Cocommutative vertex bialgebras
Abstract
In this paper, the structure of cocommutative vertex bialgebras is investigated. For a general vertex bialgebra , it is proved that the set of group-like elements is naturally an abelian semigroup, whereas the set of primitive elements is a vertex Lie algebra. For , denote by the connected component containing . Among the main results, it is proved that if is a cocommutative vertex bialgebra, then , where is a vertex subbialgebra which is isomorphic to the vertex bialgebra associated to the vertex Lie algebra , and is a -module for . In particular, this shows that every cocommutative connected vertex bialgebra is isomorphic to and hence establishes the equivalence between the category of cocommutative connected vertex bialgebras and the category of vertex Lie algebras. Furthermore, under the condition that is a group and lies in the center of , it is proved that as a coalgebra where the vertex algebra structure is explicitly determined.
Cite
@article{arxiv.2107.07290,
title = {Cocommutative vertex bialgebras},
author = {Jianzhi Han and Haisheng Li and Yukun Xiao},
journal= {arXiv preprint arXiv:2107.07290},
year = {2021}
}
Comments
36 pages