Factorization of a Formal Power Series with Constant Term Certain Power of a Prime

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Authors

  • Mriganka S. Dutta
     Department of Mathematics, Nalbari College, Nalbari-781335 Assam ,IN
  • Helen K. Saikia
     Department of Mathematics, Gauhati University, Guwahati-781014 Assam ,IN

DOI:

https://doi.org/10.18311/jims/2024/31941

Keywords:

Irreducible, Invertible, Factorization, Formal Power Series.

Abstract

This article explores formal power series with integer coefficients, specifically those of a particular form. The primary focus lies in the factorization and irreducibility criteria for these power series. An algorithm is presented for the factorization of power series with a constant term that is the cube of a prime, subject to specific conditions. Furthermore, we establish an irreducibility criterion applicable to power series with a constant term represented by the cube of a prime, as well as higher powers of a prime. The results not only contribute to the understanding of these specialized power series but also provide a practical algorithm for their factorization under certain constraints. The findings have broader implications for the study of power series with integer coefficients, offering insights into their structural properties and mathematical significance.

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Published

2024-07-01

How to Cite

Dutta, M. S., & Saikia, H. K. (2024). Factorization of a Formal Power Series with Constant Term Certain Power of a Prime. The Journal of the Indian Mathematical Society, 91(3-4), 344–355. https://doi.org/10.18311/jims/2024/31941

Issue

Volume 91, Issue 3-4, July-December 2024

Section

Articles

License

Copyright (c) 2024 Mriganka Dutta, HELEN SAIKIA

Creative Commons License

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

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Europe PMC
Received 2022-11-15
Accepted 2024-01-25
Published 2024-07-01

 

References

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M. S. Dutta, H. K. Saikia, Irreducibility of a Formal Power Series with Integer Coefficients, Journal of the Indian Math. Soc., 88: No. (3-4), (2021), 298-308