On a Projective Space Invariant of a Co-torsion Module of Rank Two over a Dedekind Domain

Abstract

For a Dedekind domain O and a rank two co-torsion module M⊂eq O2 with invariant factor ideals L⊃eq K in O, that is, O2M OL OK we associate a new projective space invariant element in PF1I where I is given by the ideal factorization K = LI in O. This invariant element along with the invariant factor ideals determine the module M completely as a subset of O2. As a consequence, projective spaces associated to ideals in O can be used to enumerate such modules. We compute the zeta function associated to such modules in terms of the zeta function of the one dimensional projective spaces for the ring OK of integers in a number field K/Q and relate them to Dedekind zeta function. Using the projective spaces as parameter spaces, we re-interpret the Chinese remainder reduction isomorphism PF1I → i=1lΠ PF1Ii associated to a factorization of an ideal I=i=1lΠ Ii into mutually co-maximal ideals Ii,1≤ i≤ l in terms of the intersection of associated modules arising from the projective space elements.