Necessary and sufficient stability condition of fractional-order interval linear systems

A simple sujicient stability criterionfor linear discrete systems obtained previously is proved to be necessary and sujicientfor the stability of a class of such systems with parametervariation.

## Abstract A set of necessary and sufficient conditions is stated and proved for the absolute stability (under any passive terminations), in the ‘bibo’ sense, of a linear __n__‐port characterized by its open‐circuit impedance matrix. A more explicit set of such conditions is derived for the specia

A system of linear differential equations with a Hurwitz matrix A and a variable delay is considered. The system is assumed to be stable if it is stable for any delay function (t) ≤ h. The necessary and sufficient condition for stability, expressed using the eigenvalues of the matrix A and the quant

Al~a~et--Let a real polynomial in a complex variable, whose coefficients are any given continuous functions of two real interval parameters, be given. Necessary and sufficient conditions are derived for the polynomial to have all its zeros outside (or inside) the unit circle of the complex variable