Reduced rank in σ[M]

Abstract

Using the concept of prime submodule introduced by Raggi et.al. we extend the notion of reduced rank to the module-theoretic context of σ[M]. We study the quotient category of σ[M] modulo the hereditary torsion theory cogenerated by the M-injective hull of M, when M is a semiprime Goldie module. We prove that this quotient category is spectral. We then consider the hereditary torsion theory in σ[M] cogenerated by the M-injective hull of M/L(M), where L(M) is the prime radical of M, and we determine when the module of quotients of M, with respect to this torsion theory, has finite length in the quotient category. Finally, we give conditions on a module M with endomorphism ring S under which S is an order in an Artinian ring, extending Small's Theorem.