Lattice decomposition of modules
Abstract
The first aim of this work is to characterize when the lattice of all submodules of a module is a direct product of two lattices. In particular, which decompositions of a module produce these decompositions: the \emph{lattice decompositions}. In a first \textit{\'etage} this can be done using endomorphisms of , which produce a decomposition of the ring as a product of rings, i.e., they are central idempotent endomorphisms. But since not every central idempotent endomorphism produces a lattice decomposition, the classical theory is not of application. In a second step we characterize when a particular module has a lattice decomposition; this can be done, in the commutative case in a simple way using the support, , of ; but, in general, it is not so easy. Once we know when a module decomposes, we look for characterizing its decompositions. We show that a good framework for this study, and its generalizations, could be provided by the category , the smallest Grothendieck subcategory of containing .
Keywords
Cite
@article{arxiv.2102.01179,
title = {Lattice decomposition of modules},
author = {Josefa M. García and Pascual Jara and Luis M. Merino},
journal= {arXiv preprint arXiv:2102.01179},
year = {2021}
}
Comments
18 pages