The Generating Condition for Coalgebras
Abstract
For a ring , the properties of being (left) selfinjective or being cogenerator for the left -modules do not imply one another, and the two combined give rise to the important notion of PF-rings. For a coalgebra , (left) self-projectivity implies that is generator for right comodules and the coalgebras with this property were called right quasi-co-Frobenius; however, whether the converse implication is true is an open question. We provide an extensive study of this problem. We show that this implication does not hold, by giving a large class of examples of coalgebras having the "generating property". In fact, we show that any coalgebra can be embedded in a coalgebra that generates its right comodules, and if is local over an algebraically closed field, then can be chosen local as well. We also give some general conditions under which the implication "-projective (left) generator for right comodules" does work, and such conditions are when is right semiperfect or when has finite coradical filtration.
Cite
@article{arxiv.1110.1537,
title = {The Generating Condition for Coalgebras},
author = {Miodrag C Iovanov},
journal= {arXiv preprint arXiv:1110.1537},
year = {2014}
}
Comments
16p, published 2009: London Mathematical Society