Mykola Perestyuk and Oleksiy Kapustyan
abstract:
In this paper we consider an evolution inclusion with impulse effects at fixed
moments of time from the point of view of the theory of global attractors. For
an upper semicontinuous multivalued term which does not provide the uniqueness
of the Cauchy problem, we give sufficient conditions on non-damped multivalued
impulse perturbations, which allow us to construct a multivalued non-autonomous
dynamical system and prove for it the existence of a compact global attractor in
the phase space.
Mathematics Subject Classification: 35B40, 35B41, 35K55, 35K57, 37B25, 58C06
Key words and phrases: Evolution inclusion, impulse perturbation, multivalued dynamical system, global attractor