Ricci and Bianchi identities for \(h\)-normal \(\Gamma\)-linear connections on \(J^{1}(T,M)\) (Q1811979)

Summary: The aim of this paper is to describe the local Ricci and Bianchi identities of an \(h\)-normal \(\Gamma\)-linear connection on the first-order jet fibre bundle \(J^{1}(T,M)\). We present the physical and geometrical motives that determined our study and introduce the \(h\)-normal \(\Gamma\)-linear connections on \(J^{1}(T,M)\), emphasizing their particular local features. We describe the expressions of the local components of torsion and curvature \(d\)-tensors produced by an \(h\)-normal \(\Gamma\)-linear connection \(\nabla\Gamma\), and analyze the local Ricci identities induced by \(\nabla\Gamma\), together with their derived local deflection \(d\)-tensors identities. Finally, we expose the local expressions of Bianchi identities which geometrically connect the local torsion and curvature \(d\)-tensors of connection \(\nabla\Gamma\).