Semiperfect and coreflexive coalgebras
Abstract
We study non-counital coalgebras and their dual non-unital algebras, and introduce the finite dual of a non-unital algebra. We show that a theory that parallels in good part the duality in the unital case can be constructed. Using this, we introduce a new notion of left coreflexivity for counital coalgebras, namely, a coalgebra is left coreflexive if is isomorphic canonically to the finite dual of its left rational dual . We show that right semiperfectness for coalgebras is in fact essentially equivalent to this left reflexivity condition, and we give the connection to usual coreflexivity. As application, we give a generalization of some recent results connecting dual objects such as quiver or incidence algebras and coalgebras, and show that Hopf algebras with non-zero integrals (compact quantum groups) are coreflexive.
Cite
@article{arxiv.1512.09344,
title = {Semiperfect and coreflexive coalgebras},
author = {Sorin Dascalescu and Miodrag C. Iovanov},
journal= {arXiv preprint arXiv:1512.09344},
year = {2016}
}
Comments
14pp; published version 22pp