"Mathematics." . . "Control theory." . . . . "Control, Teoría de." . . "Faktorzerlegung." . . "Sistemes de control." . . "fonction rationnelle." . . "anneau matrice." . . "factorisation." . . "Factorisation." . "Factorization (Mathematics)" . . "système scalaire." . . "Kontrolltheorie." . . "théorie commande." . . "stabilisation." . . "filtrage." . . . . "Control system synthesis a factorization approach : part II" . . . . "Electronic books"@en . . . . "Control system synthesis: a factorization approach" . "Control system synthesis: a factorization approach"@en . . . . . . . . . . . . . . . . . . . . . . . "Control systems synthesis : a factorization approach" . "Control system synthesis a factorization approach"@en . "Control system synthesis a factorization approach" . . . . "Matériel didactique" . . . . "This book introduces the so-called \"stable factorization approach\" to the synthesis of feedback controllers for linear control systems. The key to this approach is to view the multi-input, multioutput (MIMO) plant for which one wishes to design a controller as a matrix over the fraction field F associated with a commutative ring with identity, denoted by R, which also has no divisors of zero. In this setting, the set of single-input, single-output (SISO) stable control systems is precisely the ring R, while the set of stable MIMO control systems is the set of matrices whose elements all belong to R. The set of unstable, meaning not necessarily stable, control systems is then taken to be the field of fractions F associated with R in the SISO case, and the set of matrices with elements in F in the MIMO case."@en . . . . . . "Control system synthesis: a factorization approach : MIT press series in signal processing, optimization, and control 7" . "Control system synthesis : a factorization approach" . "Control system synthesis : a factorization approach"@en . "Commande, Théorie de la." . . "sensibilité" . .