Weyl substructures and compatible linear connections

Abstract

The aim of this paper is to study from the point of view of linear connections the data (M,D,g,W), with M a smooth (n+p) dimensional real manifold, (D,g) a ndimensional semi-Riemannian distributionon M, G the conformal structure generated by g and W a Weyl substructure: a map W: G 1(M) such that W(g)=W(g)-du, g=eug;u∈ C∞(M). Compatible linear connections are introduced as a natural extension of similar notions from Riemannian geometry and such a connection is unique if a symmetry condition is imposed. In the foliated case the local expression of this unique connection is obtained. The notion of Vranceanu connection is introduced for a pair (Weyl structure, distribution) and it is computed for the tangent bundle of Finsler spaces, particularly Riemannian, choosing as distribution the vertical bundle of tangent bundle projection and as 1-form the Cartan form.