Oscillation of delay differential equations via the hyper4 convergence
Abstract
A sharp condition is provided to guarantee that the (nontrivial) solutions of a DDE of the form x(t)+F(t,x)=0 t≥ 0, (where F(t,·) is an odd-like causal operator) either oscillate, or converge monotonically to zero. The method used is based on the convergence of the sequence of hyper4-iterations to the Lambert's function.
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