On -Semi Homogeneous Domains

Abstract

Let be a finite character star operation defined on an integral domain D. Call a nonzero -ideal I of finite type a -homogeneous ( -homog) ideal, if I⊂neq D and (J+K) ≠ D for every pair D⊃neq J,K⊃eq I of proper -ideals of finite type. Call an integral domain D a -Semi Homogeneous Domain ( -SHD) if every proper principal ideal xD of D is expressible as a -product of finitely many -homog ideals. We show that a -SHD contains a family F of prime ideals such that (a) D=P∈ FDP, a locally finite intersection and (b) no two members of F contain a common non zero prime ideal. The -SHDs include h-local domains, independent rings of Krull type, Krull domains, UFDs etc. We show also that we can modify the definition of the -homog ideals to get a theory of each special case of a -SH domain.