# Neural Network Initialization - Nguyen Widrow Implementation?

I've had a go at implementing the Nguyen Widrow algorithm (below) and it appears to function correctly, but I have some follow-on questions:

• Does this look like a correct implementation?

• Does Nguyen Widrow initialization apply to any network topology / size ? (ie 5 layer AutoEncoder)

• Is Nguyen Widrow initialization valid for any input range? (0/1, -1/+1, etc)

• Is Nguyen Widrow initialization valid for any activation function? (Ie Logistic, Tanh, Linear)

The code below assumes that the network has already been randomized to -1/+1 :

``````        ' Calculate the number of hidden neurons
Dim HiddenNeuronsCount As Integer = Me.TotalNeuronsCount - (Me.InputsCount - Me.OutputsCount)

' Calculate the Beta value for all hidden layers
Dim Beta As Double = (0.7 * Math.Pow(HiddenNeuronsCount, (1.0 / Me.InputsCount)))

' Loop through each layer in neural network, skipping input layer
For i As Integer = 1 To Layers.GetUpperBound(0)

' Loop through each neuron in layer
For j As Integer = 0 To Layers(i).Neurons.GetUpperBound(0)

Dim InputsNorm As Double = 0

' Loop through each weight in neuron inputs, add weight value to InputsNorm
For k As Integer = 0 To Layers(i).Neurons(j).ConnectionWeights.GetUpperBound(0)
InputsNorm += Layers(i).Neurons(j).ConnectionWeights(k) * Layers(i).Neurons(j).ConnectionWeights(k)
Next

' Add bias value to InputsNorm
InputsNorm += Layers(i).Neurons(j).Bias * Layers(i).Neurons(j).Bias

' Finalize euclidean norm calculation
InputsNorm = Math.Sqrt(InputsNorm)

' Loop through each weight in neuron inputs, scale the weight based on euclidean norm and beta
For k As Integer = 0 To Layers(i).Neurons(j).ConnectionWeights.GetUpperBound(0)
Layers(i).Neurons(j).ConnectionWeights(k) = (Beta * Layers(i).Neurons(j).ConnectionWeights(k)) / InputsNorm
Next

' Scale the bias based on euclidean norm and beta
Layers(i).Neurons(j).Bias = (Beta * Layers(i).Neurons(j).Bias) / InputsNorm

Next

Next
``````
-