Unbounded sequences of stable limit cycles in the delayed Duffing equation: an exact analysis

Abstract

The delayed Duffing equation x(t)+x(t-T)+x3(t)=0 is shown to possess an infinite and unbounded sequence of rapidly oscillating, asymptotically stable periodic solutions, for fixed delays such that T2<32π2. In contrast to several previous works which involved approximate solutions, the treatment here is exact.