Closure properties of C
Abstract
Let C be a class of modules and L = C the class of all direct limits of modules from C. The class L is well understood when C consists of finitely presented modules: L then enjoys various closure properties. We study the closure properties of L in the general case when C ⊂eq Mod-R is arbitrary. Then we concentrate on two important particular cases, when C = add M and C = Add M, for an arbitrary module M. In the first case, we prove that add M = \ N ∈ Mod- R ∃ F ∈ FS: N F S M \ where S = End M, and FS is the class of all flat right S-modules. In the second case, Add M = \ F S M F ∈ F S \ where S is the endomorphism ring of M endowed with the finite topology, F S is the class of all right S-contramodules that are direct limits of direct systems of projective right S-contramodules, and S denotes the contratensor product. For various classes of modules D, we show that if M ∈ D then add M = Add M (e.g., when D consists of pure projective modules), but the equality for an arbitrary module M remains open. Finally, we deal with the question of whether Add M = Add M where Add M is the class of all pure epimorphic images of direct sums of copies of a module M. We show that the answer is positive in several particular cases, but it is negative in general.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.