Optimal control by direct inversion of a positive-definite operator in a Hilbert space

The stabilization problem of systems with a skew-adjoint operator in a Hilbert space is considered. We prove that an one dimensional stabilizing feedback control allows a wide class of perturbations such that the system under consideration is strongly stabilizable with the aim of the perturbed contr

New easy proofs are given of the eigenvalue inequalities obtained by Amir-Moez for a product AB of two positive definite (strictly positive) operators A and B on a finite-dimensional Hilbert space. As a simple consequence of these inequalities, new bounds are established on the eigenvalues of AB whi

A new iterative method is constructed which converges strongly to the unique solution of the equation Ax s f. Our work extends some of the known results due to Chidume and Osilike, and Chidume and Aneke.