Analysis of a Multipoint Boundary Value Problem for a Nonlinear Matrix Differential Equation

For a nonlinear differential matrix equation, we study a multipoint boundary value
problem by a constructive method of regularization over the linear part of the equation using
the corresponding fundamental matrices. Based on the initial data of the problem, sufficient
conditions for its unique solvability are obtained. Iterative algorithms containing relatively
simple computational procedures are proposed for constructing a solution. Effective estimates
are given that characterize the rate of convergence of the iteration sequence to the solution, as
well as estimates of the solution localization domain.