chainer.functions.gaussian_kl_divergence(mean, ln_var, reduce='sum')[source]

Computes the KL-divergence of Gaussian variables from the standard one.

Given two variable mean representing \(\mu\) and ln_var representing \(\log(\sigma^2)\), this function calculates the KL-divergence in elementwise manner between the given multi-dimensional Gaussian \(N(\mu, S)\) and the standard Gaussian \(N(0, I)\)

\[D_{\mathbf{KL}}(N(\mu, S) \| N(0, I)),\]

where \(S\) is a diagonal matrix such that \(S_{ii} = \sigma_i^2\) and \(I\) is an identity matrix.

The output is a variable whose value depends on the value of the option reduce. If it is 'no', it holds the elementwise loss values. If it is 'sum', loss values are summed up.


A variable representing KL-divergence between given gaussian distribution and the standard gaussian. If reduce is 'no', the output variable holds array whose shape is same as one of (hence both of) input variables. If it is 'sum', the output variable holds a scalar value.

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