Abstract
In this paper, we study infinitesimal transformations of the tangent bundle of a common path space. The general path space is a generalization space of the affine connectivity. By affine connectivity of the common path space, we construct an affine connection on the tangent bundle. For the infinitesimal transformation of the tangent bundle, a system of invariance equations for the constructed affine connectivity is compiled. This system is a system of second-order differential equations with respect to the components of the infinitesimal transformation. The main results of the article are obtained by analyzing this system taking into account the properties of homogeneous functions. It is shown that the complete lift of an infinitesimal transformation of base is an infinitesimal affine motion of a tangent bundle if and only if the infinitesimal transformation of base is an affine motion in the general path space. Necessary and sufficient conditions are found that the infinitesimal transformation of a tangent bundle generated by a vertical vector field leaves the affine connectivity of the tangent bundle invariant. Conditions are given that are necessary and sufficient so that the infinitesimal transformation of a tangent bundle with affine connectivity that preserves layers is an affine motion.
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