Structure theory of p.p. rings and their generalizations

Abstract

In this paper, new and significant advances on the understanding the structure of p.p. rings and their generalizations have been made. Especially among them, it is proved that a commutative ring R is a generalized p.p. ring if and only if R is a generalized p.f. ring and its minimal spectrum is Zariski compact, or equivalently, R/N is a p.p. ring and Rm is a primary ring for all m∈Max(R). Some of the major results of the literature either are improved or are proven by new methods. In particular, we give a new and quite elementary proof to the fact that a commutative ring R is a p.p. ring if and only if R[x] is a p.p. ring.