On generalized probability in finite commutative rings

Year 2023, , 125 - 132, 09.01.2023

Shafiq Ur Rehman Muhammad Naveed Shaheryar

https://doi.org/10.24330/ieja.1156662

Abstract

Let $R$ be a finite commutative ring with unity and $x\in R$. We study the probability that the product of two randomly chosen elements (with replacement) of $R$ equals $x$. We denote this probability by $Prob_x (R)$. We determine some bounds for this probability and also obtain some characterizations of finite commutative rings based on this probability. Moreover, we determine the explicit computing formulas for $Prob_x (R)$ when $R=\mathbb{Z}_m\times \mathbb{Z}_n$.

Keywords

Probability, finite commutative ring, Euler-phi function, simple graph, zero-divisor graph, complete graph, local ring

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