Adapted basic connections to a certain subfoliation on the tangent manifold of a Finsler space

On the slit tangent manifold TM^0 of a Finsler space (M, F) there are given some natural foliations as vertical foliation and some other fundamental foliations produced by the vertical and horizontal Liouville vector fields, see [A. Bejancu, H. R. Farran, Finsler Geometry and Natural Foliations on the Tangent Bundle, Rep. Math. Physics 58, No. 1 (2006), 131–146]. In this paper we consider a (n, 2n−1)-codimensional subfoliation (FV, FΓ) on T M 0 given by vertical foliation FV and the line foliation spanned by vertical Liouville vector field Γ and we give a triplet of basic connections adapted to this subfoliation.