Applying results on linear forms in p-adic logarithms, we prove that if (x,y,z) is a positive integer solution to the equation $x^{y} - y^{x} = c^{z}$ with gcd(x,y) = 1 then (x,y,z) = (2,1,k), (3,2,k), k ≥ 1 if c = 1, and either $(x, y, z) = (c^{k} + 1, 1, k)$ , k ≥ 1 or $2 \leq x < y \leq m a x 1.5 \times 10^{10}, c$ if c ≥ 2.

A generalization of the question of Sierpiński on geometric progressions.

Luo, Jiagui; Yuan, Pingzhi — 2010

Journal of Integer Sequences [electronic only]

On certain inequalities related to the Seitz inequality.

Wang, Liangcheng; Luo, Jiagui — 2004

JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]

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A note on the Diophantine equation ( a n x m ± 1 ) / ( a n x ± 1 ) = y n + 1

On the Diophantine equation (x² ± C)(y² ± D) = z⁴

Square-classes in Lehmer sequences having odd parameters and their applications

On the diophantine equation x y - y x = c z

A generalization of the question of Sierpiński on geometric progressions.

On certain inequalities related to the Seitz inequality.

A note on the Diophantine equation $(a^{n} x^{m} \pm 1) / (a^{n} x \pm 1) = y^{n} + 1$

On the diophantine equation $x^{y} - y^{x} = c^{z}$