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Journal of Mathematical Biology
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Self-organization of an oscillatory neural system

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Abstract

Hebbian dynamics is used to derive the differential equations for the synaptic strengths in the neural circuitry of the locomotive oscillator. Initially, neural connection are random. Under a specified arborization hypothesis relating to the density of neural connections, the differential equations are shown to model the self-organization and the stability of the oscillator. © 1995, Springer-Verlag. All rights reserved.

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Journal of Mathematical Biology

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