Generalized injectivity and approximations
Abstract
Injective, pure-injective and fp-injective modules are well known to provide for approximations in the category Mod-R for an arbitrary ring R. We prove that this fails for many other generalizations of injectivity: the , , , quasi-continuous, continuous, and quasi-injective modules. We show that, except for the class of all -modules, each of the latter classes provides for approximations only when it coincides with the injectives (for quasi-injective modules, this forces R to be a right noetherian V-ring, in the other cases, R even has to be semisimple artinian). The class of all -modules over a right noetherian ring R is (pre)enveloping, iff R is a certain right artinian ring of Loewy length at most 2; in this case, however, R may have an arbitrary representation type.
Cite
@article{arxiv.1601.01101,
title = {Generalized injectivity and approximations},
author = {Serap Sahinkaya and Jan Trlifaj},
journal= {arXiv preprint arXiv:1601.01101},
year = {2019}
}