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The intersection graph of ideals of $\mathbb{Z}_n$ is\\ weakly perfect

A graph is called weakly perfect if its vertex chromatic number equals its clique number. Let $R$ be a ring and $I(R)^*$ be the set of all left proper non-trivial ideals of $R$. The intersection graph of ideals of $R$, denoted by $G(R)$, is a graph with the vertex set $I(R)^*$ and two distinct vertices $I$ and $J$ are adjacent if and only if $I\cap J\neq 0$. In this paper, it is shown that $G(\mathbb{Z}_n)$, for every positive integer $n$, is a weakly perfect graph. Also, for some values of $n$, we give an explicit formula for the vertex chromatic number of $G(\mathbb{Z}_n)$. Furthermore, it is proved that the edge chromatic number of $G(\mathbb{Z}_n)$ is equal to the maximum degree of $G(\mathbb{Z}_n)$ unless either $G(\mathbb{Z}_n)$ is a null graph with two vertices or a complete graph of odd order.