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2016, Volume 21Issue 4: 1119-1148. Doi: 10.3934/dcdsb.2016.21.1119
This issue Previous Article Global stability for SIR and SIRS models with nonlinear incidence and removal terms via Dulac functions Next Article The 20-60-20 rule

Impulsive SICNNs with chaotic postsynaptic currents

  • 1.

    Department of Mathematics, Middle East Technical University, 06800, Ankara

Received:  December 2014
Revised:  December 2015
Published:  June 2016
Abstract Related Papers Cited by
    Abstract
  • In the present study, we investigate the dynamics of shunting inhibitory cellular neural networks (SICNNs) with impulsive effects. We give a mathematical description of the chaos for the multidimensional dynamics of impulsive SICNNs, and prove its existence rigorously by taking advantage of the external inputs. The Li-Yorke definition of chaos is used in our theoretical discussions. In the considered model, the impacts satisfy the cell and shunting principles. This enriches the applications of SICNNs and makes the analysis of impulsive neural networks deeper. The technique is exceptionally useful for SICNNs with arbitrary number of cells. We make benefit of unidirectionally coupled SICNNs to exemplify our results. Moreover, the appearance of cyclic irregular behavior observed in neuroscience is numerically demonstrated for discontinuous dynamics of impulsive SICNNs.
    Mathematics Subject Classification: Primary: 34C28, 92B20; Secondary: 37D45.

    Citation:
    shu

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