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Tangent prolongation of $\mathcal{C}^r$-differentiable loops

Published 8 Feb 2020 in math.GR | (2002.03133v2)

Abstract: The aim of our paper is to generalize the tangent prolongation of Lie groups to non-associative multiplications and to examine how the weak associative and weak inverse properties are transferred to the multiplication defined on the tangent bundle. We obtain that the tangent prolongation of a $\mathcal{C}r$-differentiable loop ($r\geq 1$) is a $\mathcal{C}{r-1}$-differentiable loop that acquires the classical weak inverse and weak associative properties of the initial loop.

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