)\) for the purely exponential Diophantine equation \(a^x + b^y = c^z\). Apart from a list of known exceptions, a conjecture published in 2016 claims that this equation has at most one solution in positive integers \(x\), \(y\), and \(z\). We show that this is true for some ranges of \(a\), \(b\), \(c\), for instance, when \(1 \lt a,b \lt 3600\) and \(c \lt 10^{10}\). The conjecture also holds for small pairs \((a,b)\) independent of \(c\), where \(2 \le a,b \le 10\) with \(\gcd(a,b)=1\). We show that the Pillai equation \(a^x - b^y = r \gt 0\) has at most one solution (with a known list of exceptions) when \(2 \le a,b \le 3600\) (with \(\gcd(a,b)=1\)). Finally, the primitive case of the Jeśmanowicz conjecture holds when \(a \le 10^6\) or when \(b \le 10^6\). This work highlights the power of some ideas of Miyazaki and Pink and the usefulness of a theorem by Scott.

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