Add to ORKGThe purpose of this paper is to draw attention to a casuality degree dominance property in diagonalization problems by dynamic output feedback and constant precompensator. Even in the well-investigated special case of square transfer matrices, the property of degree-dominance yields new insight into the structure of diagonalizable transfer matrices
Studies the strong dynamic input-output decoupling problem (SDIODP) for nonlinear systems. It is sho...
The algebraic theory of linear input–output maps is reexamined with the objective of accomodating th...
We study the strong dynamic input-output decoupling problem (SDIODP) for nonlinear systems. It is sh...
A solution is obtained for the problem of diagonalization (row by row decoupling) by a constant prec...
The set of open-loop (right) block-diagonalizers of a given p x m transfer matrix 2, with specified ...
AbstractThe transfer matrix approach allows one to exhibit fairly easily fundamental invariants of m...
AbstractWorking with input-output transfer functions in the frequency domain and exploiting a formul...
Bibliography: p. [26-27]"January 1982."NSF Grant ECS-8006896 AFOSR grant AFOSR-80-0155by T.E. Djafer...
The theory of constant polynomial combinants has been well developed and it is linked to the linear...
The theory of constant polynomial combinants has been well developed [2] and it is linked to the lin...
AbstractThe transfer matrix approach allows one to exhibit fairly easily fundamental invariants of m...
Diagonal dominance plays a fundamental role in the design of multi-variable feedback control systems...
summary:Partial disturbance decoupling problems are equivalent to zeroing the first, say $k$ Markov ...
The algebraic theory of linear input–output maps is reexamined with the objective of accomodating th...
The algebraic theory of linear input–output maps is reexamined with the objective of accomodating th...
Studies the strong dynamic input-output decoupling problem (SDIODP) for nonlinear systems. It is sho...
The algebraic theory of linear input–output maps is reexamined with the objective of accomodating th...
We study the strong dynamic input-output decoupling problem (SDIODP) for nonlinear systems. It is sh...
A solution is obtained for the problem of diagonalization (row by row decoupling) by a constant prec...
The set of open-loop (right) block-diagonalizers of a given p x m transfer matrix 2, with specified ...
AbstractThe transfer matrix approach allows one to exhibit fairly easily fundamental invariants of m...
AbstractWorking with input-output transfer functions in the frequency domain and exploiting a formul...
Bibliography: p. [26-27]"January 1982."NSF Grant ECS-8006896 AFOSR grant AFOSR-80-0155by T.E. Djafer...
The theory of constant polynomial combinants has been well developed and it is linked to the linear...
The theory of constant polynomial combinants has been well developed [2] and it is linked to the lin...
AbstractThe transfer matrix approach allows one to exhibit fairly easily fundamental invariants of m...
Diagonal dominance plays a fundamental role in the design of multi-variable feedback control systems...
summary:Partial disturbance decoupling problems are equivalent to zeroing the first, say $k$ Markov ...
The algebraic theory of linear input–output maps is reexamined with the objective of accomodating th...
The algebraic theory of linear input–output maps is reexamined with the objective of accomodating th...
Studies the strong dynamic input-output decoupling problem (SDIODP) for nonlinear systems. It is sho...
The algebraic theory of linear input–output maps is reexamined with the objective of accomodating th...
We study the strong dynamic input-output decoupling problem (SDIODP) for nonlinear systems. It is sh...