Abstract
In this paper we use the sprays theory in Time Dependent Lagrange Geometry, in order to give a method by which is obtained a sequence of semisprays and two sequences of nonlinear connections, starting from a given one, following the ideas of paper [6] . Interesting particular case appear for rheonomic Lagrange and Finsler spaces, taking into account the existence of semisprays and nonlinear connections which depend only on the fundamental function of the space.
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