Some structural considerations on the theory of gravitational field in Finsler spaces (Q1815037)

In this short paper some suggestions for generalized adapted bases in different spaces are given. For the gauge transformation, the proposed adapted basis of the dual tangent space is \(\{dx^\alpha,\delta y^i=dy^i+K^i_{j\alpha} y^jdx^\alpha+ K^i_{jk}y^jdy^k\}\), for the Finsler structure the adapted basis has the form \(\{dx^\alpha,\overline\delta y^i= P^i_kdy^k+Q^i_\alpha dx^\alpha\}\). In the higher-order spaces \(\text{Osc}^kM\), using the notation of A. Kawaguchi, the adapted basis in the dual tangent space is \(\{dx^\alpha,\widetilde\delta y^{(\alpha)i}\}\), where \(\widetilde\delta y^{(\alpha)i}\) is some linear combination of \(dx^\alpha\) and \(dy^{(\beta)k}\). In time-dependent Lagrange geometry the adapted basis is \(\{dx^\alpha,\delta y^i,\delta\lambda=d\lambda+ M^0_\alpha dx^\alpha+ L^0_idy^i\}\). In all cases, the coefficients of the \(d\)-connection are mentioned and the metric tensor has diagonal form with respect to the proposed bases. The transformations of the coefficients in the basis vectors are not given.