Messaoud Bounkhel
Abstract:
We are interested in existence results for nonconvex functional differential
inclusions. First, we prove an existence result, in separable Hilbert spaces,
for first order nonconvex sweeping processes with perturbation and with delay.
Then, by using this result and a fixed point theorem we prove an existence
result for second order nonconvex sweeping processes with perturbation and with
delay of the form $\dot u(t)\in C(u(t))$, $\ddot u(t)\in -N^P(C(u(t))$; $\dot
u(t))+F(t,\dot u_t)$ when $C$ is a nonconvex bounded Lipschitz set-valued
mapping and $F$ is a set-valued mapping with convex compact values taking their
values in finite dimensional spaces.
Keywords:
Uniformly prox-regular set, nonconvex sweeping processes, delay, differential
inclusions.
MSC 2000: 49J52, 46N10, 58C20