Abstract

If i ω ∈ i R is an eigenvalue of a time-delay system for the delay τ 0 then i ω is also an eigenvalue for the delays τ k ≔ τ 0 + k 2 π / ω , for any k ∈ Z . We investigate the sensitivity, periodicity and invariance properties of the root i ω for the case that i ω is a double eigenvalue for some τ k . It turns out that under natural conditions (the condition that the root exhibits the completely regular splitting property if the delay is perturbed), the presence of a double imaginary root i ω for some delay τ 0 implies that i ω is a simple root for the other delays τ k , k ≠ 0 . Moreover, we show how to characterize the root locus around i ω . The entire local root locus picture can be completely determined from the square root splitting of the double root. We separate the general picture into two cases depending on the sign of a single scalar constant; the imaginary part of the first coefficient in the square root expansion of the double eigenvalue.

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