Basiru Usman scite author profile

To investigate dynamical behavior of the Hopfield neural network model when its dimension becomes increasingly large, a Hopfield-type lattice system is developed as the infinite dimensional extension of the classical Hopfield model. The existence of global attractors is established for both the lattice system and its finite dimensional approximations. Moreover, the global attractors for the finite dimensional approximations are shown to converge to the attractor for the infinite dimensional lattice system upper semi-continuously.

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Long term behavior of a random Hopfield neural lattice model

Han¹,

Kloeden²,

Usman³

2019

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A Hopfield neural lattice model is developed as the infinite dimensional extension of the classical finite dimensional Hopfield model. In addition, random external inputs are considered to incorporate environmental noise. The resulting random lattice dynamical system is first formulated as a random ordinary differential equation on the space of square summable biinfinite sequences. Then the existence and uniqueness of solutions, as well as long term dynamics of solutions are investigated.

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Basiru Usman

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Upper semi-continuous convergence of attractors for a Hopfield-type lattice model

Long term behavior of a random Hopfield neural lattice model

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