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 Wrap groups of quaternion and octonion fiber bundles
2009jau | S.V. Ludkovsky // MIREA, sludkowski@mail.ru
This article is devoted to the investigation of wrap groups of connected fiber bundles over the fields
of real R, complex C numbers, the quaternion skew field H and the octonion algebra O.
These groups are constructed with mild conditions on fibers. Their examples are given.
It is shown, that these groups exist and for differentiable fibers have the infinite dimensional Lie groups structure, that is, they are continuous or differentiable manifolds and the composition $(f,g)\mapsto f^{-1}g$
is continuous or differentiable depending on a class of smoothness of groups. Moreover, it is demonstrated
that in the cases of real, complex, quaternion and octonion manifolds these groups have structures
of real, complex, quaternion or octonion manifolds respectively. Nevertheless, it is proved that these groups does not necessarily satisfy the Campbell-Hausdorff formula even locally.
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