Sparse Autoencoder Notation Summary

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Here is a summary of the symbols used in our derivation of the sparse autoencoder:

Symbol Meaning
\textstyle x Input features for a training example, \textstyle x \in \Re^{n}.
\textstyle y Output/target values. Here, \textstyle y can be vector valued. In the case of an autoencoder, \textstyle y=x.
\textstyle (x^{(i)}, y^{(i)}) The \textstyle i-th training example
\textstyle h_{W,b}(x) Output of our hypothesis on input \textstyle x, using parameters \textstyle W,b. This should be a vector of

the same dimension as the target value \textstyle y.

\textstyle W^{(l)}_{ij} The parameter associated with the connection between unit \textstyle j in layer \textstyle l, and

unit \textstyle i in layer \textstyle l+1.

\textstyle b^{(l)}_{i} The bias term associated with unit \textstyle i in layer \textstyle l+1. Can also be thought of as the parameter associated with the connection between the bias unit in layer \textstyle l and unit \textstyle i in layer \textstyle l+1.
\textstyle \theta Our parameter vector. It is useful to think of this as the result of taking the parameters \textstyle W,b and ``unrolling them into a long column vector.
\textstyle a^{(l)}_i Activation (output) of unit \textstyle i in layer \textstyle l of the network.

In addition, since layer \textstyle L_1 is the input layer, we also have \textstyle a^{(1)}_i = x_i.

\textstyle f(\cdot) The activation function. Throughout these notes, we used \textstyle f(z) = \tanh(z).
\textstyle z^{(l)}_i Total weighted sum of inputs to unit \textstyle i in layer \textstyle l. Thus, \textstyle a^{(l)}_i = f(z^{(l)}_i).
\textstyle \alpha Learning rate parameter
\textstyle s_l Number of units in layer \textstyle l (not counting the bias unit).
\textstyle n_l Number layers in the network. Layer \textstyle L_1 is usually the input layer, and layer \textstyle L_{n_l} the output layer.
\textstyle \lambda Weight decay parameter.
\textstyle \hat{x} For an autoencoder, its output; i.e., its reconstruction of the input \textstyle x. Same meaning as \textstyle h_{W,b}(x).
\textstyle \rho Sparsity parameter, which specifies our desired level of sparsity
\textstyle \hat\rho_i The average activation of hidden unit \textstyle i (in the sparse autoencoder).
\textstyle \beta Weight of the sparsity penalty term (in the sparse autoencoder objective).

Neural Networks | Backpropagation Algorithm | Gradient checking and advanced optimization | Autoencoders and Sparsity | Visualizing a Trained Autoencoder | Sparse Autoencoder Notation Summary | Exercise:Sparse Autoencoder

Language : 中文

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