An extension of z-ideals and z0-ideals

Abstract

Let R be a commutative ring, Y⊂eq Spec(R) and hY(S)=\P∈ Y:S⊂eq P \, for every S⊂eq R. An ideal I is said to be an HY-ideal whenever it follows from hY(a)⊂eq hY(b) and a∈ I that b∈ I. A strong HY-ideal is defined in the same way by replacing an arbitrary finite set F instead of the element a. In this paper these two classes of ideals (which are based on the spectrum of the ring R and are a generalization of the well-known concepts semiprime ideal, z-ideal, z-ideal (d-ideal), sz-ideal and sz-ideal (-ideal)) are studied. We show that the most important results about these concepts, "Zariski topology", "annihilator" and etc can be extended in such a way that the corresponding consequences seems to be trivial and useless. This comprehensive look helps to recognize the resemblances and differences of known concepts better.