On Phi-Euler's Function in Refined Neutrosophic Number Theory and The Solutions of Fermat's Diophantine Equation

Authors

  • Josef Al Jumayel Faculty Of Science, Beirut Arab University, Beirut, Lebanon
  • Maretta Sarkis Abu Dhabi University, Abu Dhabi, United Arab Emirates
  • Hasan Jafar .Damascus University, Damascus, Syria

Keywords:

refined Neutrosophic integer, Neutrosophic Euler's function, Neutrosophic Fermat's equation

Abstract

The objective of this paper is to answer the open problem proposed about the validity of
phi-Euler’s theorem in the refined neutrosophic ring of integers ð‘(ð¼1,ð¼2) . This work
presents an algorithm to compute the values of Euler’s function on refined neutrosophic
integers, and it prove that phi-Euler’s theorem is still true in ð‘(ð¼1,ð¼2).
On the other hand, we present a solution for another open question about the solutions of
Fermat's Diophantine equation in refined neutrosophic ring of integers, where we
determine the solutions of Fermat's Diophantine equation ð‘‹
ð‘› + ð‘Œ
ð‘› = ð‘
ð‘›
; 𑛠≥ 3 in ð‘(ð¼1,ð¼2).

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Published

2023-03-01

Issue

Vol. 54 (2023): Neutrosophic Sets and Systems

Section

SI#1,2024: Neutrosophical Advancements And Their Impact on Research

License

Creative Commons License

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

 Creative Commons Attribution (CC BY) license.

How to Cite

Josef Al Jumayel, Maretta Sarkis, & Hasan Jafar. (2023). On Phi-Euler’s Function in Refined Neutrosophic Number Theory and The Solutions of Fermat’s Diophantine Equation. Neutrosophic Sets and Systems, 54, 68-76. https://fs.unm.edu/nss8/index.php/111/article/view/3255