Intersections of essential minimal prime ideals

Abstract

Let Z(R) be the set of zero divisor elements of a commutative ring R with identity and M be the space of minimal prime ideals of R with Zariski topology. An ideal I of R is called strongly dense ideal or briefly sd-ideal if I⊂eq Z(R) and is contained in no minimal prime ideal. We denote by RK(M), the set of all a∈ R for which D(a)=M V(a) is compact. We show that R has property (A) and M is compact R has no sd-ideal. It is proved that RK(M) is an essential ideal (resp., sd-ideal) M is an almost locally compact (resp., M is a locally compact non-compact) space. The intersection of essential minimal prime ideals of a reduced ring R need not be an essential ideal. We find an equivalent condition for which any (resp., any countable) intersection of essential minimal prime ideals of a reduced ring R is an essential ideal. Also it is proved that the intersection of essential minimal prime ideals of C(X) is equal to the socle of C(X) (i.e., CF(X)=Oβ X I(X)). Finally, we show that a topological space X is pseudo-discrete I(X)=XL and CK(X) is a pure ideal.