Lagrangians and Euler morphisms on fibered-fibered frame bundles from projectable-projectable classical linear connections (Q2890370)

In general, an \(r\)th order Lagrangian on a fibered manifold \(X\to M\) is a base preserving morphism \(\lambda: J^r(X)\to \Lambda^mT^*M\), \(m=\text{dim}(M)\). The author generalizes some results of \textit{J. Kurek} and \textit{W. M. Mikulski} [in: C. Herdeiro (ed.) et al., XIX international fall workshop on geometry and physics, Porto, Portugal, September 6--9, 2010. Melville, NY: American Institute of Physics (AIP). AIP Conference Proceedings 1360, 139--144 (2011; Zbl 1291.53034)] to the case of fibered-fibered manifolds. First, she introduces the fibered-fibered linear frame bundle \(L^{\text{fib}-\text{fib}}(Y)\), where \(Y\) is a fibered-fibered manifold. As a main result she describes natural operators transforming projectable-projectable torsion free classical linear connections \(\nabla\) on \(Y\) into \(r\)th order Lagrangians on \(L^{\text{fib}-\text{fib}}(Y)\to Y\).