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The Lie algebra of rooted planar trees

We study a natural Lie algebra structure on the free vector space generated by all rooted planar trees as the associated Lie algebra of the nonsymmetric operad (non-$Σ$ operad, preoperad) of rooted planar trees. We determine whether the Lie algebra and some related Lie algebras are finitely generated or not, and prove that a natural surjection called the augmentation homomorphism onto the Lie algebra of polynomial vector fields on the line has no splitting preserving the units.

preprint2011arXivOpen access

Tomohiko Ishida Nariya Kawazumi

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Tomohiko Ishida Nariya Kawazumi

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The Lie algebra of rooted planar trees

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