On graphs related to co-maximal ideals of a commutative ring

Abstract

This paper studies the co-maximal graph (R), the induced subgraph (R) of (R) whose vertex set is R (U(R) J(R)) and a retract r(R) of (R), where R is a commutative ring. We show that the core of (R) is a union of triangles and rectangles, while a vertex in (R) is either an end vertex or a vertex in the core. For a non-local ring R, we prove that both the chromatic number and clique number of (R) are identical with the number of maximal ideals of R. A graph r(R) is also introduced on the vertex set \Rx|\,x∈ R (U(R) J(R))\, and graph properties of r(R) are studied.