<p>(<b>A</b>) Time series of global order parameter for the network shown in <a href="http://www.plosone.org/article/info:doi/10.1371/journal.pone.0075569#pone-0075569-g012" target="_blank">Figure 12 </a><b>B</b> with . These values were chosen to maximise the oscillatory behaviour. (<b>B</b>) Corresponding Fourier spectrum for signal in <b>A</b>.</p
<p><b>a)</b> Time evolution of the phase difference between two nodes of the anatomically-connected ...
<p>Left panel: for each couple (<i>M</i>, <i>γ</i>/4) ∈ [5, 50] × [2, 10] we numerically simulate th...
We study the Kuramoto transition of oscillators in random network and Barabáshi-Albert network mode...
<p>(<b>A</b>) Time series of global order parameter for the network shown in <a href="http://www.pl...
<p>(<b>A</b>) Time series of global order parameter for a network with two levels of hierarchy with...
<p>(<b>A</b>) Time series of global order parameter for the network shown in <a href="http://www.pl...
<p>Time series for global order parameter, with (<b>A</b>), (<b>B</b>), and (<b>C</b>) showing mu...
<p>Time series of global order parameter, , for increasingly perturbed hierarchical network of Kuram...
<p>Time series for global order parameter, , for various networks of coupled Kuramoto oscillators. E...
<p>When the coupling strength has critical value , the system is metastable and demonstrates the gre...
<p><i>N</i> = 100 oscillators (circles) are drawn on the unitary circle, their angular position is g...
<p><b>A</b>: For below a critical value (red, dotted line) the signal is irregular and the order ...
The synchronization in large populations of interacting oscillators has been observed abundantly in ...
a) Kuramoto oscillators are spatially arranged in a hexagonal grid and are sparsely connected to eac...
<p>(A) shows the trajectory of the “membrane potential” of an oscillator in the network. (B) shows i...
<p><b>a)</b> Time evolution of the phase difference between two nodes of the anatomically-connected ...
<p>Left panel: for each couple (<i>M</i>, <i>γ</i>/4) ∈ [5, 50] × [2, 10] we numerically simulate th...
We study the Kuramoto transition of oscillators in random network and Barabáshi-Albert network mode...
<p>(<b>A</b>) Time series of global order parameter for the network shown in <a href="http://www.pl...
<p>(<b>A</b>) Time series of global order parameter for a network with two levels of hierarchy with...
<p>(<b>A</b>) Time series of global order parameter for the network shown in <a href="http://www.pl...
<p>Time series for global order parameter, with (<b>A</b>), (<b>B</b>), and (<b>C</b>) showing mu...
<p>Time series of global order parameter, , for increasingly perturbed hierarchical network of Kuram...
<p>Time series for global order parameter, , for various networks of coupled Kuramoto oscillators. E...
<p>When the coupling strength has critical value , the system is metastable and demonstrates the gre...
<p><i>N</i> = 100 oscillators (circles) are drawn on the unitary circle, their angular position is g...
<p><b>A</b>: For below a critical value (red, dotted line) the signal is irregular and the order ...
The synchronization in large populations of interacting oscillators has been observed abundantly in ...
a) Kuramoto oscillators are spatially arranged in a hexagonal grid and are sparsely connected to eac...
<p>(A) shows the trajectory of the “membrane potential” of an oscillator in the network. (B) shows i...
<p><b>a)</b> Time evolution of the phase difference between two nodes of the anatomically-connected ...
<p>Left panel: for each couple (<i>M</i>, <i>γ</i>/4) ∈ [5, 50] × [2, 10] we numerically simulate th...
We study the Kuramoto transition of oscillators in random network and Barabáshi-Albert network mode...