Title :
H∞ norm and slow-fast decomposition of systems with small delay
Author :
Fridman, E. ; Shaked, U.
Author_Institution :
Dept. of Electr. Eng. - Syst., Tel Aviv Univ., Ramat Aviv, Israel
Abstract :
The problem of finding the H∞-norm of systems with a finite number of discrete delays and distributed delay is considered. Sufficient conditions for the system to possess an H∞-norm which is less or equal to a prescribed bound are obtained in terms of the Riccati partial differential equations (RPDE´s). We show that the existence of the solution to the RPDE´s is equivalent to the existence of the stable manifold of the associated Hamiltonian system. The main result of the paper is a derivation of algebraic finite-dimensional criterion for the solvability of RPDE´s for systems with small time-delays. The result is based on slow-fast decomposition of the Hamiltonian system.
Keywords :
H∞ control; Riccati equations; computability; delays; partial differential equations; H∞ norm; Hamiltonian system; RPDE; Riccati partial differential equations; algebraic finite dimensional criterion; discrete delays; distributed delay; slow-fast decomposition; small time delays; solvability; Delays; Electrical engineering; Electronic mail; Europe; Facsimile; Integral equations; Manifolds; H∞ — control; delay systems; linear systems;
Conference_Titel :
Control Conference (ECC), 1997 European
Conference_Location :
Brussels
Print_ISBN :
978-3-9524269-0-6
