The full text of this article is unavailable through your IP address: 172.17.0.1
Contents Online
Pure and Applied Mathematics Quarterly
Volume 18 (2022)
Number 3
Classification of the nilradical of $k$-th Yau algebras arising from singularities
Pages: 835 – 862
DOI: https://dx.doi.org/10.4310/PAMQ.2022.v18.n3.a2
Authors
Abstract
Every Lie algebra is a semi-direct product of semisimple Lie algebra and a solvable Lie algebra. Brieskorn gave the connection between simple Lie algebras and simple singularities. Simple Lie algebras have been well understood, but not the solvable (nilpotent) Lie algebras. Classification of nilpotent Lie algebras with dimension up to $7$ is known, but not for dimension greater than $7$. Therefore it is important to establish connections between theory of singularities and theory of nilpotent Lie algebras. Let $(V, 0)$ be an isolated hypersurface singularity defined by the holomorphic function $f : (\mathbb{C}^n, 0) \to (\mathbb{C}, 0)$. The $k$‑th Yau algebras $L^k (V), k \geq 0$ were introduced by the authors. It was defined to be the Lie algebra of derivations of the $k$‑th moduli algebra $A^k (V)$. These Lie algebras are solvable in general and play an important role in the study of singularities. In this paper, we investigate the new connection between the nilpotent Lie algebras of dimension less than or equal to $7$ and the nilradical of $k$‑th Yau algebras.
Keywords
derivation, nilpotent Lie algebra, isolated singularity, $k$-th Yau algebras
2010 Mathematics Subject Classification
Primary 14B05. Secondary 17B66, 32S05.
Both Yau and Zuo are supported by NSFC Grant 11961141005. Zuo is supported by Tsinghua University Initiative Scientific Research Program and NSFC Grant 11771231. Yau is supported by Tsinghua University start-up fund and Tsinghua University Education Foundation fund (042202008).
Received 4 November 2021
Received revised 27 December 2021
Accepted 30 December 2021
Published 24 July 2022