The Solution of Fermat’s Two Squares Equation and Its Generalization In Lucas Sequences

Ali S. Athab; Hayder R. Hashim

doi:10.21123/bsj.2023.8786

Baghdad Science Journal (Jun 2024)

The Solution of Fermat’s Two Squares Equation and Its Generalization In Lucas Sequences

Ali S. Athab,
Hayder R. Hashim

Affiliations

Ali S. Athab: Department of Mathematics, Faculty of Computer Science and Mathematics, University of Kufa, Al Najaf, Iraq.
Hayder R. Hashim: ORCiD; Department of Mathematics, Faculty of Computer Science and Mathematics, University of Kufa, Al Najaf, Iraq.

DOI: https://doi.org/10.21123/bsj.2023.8786
Journal volume & issue: Vol. 21, no. 6

Abstract

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As it is well known, there are an infinite number of primes in special forms such as Fermat's two squares form, p=x^2+y^2 or its generalization, p=x^2+y^4, where the unknowns x, y, and p represent integers. The main goal of this paper is to see if these forms still have an infinite number of solutions when the unknowns are derived from sequences with an infinite number of prime numbers in their terms. This paper focuses on the solutions to these forms where the unknowns represent terms in certain binary linear recurrence sequences known as the Lucas sequences of the first and second types.

Diophantine equation, Elliptic curves, Fermat’s two squares Theorem, Lucas sequences, Prime numbers

Published in Baghdad Science Journal

ISSN: 2078-8665 (Print); 2411-7986 (Online)
Publisher: College of Science for Women, University of Baghdad
Country of publisher: Iraq
LCC subjects: Science
Website: http://bsj.uobaghdad.edu.iq/index.php/BSJ

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