Extension of Maschke's theorem
Abstract
In the present article, we examine linear representations of finite gyrogroups, following their group-counterparts. In particular, we prove the celebrated theorem of Maschke for gyrogroups, along with its converse. This suggests studying the left regular action of a gyrogroup (G, ) on the function space Lgyr(G) = \f∈ L(G) ∀ a, x, y, z∈ G, f(a[x, y]z) = f(a z)\ in a natural way, where L(G) is the space of all functions from G into a field.
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