JP Journal of Algebra, Number Theory and Applications

The JP Journal of Algebra, Number Theory and Applications is a prestigious international journal indexed in the Emerging Sources Citation Index (ESCI). It publishes original research papers, both theoretical and applied in nature, in various branches of algebra and number theory. The journal also welcomes survey articles that contribute to the advancement of these fields.

Submit Article

MATRIX SOLUTIONS FOR THE NON-LINEAR EXPONENTIAL DIOPHANTINE EQUATION$$\left(X^a+\alpha I_q\right)^m+\left(Y^b+\beta I_q\right)^n=Z^2$$$$\alpha, \beta \in Z, a, b, m, n, q \in \mathrm{~N}, X, Y, Z \in M_q(\mathrm{~N})$$

Authors

  • Kolo F. Soro
  • Eric D. Akéké
  • Jean R. Tsiba

Keywords:

Kolo F. Soro, Eric D. Akéké and Jean R. Tsiba, Matrix solutions for the non-linear exponential Diophantine equation

DOI:

https://doi.org/10.17654/0972555526001

Abstract

We investigate matrix solutions for the non-linear exponential Diophantine equation

$$
\left(X^a+\alpha I_q\right)^m+\left(Y^b+\beta I_q\right)^n=Z^2,
$$

where $\alpha, \beta \in \mathrm{Z}$ and $a, b, m, n, q \in \mathrm{~N}$ such that $q$ is a common multiple of $a$ and $b$. We show that this equation admits an infinite number of matrix solutions which do not depend on $m$ and $n$.

Received: April 25, 2025
Revised: July 12, 2025
Accepted: September 1, 2025

References

[1] J. L. Brenner and J. De Pillis, Fermat’s equation for matrices of integers, Math. Mag. 45(1) (1972), 12-15.

[2] E. D. Bolker, Solutions of in integral matrices, Amer. Math. Monthly 75(1) (1968), 759-760.

[3] Deepak Gupta, Satish Kumar and Sudhanshu Aggarwal, Solution of non-linear exponential, Diophantine equation Journal of Emerging Technologies and Innovative Research 9(9) (2022), 154-157.

[4] W. Ivorra and A. Kraus, Quelques résultats sur les équations Canad. J. Math. 58 (2006), 115-153.

[5] J. M. Mouanda, D. Dehainsala and K. Kangni, On matrix elliptic curves and matrix solutions of the exponential Diophantine equation Japan Journal of Research 5(3) (2024), 1-6.

[6] J. M. Mouanda, On Beal’s conjecture for matrix solutions and multiplication commutative groups of rare matrices, Turkish Journal of Analysis and Number Theory 12(1) (2024), 1-7.

[7] J. M. Mouanda, On construction structures of matrix solutions of exponential Diophantine equations, Journal of Advances in Mathematics and Computer Science 39(5) (2024), 1-14.

[8] J. M. Mouanda, On multiverses (or parallel universes) of matrix triple solutions of the Diophantine equation London Journal of Research in Science: Natural and Formal 24(9) (2024), 75-85.

Downloads

Published

2025-11-17

Issue

Vol. 65 No. 1 (2026)

Section

Articles

License

Copyright (c) 2025 PUSHPA PUBLISHING HOUSE, PRAYAGRAJ, INDIA

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

_________________________________

Licensing Terms:

Attribution: Credit Pusha Publishing House as the original publisher, including title and author(s) if applicable.

Non-Commercial Use: For non-commercial purposes only. No commercial activities without explicit permission.

No Derivatives: Modifying or creating derivative works not allowed without written permission.

Contact Pusha Publishing House for more info or permissions.

How to Cite

MATRIX SOLUTIONS FOR THE NON-LINEAR EXPONENTIAL DIOPHANTINE EQUATION$$\left(X^a+\alpha I_q\right)^m+\left(Y^b+\beta I_q\right)^n=Z^2$$$$\alpha, \beta \in Z, a, b, m, n, q \in \mathrm{~N}, X, Y, Z \in M_q(\mathrm{~N})$$. (2025). JP Journal of Algebra, Number Theory and Applications, 65(1), 1-20. https://doi.org/10.17654/0972555526001

Similar Articles

1-10 of 48

You may also start an advanced similarity search for this article.