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arxiv: 1506.03212 · v2 · pith:GYGJUN44new · submitted 2015-06-10 · 🌊 nlin.AO

Designing heteroclinic and excitable networks in phase space using two populations of coupled cells

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keywords cellssystemcellcoupledexcitableheteroclinicnetworksphase
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We give a constructive method for realizing an arbitrary directed graph (with no one-cycles) as a heteroclinic or an excitable dynamic network in the phase space of a system of coupled cells of two types. In each case, the system is expressed as a system of first order differential equations. One of the cell types (the $p$-cells) interacts by mutual inhibition and classifies which vertex (state) we are currently close to, while the other cell type (the $y$-cells) excites the $p$-cells selectively and becomes active only when there is a transition between vertices. We exhibit open sets of parameter values such that these dynamical networks exist and demonstrate via numerical simulation that they can be attractors for suitably chosen parameters.

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