Rings Whose Annihilating-Ideal Graphs Have Positive Genus

Abstract

Let R be a commutative ring and A(R) be the set of ideals with non-zero annihilators. The annihilating-ideal graph of R is defined as the graph AG(R) with the vertex set A(R)*=A\(0)\ and two distinct vertices I and J are adjacent if and only if IJ=(0). We investigate commutative rings R whose annihilating-ideal graphs have positive genus γ(AG(R)). It is shown that if R is an Artinian ring such that γ(AG(R))<∞, then R has finitely many ideals or (R,m) is a Gorenstein ring with maximal ideal m and v.dimR/mm/m2=2. Also, for any two integers g≥ 0 and q>0, there are finitely many isomorphism classes of Artinian rings R satisfying the conditions: (i) γ(AG(R)) < g and (ii) |R/m| ≤ q for every maximal ideal m of R. Also, it is shown that if R is a non-domain Noetherian local ring such that γ(AG(R))<∞, then either R is a Gorenstein ring or R is an Artinian ring with finitely many ideals.