Showing papers by "Chun-Hsiung Fang published in 1991"

Doubly coprime matrix-fraction representations using proportional and derivative feedback concepts in generalized state-space systems

Abstract: The concepts of proportional and derivative state feedback are used to derive some explicit formulas for doubly coprime matrix-fraction representations of generalized state-space systems. Specifically, proportional and derivative state feedback is used to determine the doubly coprime matrix-fraction representations and to solve the corresponding generalized Bezout identity in polynomial matrix form. >

A new application of infinite eigenvalue assignment in generalized state-space systems

Abstract: The author proposes a new application of infinite eigenvalue assignment of generalized state-space systems to linear system design. The ideas of infinite eigenvalue assignment in generalized state-space systems are applied to develop some useful formulas for system transform and compensator synthesis. Two kinds of control law that lead to two interesting results are discussed. >

Straightforward approach to completely singular system realization for arbitrary polynomial matrices

Abstract: A straightforward approach is presented to realize a completely singular system for in arbitrary polynomial matrix, two special coordinate farms frequently used in the analysis and design of singular systems can be simultaneous obtained.