This paper proposes a time-varying matrix solution to the Brockett
stabilization problem. The key matrix condition shows that if the system matrix
product CB is a Hurwitz H-matrix, then there exists a time-varying diagonal
gain matrix K(t) such that the closed-loop minimum-phase linear system with
decentralized output feedback is exponentially convergent. The proposed
solution involves several analysis tools such as diagonal stabilization
properties of special matrices, stability conditions of diagonal-dominant
linear systems, and solution bounds of linear time-varying integro-differential
systems. A review of other solutions to the general Brockett stabilization
problem (for a general unstructured time-varying gain matrix K(t)) and a
comparison study are also provided