SOME ASPECTS OF τ-FULL MODULES

Jaime Castro P´erez; Marcela Gonz´alez Pel´aez; Jos´e R´ıos Montes

Jaime Castro P´erez
Marcela Gonz´alez Pel´aez
Jos´e R´ıos Montes

Keywords: hereditary torsion theory, τ-full R-module, atomic characteristics

Abstract

Let τ be a hereditary torsion theory on Mod-R. For a right τ-full R-module M, we establish that [τ,τ ∨ξ (M)] is a boolean lattice; we ﬁnd necessary and suﬃcient conditions for the interval [τ,τ ∨ξ (M)] be atomic, and we give conditions for the atoms be of some speciﬁc type in terms of the internal structure of M. We also prove that there are lattice isomorphisms between the lattice [τ,τ ∨ξ (M)] and the lattice of τ-pure fully invariant submodules of M, under the additional assumption that M is absolutely τ-pure. With the aid of these results, we get a decomposition of a τ-full and absolutely τ-pure R-module M as a direct sum of τ-pure fully invariant submodules N and N with diﬀerent atomic characteristics on the intervals [τ,τ ∨ξ (N)] and [τ,τ ∨ξ (N)], respectively.