@article {Kochloukova2005,
 author="Dessislava H. Kochloukova",
 title={Finite presentability of some metabelian Hopf algebras},
 journal="Bull. Austral. Math. Soc.",
 fjournal={Bulletin of the Australian Mathematical Society},
 volume="72",
 year="2005",
 number="1",
 pages="109--127",
 issn="0004-9727",
 coden="ALNBAB",
 language="English",
 date="21st March, 2005",
 classmath="16S40, 57T05",
 publisher={AMPAI, Australian Mathematical Society},
 MRnumber="MR2162297",
 ZBLnumber="02212189",
 url="http://www.austms.org.au/Publ/Bulletin/V72P1/721-5093-Kochloukova/index.shtml",
 acknowledgement={Partially supported by ``bolsa de produtividade de pesquisa" from CNPq, Brazil.},
 abstract={ We classify the Hopf algebras $U(L) \# kQ$ of homological type $FP_2$ where $L$ is a Lie algebra and $Q$ an Abelian group such that $L$ has an Abelian ideal $A$ invariant under the $Q$-action via conjugation and $U(L/A) \# kQ$ is commutative. This generalises the classification of finitely presented metabelian Lie algebras given by J. Groves and R. Bryant. }
}