Posterior Regularization for Expectation Maximization

Summary

This is a method to impose contraints on posteriors in the Expectation Maximization algorithm, allowing a finer-level control over these posteriors.

Method Description

For a given set ${\displaystyle x\in X}$ of observed data, a set of latent data ${\displaystyle z\in Z}$ and a set of parameters ${\displaystyle \theta }$, the Expectation Maximization algorithm can be viewed as the alternation between two maximization steps of the function ${\displaystyle F(q,\theta )}$, by marginalizing different free variables.

The E-step is defined as:

${\displaystyle q^{t+1}=argmax_{q}F(q,\theta ^{t})=argmax_{q}[-D_{KL}(q||p_{\theta ^{t}}(z|x))]}$

where ${\displaystyle D_{KL}}$ is the Kullback-Leibler divergence given by ${\displaystyle D_{KL}(q||p)=E_{q}[log{\frac {q}{p}}]}$, and q(z|x) is an arbitrary probability distribution over the latent variable z.

The M-step is defined as:

${\displaystyle \theta ^{t+1}=argmax_{\theta }F(q^{t+1},\theta )=argmax_{\theta }\ E_{X}[\sum _{s}q^{t+1}(z|x)\ log\ p_{\theta }(x,z)]}$

The goal of this method is to define a way to constrains over posteriors.