论文标题
在托拉斯poset上和接触谎言代数
On toral posets and contact Lie algebras
论文作者
论文摘要
A $(2k+1)-$dimensional Lie algebra is called contact if it admits a one-form $φ$ such that $φ\wedge(dφ)^k\neq 0.$ Here, we extend recent work to describe a combinatorial procedure for generating contact, type-A Lie poset algebras whose associated posets have chains of arbitrary cardinality, and we conjecture that our construction leads to a complete characterization.
A $(2k+1)-$dimensional Lie algebra is called contact if it admits a one-form $φ$ such that $φ\wedge(dφ)^k\neq 0.$ Here, we extend recent work to describe a combinatorial procedure for generating contact, type-A Lie poset algebras whose associated posets have chains of arbitrary cardinality, and we conjecture that our construction leads to a complete characterization.
