Uppers to zero and semistar operations in polynomial rings

Abstract

Given a stable semistar operation of finite type on an integral domain D, we show that it is possible to define in a canonical way a stable semistar operation of finite type [] on the polynomial ring D[X], such that D is a -quasi-Pr\"ufer domain if and only if each upper to zero in D[X] is a quasi-[]-maximal ideal. This result completes the investigation initiated by Houston-Malik-Mott [Section 2]hmm in the star operation setting. Moreover, we show that D is a Pr\"ufer -multiplication (resp., a -Noetherian; a -Dedekind) domain if and only if D[X] is a Pr\"ufer []-multiplication (resp., a []-Noetherian; a []-Dedekind) domain. As an application of the techniques introduced here, we obtain a new interpretation of the Gabriel-Popescu localizing systems of finite type on an integral domain D (Problem 45 of cg), in terms of multiplicatively closed sets of the polynomial ring D[X].