The Construction of Armendariz Ring using Formal Triangle Matrix Ring

Authors

  • Aidah Nabilah Anwar Student
  • Amir Kamal Amir
  • Nurdin Hinding

DOI:

https://doi.org/10.20956/j.v19i2.23263

Keywords:

Trinion, Quaternion, BImodule, Ring, Formal Triangle Matrix Ring, Armendariz Ring

Abstract

Trinion and Quaternion numbers are one of the hypercomplex numbers which is an extensions of the complex number. From Trinion and Quaternion numbers, a bimodule can be formed which is an ordered pair of Trinion and Quaternion. Furthermore, Trinion number, Quaternion number, and their bimodule can be formed into a  Formal Triangle Matrix. The Formal Triangle Matrix is better known as the Upper Triangle Matrix. Since Trinion number, Quaternion number and their bimodule are rings, then the Formal Triangle Matrix can be called as the Formal Triangular Matrix Ring. The purpose of this study is to construct the Armendariz Ring using the Formal Triangular Matrix Ring. The obtained results will show that the Formal Triangular Matrix Rings are the -Skew Armendariz Ring and the -Skew -Armendariz Ring, where  is a Ring Endomorphism and  is -derivation.

References

Amir Kamal Amir, N. E. M. B. A. N. A., 2020. Center of The Skew Polynomial Ring Over Trinion Matrix. Far East Journal of Mathematical Sciences (FJMS), Volume 127, pp. 29-40.

Anwar, A. N., 2020. Karakteristik Polinom yang Komutatif dengan Setiap Polinom dalam Gelanggang Polinom Miring dengan Gelanggang Tumpuan Trinion.

Areej M. Abduldaim, S. C., 2013. ∝-skew π-McCoy Rings. Hindawi, p. Volume 2013.

Armendariz, E., 1973. A note on Extensions of Baer and p.p.-rings,. J. Austral Math Soc.

Chebotar, M., 2018. On Skew Laurent Polynomial over Locally Nilpotent Rings. Linear Algebra and Its Applications, pp. 287-290.

Ghahramani, H., 2011. Skew Polynomial Rings of Formal Triangular Matrix Rings. Journal of Algebra, pp. 349 (2012) 201-216.

Hardy, K., 2005. Linear Algebra For Endgineers and Scientists Using Matlab. New Jersey: Pearson Education, Inc.

Howard Anton, C. R., 2011. Elementary Linear Algebra with Supplemental Applications.

McCoy, N. H., 1942. Remarks on Divisors of Zero. Amer Math Monthly.

Mulkiah, 2016. Matriks Representasi Quaternion dan Trinion. Makassar.

Sims, C. C., 1984. Abstract Algebra A Computational Approach. Canada: Library of Congress Cataloging.

Sri Wahyuni, Y. A. N., t.thn. Sifat-Sifat Pengembangan Ring Armendariz dan Ring McCoy. Jurnal Matematika UNAND, pp. Vol.3 No.3 Hal.1-8.

Yuwaningsih, D. A., 2020. Hasil Tambah Langsung Suatu (R,S) Modul. Journal of Fundamental Mathematics and Applications, p. Vol 3 No.2.

Zhang, X., 2018. Power-Serieswise McCoy Modules. Mathematical Problems in Engineering.

Downloads

Published

2023-01-05

Issue

Section

Research Articles

Most read articles by the same author(s)

<< < 1 2