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Theory and Modern Applications

Table 1 The first few points of the Hopf–Hopf bifurcation and the roots of (4.13)

From: Multiple bifurcations and periodic coexistence in a delayed Hopfield two-neural system with a monotonic activation function

\((\tau _{1}^{*}, \tau _{\mathrm{s}}^{*})\)

\(\omega _{1}\)

\(\omega _{2}\)

(0.0451, 5.215)

1.2915

2.2934

(0.017, 8.9124)

1.6342

1.8357

(0.00899, 12.5791)

1.516

1.978