Zero divisor graph of \mathbb{Z}_{2^{r} q^{s}}

  • Juan M. Otero Acosta Departamento de Informática, Universidad Clodosbaldo Russián Cumaná, República Bolivariana de Venezuela. https://orcid.org/0009-0009-8245-9803
  • Daniel Brito Departamento de Matemática, Universidad de Oriente Cumaná, República Bolivariana de Venezuela.
  • Tobías de Jesús Rosas Soto Departamento de Matemática, Facultad Experimental de Ciencias, Universidad del Zulia, Maracaibo, Estado Zulia, República Bolivariana de Venezuela. https://orcid.org/0000-0002-8085-5011
Keywords: Rings, zero divisor set, zero dividers graph

Abstract

This article continues the study of zero divisor graphs, presented in 1988 by Istan Beck \cite{Beck}. There, a zero divisor graph is defined as a graph whose vertices are the elements of the set of zero divisors of a ring, where two distinct vertices $x$ and $y$ are adjacent if and only if $ x \cdot y = 0$. In this work, we present a new way to calculate the zero divisor graph of the ring $\mathbb{Z}_{2^{r}q^{s}}$ for $q$ an odd prime, with $r$ and $s$ positive integers greater than $2$, and the example of the zero divisor graph of the ring $\mathbb{Z}_{36}$ is also given.

References

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Published
2024-06-10
How to Cite
Otero Acosta, J. M., Brito, D., & Rosas Soto, T. de J. (2024). Zero divisor graph of \mathbb{Z}_{2^{r} q^{s}}. Divulgaciones Matemáticas, 54-63. Retrieved from https://mail.produccioncientificaluz.org/index.php/divulgaciones/article/view/42238
Section
Research papers