Hopf and Lie algebras in semi-additive varieties
Date
2017
Authors
Journal Title
Journal ISSN
Volume Title
Publisher
Logical Methods in Computer Science
Abstract
We study Hopf monoids in entropic semi-additive varieties with an emphasis on adjunctions related to the enveloping monoid functor and the primitive element functor. These investigations are based on the concept of the abelian core of a semi-additive variety variety and its monoidal structure in case the variety is entropic.
Description
CITATION: Porst, H. E. 2017. Hopf and Lie algebras in semi-additive Varieties. Logical Methods in Computer Science, 13(2):1-13, doi:10.23638/LMCS-13(2:3)2017.
The original publication is available at https://lmcs.episciences.org/3315
The original publication is available at https://lmcs.episciences.org/3315
Keywords
Lie algebra, Factors (Algebra), Hopf algebra, Varieties (Universal algebra)
Citation
Porst, H. E. 2017. Hopf and Lie algebras in semi-additive Varieties. Logical Methods in Computer Science, 13(2):1-13, doi:10.23638/LMCS-13(2:3)2017