gcd-Pairs in $\mathbb{Z}_{n}$ and their graph representations

Abstract: This research introduces a gcd-pair in $\mathbb{Z}n$ which is an unordered pair ${[a]_n, [b]_n}$ of elements in $ \mathbb{Z}_n $ such that $0\leq a,b < n$ and the greatest common divisor $\gcd(a,b)$ divides $ n $. The properties of gcd-pairs in $ \mathbb{Z}_n $ and their graph representations are investigated. We also provide the counting formula of gcd-pairs in $ \mathbb{Z}_n $ and its subsets. The algorithms to find, count and check gcd-pairs in $ \mathbb{Z}{n}$ are included.