Results for a network of Hindmarsh-Rose neurons.

<p>(a) Expected value of the local mean field of the node against the node degree . The error bar indicates the variance () of . (b) Black points indicate the value of and for <a href="http://www.plosone.org/article/info:doi/10.1371/journal.pone.0048118#pone.0048118.e248" target="_blank">Eq. (13)</a> to present a stable periodic orbit (no positive Lyapunov exponents). The maximal values of the periodic orbits obtained from <a href="http://www.plosone.org/article/info:doi/10.1371/journal.pone.0048118#pone.0048118.e248" target="_blank">Eq. (13)</a> is shown in the bifurcation diagram in (c) considering and . (d) The CAS pattern for a neuron with degree  = 25 (with and ). In the inset, the same CAS pattern of the neuron and some sampled points of the trajectory for the neuron and another neuron with degree . (e) The difference between the first coordinates of the trajectories of neurons and , with a time-lag of . (f) Phase difference between the phases of the trajectories for neurons and .</p

Results for a network of coupled maps.

<p>(a) Expected value of the local mean field of the node against the node degree . The error bar indicates the variance () of . (b) A bifurcation diagram of the CAS pattern [<a href="http://www.plosone.org/article/info:doi/10.1371/journal.pone.0048118#pone.0048118.e060" target="_blank">Eq. (6)</a>] considering . (c) Probability density function of the trajectory of a node with degree  = 80 (therefore, , ). (d) A return plot considering two nodes ( and ) with the same degree 80.</p