Uppers to Zero in Polynomial Rings and Prüfer-Like Domains

Let D be an integral domain and X an indeterminate over D. It is well known that (a) D is quasi-Prufer (i.e., its integral closure is a Prufer domain) if and only if each upper to zero Q in D[X] contains a polynomial g ∈ D[X] with content c D (g) = D; (b) an upper to zero Q in D[X] is a maximal t-ideal if and only if Q contains a nonzero polynomial g ∈ D[X] with c D (g) v = D. Using these facts, the notions of UMt-domain (i.e., an integral domain such that each upper to zero is a maximal t-ideal) and quasi-Prufer domain can be naturally extended to the semistar operation setting and studied in a unified frame. In this article, given a semistar operation ☆ in the sense of Okabe–Matsuda, we introduce the ☆-quasi-Prufer domains. We give several characterizations of these domains and we investigate their relations with the UMt-domains and the Prufer v-multiplication domains.