Basins of Attraction for Chimera States

TY - JOUR

T1 - Basins of Attraction for Chimera States

AU - Martens, Erik Andreas

AU - Panaggio, Mark

AU - Abrams, Daniel

PY - 2016/2/18

Y1 - 2016/2/18

N2 - Chimera states---curious symmetry-broken states in systems of identical coupled oscillators---typically occur only for certain initial conditions. Here we analyze their basins of attraction in a simple system comprised of two populations. Using perturbative analysis and numerical simulation we evaluate asymptotic states and associated destination maps, and demonstrate that basins form a complex twisting structure in phase space. Understanding the basins' precise nature may help in the development of control methods to switch between chimera patterns, with possible technological and neural system applications.

AB - Chimera states---curious symmetry-broken states in systems of identical coupled oscillators---typically occur only for certain initial conditions. Here we analyze their basins of attraction in a simple system comprised of two populations. Using perturbative analysis and numerical simulation we evaluate asymptotic states and associated destination maps, and demonstrate that basins form a complex twisting structure in phase space. Understanding the basins' precise nature may help in the development of control methods to switch between chimera patterns, with possible technological and neural system applications.

KW - Faculty of Science

KW - coupled oscillators

KW - basins of attraction

KW - chimera states

KW - neural networks

U2 - 10.1088/1367-2630/18/2/022002

DO - 10.1088/1367-2630/18/2/022002

M3 - Journal article

SN - 1367-2630

VL - 18

JO - New Journal of Physics

JF - New Journal of Physics

M1 - 022002

ER -