Special Session 29: Stochastic and deterministic dynamical systems and applications
Contents
We use the skew-product formalism to study the structure of the omega-limit set of relatively compact solutions of non-autonomous neutral functional differential equations. We assume some recurrence in the temporal variation of the vector field in order that our flow in the base was minimal.
We present recent results which prove that the equation generates a semiflow which is monotone for some exponential ordering and prove in these conditions that these omega limit sets are minimal and define a copy of the base.