Singular stochastic Leontieff type equation in current velocities of solutions

We investigate the system of stochastic differential equations, such that in the left-hand and right-hand sides there are rectangular constant matrices forming degenerate pencil. The system is considered in terms of current velocities of solution that are a direct analogue of physical velocity of deterministic processes. For investigation of this system we apply the Kronecker-Weierstrass transformation of the pencil of matrices coefficients to the canonical form that efficiently simplifies the investigation. As a result, the canonical system splits into independent sub-systems of four types. For the sub-systems corresponding to the Jordan singular Kronecker's cells, we obtain the explicit formulae of solutions and conditions for solvability. For the sub-system resolved with respect to symmetric derivatives, we apply the replacement of the metric in the subspace, then bring the system to a stochastic equation in the Ito form and prove the existence of its solution. As a result for the system under consideration we prove the existence of the solution theorem under some additional conditions on the coefficients.