Modules Satisfying the Prime Radical Condition and a Sheaf Construction for Modules I

Abstract

The purpose of this paper and its sequel, is to introduce a new class of modules over a commutative ring R, called P-radical modules (modules M satisfying the prime radical condition "([p]PM:M)=P" for every prime ideal P⊃eq Ann(M), where [p]PM is the intersection of all prime submodules of M containing PM). This class contains the family of primeful modules properly. This yields that over any ring all free modules and all finitely generated modules lie in the class of P-radical modules. Also, we show that if R is a domain (or a Noetherian ring), then all projective modules are P-radical. In particular, if R is an Artinian ring, then all R-modules are P-radical and the converse is also true when R is a Noetherian ring. Also an R-module M is called M-radical if ([p]MM:M)=M; for every maximal ideal M⊃eq Ann(M). We show that the two concepts P-radical and M-radical are equivalent for all R-modules if and only if R is a Hilbert ring. Semisimple P-radical (M-radical) modules are also characterized. In Part II we shall continue the study of this construction, and as an application, we show that the sheaf theory of spectrum of P-radical modules (with the Zariski topology) resembles to that of rings.