On Varieties of Lie Algebras of Maximal Class
Canadian journal of mathematics, Tome 67 (2015) no. 1, pp. 55-89
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We study complex projective varieties that parametrize (finite-dimensional) filiform Lie algebras over $\mathbb{C}$ using equations derived by Millionshchikov. In the infinite-dimensional case we concentrate our attention on $\mathbb{N}$ -graded Lie algebras of maximal class. As shown by $\text{A}$ . Fialowski there are only three isomorphism types of $\mathbb{N}$ -graded Lie algebras $L\,=\,\oplus _{i=1}^{\infty }\,{{L}_{i}}$ of maximal class generated by ${{L}_{i}}$ and ${{L}_{2}}$ , $L\,=\,\left\langle {{L}_{1}},\,{{L}_{2}} \right\rangle$ . Vergne described the structure of these algebras with the property $L\,=\,\left\langle {{L}_{1}} \right\rangle$ . In this paper we study those generated by the first and $q$ -th components where $q\,>\,2$ , $L\,=\,\left\langle {{L}_{1}},\,{{L}_{q}} \right\rangle$ . Under some technical condition, there can only be one isomorphism type of such algebras. For $q=\,3$ we fully classify them. This gives a partial answer to a question posed by Millionshchikov.
Mots-clés :
17B70, 14F45, filiform Lie algebras, graded Lie algebras, projective varieties, topology, classification
Barron, Tatyana; Kerner, Dmitry; Tvalavadze, Marina. On Varieties of Lie Algebras of Maximal Class. Canadian journal of mathematics, Tome 67 (2015) no. 1, pp. 55-89. doi: 10.4153/CJM-2014-008-x
@article{10_4153_CJM_2014_008_x,
author = {Barron, Tatyana and Kerner, Dmitry and Tvalavadze, Marina},
title = {On {Varieties} of {Lie} {Algebras} of {Maximal} {Class}},
journal = {Canadian journal of mathematics},
pages = {55--89},
year = {2015},
volume = {67},
number = {1},
doi = {10.4153/CJM-2014-008-x},
url = {http://geodesic.mathdoc.fr/articles/10.4153/CJM-2014-008-x/}
}
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