The paper is concerned with the non-autonomous ordinary differential inclusion in finite dimensional space with periodic, compact, but not necessarily convex valued right-hand side. The existence of periodic solution for such an inclusion which stays in a strongly positively invariant (under inclusion) set continuously depending on the time parameter is proved. The connection between the density principle and stability of the set of all periodic solutions laying in positively invariant sets with respect to internal and external perturbations of the inclusion is derived. The special attention is paid to the property of strong positive invariance which is studied here in terms of Lyapunov functions.
Positive Invariance and Differential Inclusions with Periodic Right Hand Side
BENEDETTI, Irene;
2007
Abstract
The paper is concerned with the non-autonomous ordinary differential inclusion in finite dimensional space with periodic, compact, but not necessarily convex valued right-hand side. The existence of periodic solution for such an inclusion which stays in a strongly positively invariant (under inclusion) set continuously depending on the time parameter is proved. The connection between the density principle and stability of the set of all periodic solutions laying in positively invariant sets with respect to internal and external perturbations of the inclusion is derived. The special attention is paid to the property of strong positive invariance which is studied here in terms of Lyapunov functions.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
