Chaotic dynamics of a delayed discrete-time Hopfield network of two nonidentical neurons with no self-connections (Q1015411)
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scientific article; zbMATH DE number 5552194
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Chaotic dynamics of a delayed discrete-time Hopfield network of two nonidentical neurons with no self-connections |
scientific article; zbMATH DE number 5552194 |
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Chaotic dynamics of a delayed discrete-time Hopfield network of two nonidentical neurons with no self-connections (English)
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8 May 2009
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The paper considers the following system \[ x_{n+1} = a_1x_n + T_{12}g_2(y_{n-k_2}) \] \[ y_{n+1} = a_2y_n + T_{21}g_1(x_{n-k_1}) \] with \(a_i\in (0,1)\), \(\forall n\geq\max\{k_1,k_2\}\). It is performed a stability and bifurcation analysis and Marotto type chaotic behavior is emphasized.
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neural network
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delays
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stability
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bifurcation
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chaos
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0.92965484
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0.9197177
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0.91342664
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0.9034771
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0.9030204
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0.9010026
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