L-regular linear connections
Abstract
The aim of this paper is to generalize the theory of nonlinear connections of Grifone ([3] and [4]). We adopt the point of view of Anona [1] and continue developing the approach established by the first author in [10]. The first part of the work is devoted to the problem of associating to each L-regular linear connection on M a nonlinear L-connection on M. The route we have followed is significantly different from that of Grifone. We introduce an almost-complex and an almost-product structures on M by means of a given L-regular linear connection on M. The product of these two structures defines a nonlinear L-connection on M, which generalizes Grifone's nonlinear connection. The seconed part is devoted to the converse problem: associating to each nonlinear L-connection on M an L-regular linear connection on M; called the L-lift of . The existence of this lift is established and the fundamental tensors associated with it are studied. In the third part, we investigate the L-lift of a homogeneous L-connection , called the Berwald L-lift of . Then we particularize our study to the L-lift of a conservative L-connection. This L-lift enjoys some interesting properties. We finally deduce various identities concerning the curvature tensors of such a lift. Grifone's theory can be retrieved by letting M be the tangent bundle of a differentiable manifold and L be the natural almost-tangent structure J on M.
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