KOÇ, SUATTEKİR, ÜNSAL2022-03-122022-03-1220210092-7872https://hdl.handle.net/11424/236235Let R be a commutative ring with nonzero identity and, S subset of R be a multiplicatively closed subset. An ideal P of R with P boolean AND S = theta is called an S-prime ideal if there exists an (fixed) s is an element of S and whenver ab is an element of P for a, b is an element of R then either sa is an element of P or sb is an element of P. In this article, we construct a topology on the set Spec(S)(R) of all S-prime ideals of R which is generalization of prime spectrum of R. Also, we investigate the relations between algebraic properties of R and topological properties of Spec(S)(R) like compactness, connectedness and irreducibility.enginfo:eu-repo/semantics/closedAccessPrime spectrumS-Zariski topologyZariski topologyPRIME SPECTRUM2ND SPECTRUMMODULEGRAPHarticleWOS:00057767360000110.1080/00927872.2020.18310061532-4125