Multiple solutions for periodic perturbations of a delayed autonomous system near an equilibrium
Abstract
Small non-autonomous perturbations around an equilibrium of a nonlinear delayed system are studied. Under appropriate assumptions, it is shown that the number of T-periodic solutions lying inside a bounded domain ⊂ N is, generically, at least | 1|+1, where denotes the Euler characteristic of . Moreover, some connections between the associated fixed point operator and the Poincar\'e operator are explored.
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