Abstract
AbstractWe prove that the -module PreLie is a free Lie algebra in the category of -modules and can therefore be written as the composition of the -module Lie with a new -module X. This implies that free pre-Lie algebras in the category of vector spaces, when considered as Lie algebras, are free on generators that can be described using X. Furthermore, we define a natural filtration on the -module X. We also obtain a relationship between X and the -module coming from the anticyclic structure of the PreLie operad.
Publisher
Canadian Mathematical Society
Cited by
15 articles.
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