On inner tensor structures in Cartan spaces (Q1592028)

If \(H(x^i,y_i)\) is the metric Hamilton function, \(g^{ij}={1\over 2}\partial^i\partial^j\) the metric tensor, \(C^{ijk}={1\over 2}\partial^kg^{ij}\) the Cartan tensor, \(L_{ij}\) the nonlinear connection then \((L_{ij}, \Gamma^k_{i j} =\partial^kL_{ij},0)\) is the affine connection. The components of the lifted metric affine connection are determined. The almost complex structure \(J^A_B\) \((J^A_CJ^C_B= -\delta^A_B,A,B,C=1,\dots,2n)\) is constructed as a function of \(g\) and \(L\) and some parameters. With respect to the metric affine connection the integrability conditions for \(J\) are established. The components of the Hermite metric tensor \(H_{AB}\) \((J^C_AH_{CB}+ J^C_BH_{AC}=0)\) are determined. It is proved that in the Cartan space there exists a Kähler metric \((\nabla J=0)\). In the Cartan space the \(AQ\) structure is given by tensor fields \(F,H,J\) for which the relations \[ HF=-FH=J,\;JF=-FJ=H,\;HJ=-JH=F, \quad F^2=H^2=E,\;J^2=-E \] are valid. The explicit forms for these tensors as function of \(g,L\) and some parameters are determined. The relations between these parameters and the integrability condition are established.