Characterizations of graded Pr\"ufer -multiplication domains

Abstract

Let R=α∈Rα be a graded integral domain graded by an arbitrary grading torsionless monoid , and be a semistar operation on R. In this paper we define and study the graded integral domain analogue of -Nagata and Kronecker function rings of R with respect to . We say that R is a graded Pr\"ufer -multiplication domain if each nonzero finitely generated homogeneous ideal of R is f-invertible. Using -Nagata and Kronecker function rings, we give several different equivalent conditions for R to be a graded Pr\"ufer -multiplication domain. In particular we give new characterizations for a graded integral domain, to be a PvMD.