The space of homogeneous preserving semistar operations on graded domains
Abstract
Let R=α∈Rα be a graded integral domain. In this paper we study the space of homogeneous preserving semistar operations on R. We show if is a homogeneous preserving semistar operation on R, then a is also homogeneous preserving. Let KR(R,b) be the homogeneous Kronecker function ring of R with respect to the b-operation. It is shown that the set of valuation overrings of KR(R,b), endowed with the Zariski topology, is homeomorphism to Zarh(R), the set of gr-valuation overrings of R, endowed with the Zariski topology. We also show that the set SStarf,hp(R) of finite type, homogeneous preserving semistar operations on R, endowed with the Zariski topology, is a spectral space.
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