In this paper we present the horizontal lift of a symmetric affine connection with respect to another affine connection to the bundle of volume forms \(\mathcal{V}\) and give formulas for its curvature tensor, Ricci tensor and the scalar curvature. Next, we give some properties of the horizontally lifted vector fields and certain infinitesimal transformations. At the end, we consider some substructures of a \(F(3, 1)\)-structure on \(\mathcal{V}\).

Horizontal lift; \(\pi\)-conjugate connection; Killing field; infinitesimal transformation; \(F(3, 1)\)-structure; FK, FAK, FNK, FQK, FH-structure

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