论文信息 - Reduction of interconnection weights in higher order associative memory networks

Reduction of interconnection weights in higher order associative memory networks

The existence of principal connection weights Tpr useful in solving the problem of proliferation of weights in higher-order Hebbian-type associative memories is introduced. Among all connection weights T based on the outer-product rule, it is shown that those weights near square root M, where M=number of stored patterns, contain, more information than the others. The recall capability of Hopfield associative memories which use only principal weights Tpr, where Tpr in T and square root M<or=//Tpr//<or=M, is investigated by a statistical method and computer simulations. It is shown how such memories can maintain original recall capability using less than 50% of the original number of connection weights.<<ETX>>

J. F. Walkup | T. F. Krile | J.-H. Wang

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