A class of Lie racks associated to symmetric Leibniz algebras
Abstract
Given a symmetric Leibniz algebra (L,.), the product is Lie-admissible and defines a Lie algebra bracket [\;,\;] on L. Let G be the connected and simply-connected Lie group associated to (L,[\;,\;]). We endow G with a Lie rack structure such that the right Leibniz algebra induced on TeG is exactly (L,.). The obtained Lie rack is said to be associated to the symmetric Leibniz algebra (L,.). We classify symmetric Leibniz algebras in dimension 3 and 4 and we determine all the associated Lie racks. Some of such Lie racks give rise to non-trivial topological quandles. We study some algebraic properties of these quandles and we give a necessary and sufficient condition for them to be quasi-trivial.
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