On v--domains and star operations

Abstract

Let be a star operation on an integral domain D. Let (D) be the set of all nonzero finitely generated fractional ideals of D. Call D a --Pr\"ufer (respectively, (, v)--Pr\"ufer) domain if (FF-1)=D (respectively, (FvF-1)=D) for all F∈ (D). We establish that --Pr\"ufer domains (and (, v)--Pr\"ufer domains) for various star operations span a major portion of the known generalizations of Pr\"ufer domains inside the class of v--domains. We also use Theorem 6.6 of the Larsen and McCarthy book [Multiplicative Theory of Ideals, Academic Press, New York--London, 1971], which gives several equivalent conditions for an integral domain to be a Pr\"ufer domain, as a model, and we show which statements of that theorem on Pr\"ufer domains can be generalized in a natural way and proved for --Pr\"ufer domains, and which cannot be. We also show that in a --Pr\"ufer domain, each pair of -invertible -ideals admits a GCD in the set of -invertible -ideals, obtaining a remarkable generalization of a property holding for the "classical" class of Pr\"ufer v--multiplication domains. We also link D being --Pr\"ufer (or (, v)--Pr\"ufer) with the group Inv(D) of -invertible -ideals (under -multiplication) being lattice-ordered.