The integration of Poisson's equations in the case of three linear invariant relations

The problem of integrating Kirchhoff's differential equations [1] when they allow of a linear invariant relation with respect to the main variables -the components of the angular momentum of a gyrostat and the unit vector of the axis of symmetry of the force field, is considered. The initial system

Invariant integrals of the linear isotropic theory of elasticity, determined by a certain specified elastic field, are considered, and also invariant integrals generated by the interaction of the specified field with an arbitrary secondary field. For all types of invariant integral, generated by the

The existence of invariant relations is investigated for the generalized Euler-Poisson equations of the dynamics of a rigid body with a fixed point, for which integrals of energy, angular momentum and the geometric integral exist. Different formulations are considered, when the potentials of the app