The coloring of the regular graph of ideals

Abstract

The regular graph of ideals of the commutative ring R, denoted by reg(R), is a graph whose vertex set is the set of all non-trivial ideals of R and two distinct vertices I and J are adjacent if and only if either I contains a J-regular element or J contains an I-regular element. In this paper, it is shown that for every Artinian ring R, the edge chromatic number of reg(R) equals its maximum degree. Then a formula for the clique number of reg(R) is given. Also, it is proved that for every reduced ring R with n(≥3) minimal prime ideals, the edge chromatic number of reg(R) is 2n-1-2. Moreover, we show that both of the clique number and vertex chromatic number of reg(R) are n-1, for every reduced ring R with n minimal prime ideals.