Double-exponential sigmoidal functions for neural networks

In neural networks the activation process controls the output as a nonlinear function of the input; and, this output remains bounded between limits as decided by a logistic function known as the sigmoid (S-shaped). Presently, by applying the considerations of Maxwell-Boltzmann statistics, the Langev

We introduce a new method for proving explicit upper bounds on the VC dimension of general functional basis networks and prove as an application, for the first time, that the VC dimension of analog neural networks with the sigmoidal activation function \_( y)=1Â1+e & y is bounded by a quadratic poly

For (I nettvork of binary State elements. consider functions from the set of State configurations into the .set of reul nurnberv. We first characterize the existenc~c of such .state evaluation f~rnctions through the properties on their difference flmctions. A method to restore the originul state elu